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This is page D, containing operations selected from the range 4:41472 to 4:55295.
Page A from 4:0 to 4:13823
Page B from 4:13824 to 4:27647
Page C from 4:27648 to 4:41471

4:41472 identities: ab_, b_a, _ab, ba_, a_b, _ba, cd_, d_c, _cd, dc_, c_d, _dc skews
aaa=d aab=a aac=b aad=c aba=a abb=b abc=c abd=d aca=b acb=c acc=d acd=a ada=c adb=d adc=a add=b a♦1=b a♦2=b a♦3=b
baa=a bab=b bac=c bad=d bba=b bbb=a bbc=d bbd=c bca=c bcb=d bcc=a bcd=b bda=d bdb=c bdc=b bdd=a b♦1=a b♦2=a b♦3=a
caa=b cab=c cac=d cad=a cba=c cbb=d cbc=a cbd=b cca=d ccb=a ccc=b ccd=c cda=a cdb=b cdc=c cdd=d c♦1=d c♦2=d c♦3=d
daa=c dab=d dac=a dad=b dba=d dbb=c dbc=b dbd=a dca=a dcb=b dcc=c dcd=d dda=b ddb=a ddc=d ddd=c d♦1=c d♦2=c d♦3=c
c'ty full — a'ty none — self-d'ty none — m'ty false — decomp none — sub_quasi none all invertible

4:41472	identities: ab_, b_a, _ab, ba_, a_b, _ba, cd_, d_c, _cd, dc_, c_d, _dc		skews
aaa=d	aab=a	aac=b	aad=c	aba=a	abb=b	abc=c	abd=d	aca=b	acb=c	acc=d	acd=a	ada=c	adb=d	adc=a	add=b	a♦1=b	a♦2=b	a♦3=b
baa=a	bab=b	bac=c	bad=d	bba=b	bbb=a	bbc=d	bbd=c	bca=c	bcb=d	bcc=a	bcd=b	bda=d	bdb=c	bdc=b	bdd=a	b♦1=a	b♦2=a	b♦3=a
caa=b	cab=c	cac=d	cad=a	cba=c	cbb=d	cbc=a	cbd=b	cca=d	ccb=a	ccc=b	ccd=c	cda=a	cdb=b	cdc=c	cdd=d	c♦1=d	c♦2=d	c♦3=d
daa=c	dab=d	dac=a	dad=b	dba=d	dbb=c	dbc=b	dbd=a	dca=a	dcb=b	dcc=c	dcd=d	dda=b	ddb=a	ddc=d	ddd=c	d♦1=c	d♦2=c	d♦3=c
c'ty full — a'ty none — self-d'ty none — m'ty false — decomp none — sub_quasi none	all invertible

4:42723 identities: none skews
aaa=d aab=a aac=b aad=c aba=b abb=c abc=d abd=a aca=c acb=b acc=a acd=d ada=a adb=d adc=c add=b a♦1=c a♦2=d a♦3=b
baa=c bab=b bac=a bad=d bba=a bbb=d bbc=c bbd=b bca=d bcb=a bcc=b bcd=c bda=b bdb=c bdc=d bdd=a b♦1=c b♦2=a b♦3=d
caa=a cab=d cac=c cad=b cba=c cbb=b cbc=a cbd=d cca=b ccb=c ccc=d ccd=a cda=d cdb=a cdc=b cdd=c c♦1=d c♦2=a c♦3=b
daa=b dab=c dac=d dad=a dba=d dbb=a dbc=b dbd=c dca=a dcb=d dcc=c dcd=b dda=c ddb=b ddc=a ddd=d d♦1=d d♦2=d d♦3=d
c'ty none — a'ty none — self-d'ty none — m'ty false — decomp sinister, dexterior — sub_quasi {d}

4:42723	identities: none		skews
aaa=d	aab=a	aac=b	aad=c	aba=b	abb=c	abc=d	abd=a	aca=c	acb=b	acc=a	acd=d	ada=a	adb=d	adc=c	add=b	a♦1=c	a♦2=d	a♦3=b
baa=c	bab=b	bac=a	bad=d	bba=a	bbb=d	bbc=c	bbd=b	bca=d	bcb=a	bcc=b	bcd=c	bda=b	bdb=c	bdc=d	bdd=a	b♦1=c	b♦2=a	b♦3=d
caa=a	cab=d	cac=c	cad=b	cba=c	cbb=b	cbc=a	cbd=d	cca=b	ccb=c	ccc=d	ccd=a	cda=d	cdb=a	cdc=b	cdd=c	c♦1=d	c♦2=a	c♦3=b
daa=b	dab=c	dac=d	dad=a	dba=d	dbb=a	dbc=b	dbd=c	dca=a	dcb=d	dcc=c	dcd=b	dda=c	ddb=b	ddc=a	ddd=d	d♦1=d	d♦2=d	d♦3=d
c'ty none — a'ty none — self-d'ty none — m'ty false — decomp sinister, dexterior — sub_quasi {d}

4:43048 identities: c_a, a_b, ca_, d_c, b_d skews
aaa=d aab=a aac=b aad=c aba=c abb=b abc=a abd=d aca=a acb=c acc=d acd=b ada=b adb=d adc=c add=a a♦1=c a♦2=c a♦3=b
baa=b bab=c bac=d bad=a bba=a bbb=d bbc=c bbd=b bca=d bcb=b bcc=a bcd=c bda=c bdb=a bdc=b bdd=d b♦1=a b♦2=c b♦3=d
caa=a cab=b cac=c cad=d cba=b cbb=a cbc=d cbd=c cca=c ccb=d ccc=b ccd=a cda=d cdb=c cdc=a cdd=b c♦1=d c♦2=a c♦3=a
daa=c dab=d dac=a dad=b dba=d dbb=c dbc=b dbd=a dca=b dcb=a dcc=c dcd=d dda=a ddb=b ddc=d ddd=c d♦1=b d♦2=c d♦3=c
c'ty none — a'ty none — self-d'ty none — m'ty false — decomp none — sub_quasi none

4:43048	identities: c_a, a_b, ca_, d_c, b_d		skews
aaa=d	aab=a	aac=b	aad=c	aba=c	abb=b	abc=a	abd=d	aca=a	acb=c	acc=d	acd=b	ada=b	adb=d	adc=c	add=a	a♦1=c	a♦2=c	a♦3=b
baa=b	bab=c	bac=d	bad=a	bba=a	bbb=d	bbc=c	bbd=b	bca=d	bcb=b	bcc=a	bcd=c	bda=c	bdb=a	bdc=b	bdd=d	b♦1=a	b♦2=c	b♦3=d
caa=a	cab=b	cac=c	cad=d	cba=b	cbb=a	cbc=d	cbd=c	cca=c	ccb=d	ccc=b	ccd=a	cda=d	cdb=c	cdc=a	cdd=b	c♦1=d	c♦2=a	c♦3=a
daa=c	dab=d	dac=a	dad=b	dba=d	dbb=c	dbc=b	dbd=a	dca=b	dcb=a	dcc=c	dcd=d	dda=a	ddb=b	ddc=d	ddd=c	d♦1=b	d♦2=c	d♦3=c
c'ty none — a'ty none — self-d'ty none — m'ty false — decomp none — sub_quasi none

4:43158 identities: none skews
aaa=d aab=a aac=b aad=c aba=c abb=b abc=a abd=d aca=a acb=d acc=c acd=b ada=b adb=c adc=d add=a a♦1=d a♦2=c a♦3=b
baa=b bab=c bac=d bad=a bba=a bbb=d bbc=c bbd=b bca=c bcb=b bcc=a bcd=d bda=d bdb=a bdc=b bdd=c b♦1=a b♦2=c b♦3=d
caa=c cab=b cac=a cad=d cba=d cbb=a cbc=b cbd=c cca=b ccb=c ccc=d ccd=a cda=a cdb=d cdc=c cdd=b c♦1=a c♦2=d c♦3=b
daa=a dab=d dac=c dad=b dba=b dbb=c dbc=d dbd=a dca=d dcb=a dcc=b dcd=c dda=c ddb=b ddc=a ddd=d d♦1=d d♦2=d d♦3=d
c'ty none — a'ty none — self-d'ty none — m'ty false — decomp sinister, dexterior — sub_quasi {d}

4:43158	identities: none		skews
aaa=d	aab=a	aac=b	aad=c	aba=c	abb=b	abc=a	abd=d	aca=a	acb=d	acc=c	acd=b	ada=b	adb=c	adc=d	add=a	a♦1=d	a♦2=c	a♦3=b
baa=b	bab=c	bac=d	bad=a	bba=a	bbb=d	bbc=c	bbd=b	bca=c	bcb=b	bcc=a	bcd=d	bda=d	bdb=a	bdc=b	bdd=c	b♦1=a	b♦2=c	b♦3=d
caa=c	cab=b	cac=a	cad=d	cba=d	cbb=a	cbc=b	cbd=c	cca=b	ccb=c	ccc=d	ccd=a	cda=a	cdb=d	cdc=c	cdd=b	c♦1=a	c♦2=d	c♦3=b
daa=a	dab=d	dac=c	dad=b	dba=b	dbb=c	dbc=d	dbd=a	dca=d	dcb=a	dcc=b	dcd=c	dda=c	ddb=b	ddc=a	ddd=d	d♦1=d	d♦2=d	d♦3=d
c'ty none — a'ty none — self-d'ty none — m'ty false — decomp sinister, dexterior — sub_quasi {d}

4:43310 identities: c_a, a_b, d_c, b_d skews
aaa=d aab=a aac=b aad=c aba=c abb=b abc=a abd=d aca=b acb=c acc=d acd=a ada=a adb=d adc=c add=b a♦1=c a♦2=d a♦3=b
baa=b bab=d bac=c bad=a bba=a bbb=c bbc=d bbd=b bca=d bcb=b bcc=a bcd=c bda=c bdb=a bdc=b bdd=d b♦1=a b♦2=c b♦3=d
caa=a cab=c cac=d cad=b cba=b cbb=d cbc=c cbd=a cca=c ccb=a ccc=b ccd=d cda=d cdb=b cdc=a cdd=c c♦1=d c♦2=b c♦3=a
daa=c dab=b dac=a dad=d dba=d dbb=a dbc=b dbd=c dca=a dcb=d dcc=c dcd=b dda=b ddb=c ddc=d ddd=a d♦1=b d♦2=a d♦3=c
c'ty none — a'ty none — self-d'ty none — m'ty false — decomp none — sub_quasi none all invertible

4:43310	identities: c_a, a_b, d_c, b_d		skews
aaa=d	aab=a	aac=b	aad=c	aba=c	abb=b	abc=a	abd=d	aca=b	acb=c	acc=d	acd=a	ada=a	adb=d	adc=c	add=b	a♦1=c	a♦2=d	a♦3=b
baa=b	bab=d	bac=c	bad=a	bba=a	bbb=c	bbc=d	bbd=b	bca=d	bcb=b	bcc=a	bcd=c	bda=c	bdb=a	bdc=b	bdd=d	b♦1=a	b♦2=c	b♦3=d
caa=a	cab=c	cac=d	cad=b	cba=b	cbb=d	cbc=c	cbd=a	cca=c	ccb=a	ccc=b	ccd=d	cda=d	cdb=b	cdc=a	cdd=c	c♦1=d	c♦2=b	c♦3=a
daa=c	dab=b	dac=a	dad=d	dba=d	dbb=a	dbc=b	dbd=c	dca=a	dcb=d	dcc=c	dcd=b	dda=b	ddb=c	ddc=d	ddd=a	d♦1=b	d♦2=a	d♦3=c
c'ty none — a'ty none — self-d'ty none — m'ty false — decomp none — sub_quasi none	all invertible

4:43700 identities: _ab, ad_, ba_, _bc, cb_, _cd, _da, dc_ skews
aaa=d aab=a aac=b aad=c aba=c abb=d abc=a abd=b aca=b acb=c acc=d acd=a ada=a adb=b adc=c add=d a♦1=b a♦2=d a♦3=b
baa=a bab=b bac=c bad=d bba=d bbb=a bbc=b bbd=c bca=c bcb=d bcc=a bcd=b bda=b bdb=c bdc=d bdd=a b♦1=c b♦2=a b♦3=c
caa=b cab=c cac=d cad=a cba=a cbb=b cbc=c cbd=d cca=d ccb=a ccc=b ccd=c cda=c cdb=d cdc=a cdd=b c♦1=d c♦2=b c♦3=d
daa=c dab=d dac=a dad=b dba=b dbb=c dbc=d dbd=a dca=a dcb=b dcc=c dcd=d dda=d ddb=a ddc=b ddd=c d♦1=a d♦2=c d♦3=a
c'ty exterior — a'ty exterior — self-d'ty sinisterior, dexterior — m'ty true — decomp sinister, dexterior — sub_quasi none all invertible

4:43700	identities: _ab, ad_, ba_, _bc, cb_, _cd, _da, dc_		skews
aaa=d	aab=a	aac=b	aad=c	aba=c	abb=d	abc=a	abd=b	aca=b	acb=c	acc=d	acd=a	ada=a	adb=b	adc=c	add=d	a♦1=b	a♦2=d	a♦3=b
baa=a	bab=b	bac=c	bad=d	bba=d	bbb=a	bbc=b	bbd=c	bca=c	bcb=d	bcc=a	bcd=b	bda=b	bdb=c	bdc=d	bdd=a	b♦1=c	b♦2=a	b♦3=c
caa=b	cab=c	cac=d	cad=a	cba=a	cbb=b	cbc=c	cbd=d	cca=d	ccb=a	ccc=b	ccd=c	cda=c	cdb=d	cdc=a	cdd=b	c♦1=d	c♦2=b	c♦3=d
daa=c	dab=d	dac=a	dad=b	dba=b	dbb=c	dbc=d	dbd=a	dca=a	dcb=b	dcc=c	dcd=d	dda=d	ddb=a	ddc=b	ddd=c	d♦1=a	d♦2=c	d♦3=a
c'ty exterior — a'ty exterior — self-d'ty sinisterior, dexterior — m'ty true — decomp sinister, dexterior — sub_quasi none	all invertible

4:44570 identities: c_c skews
aaa=d aab=a aac=c aad=b aba=b abb=c abc=a abd=d aca=a acb=b acc=d acd=c ada=c adb=d adc=b add=a a♦1=b a♦2=c a♦3=b
baa=a bab=d bac=b bad=c bba=c bbb=b bbc=d bbd=a bca=d bcb=c bcc=a bcd=b bda=b bdb=a bdc=c bdd=d b♦1=b b♦2=b b♦3=b
caa=c cab=b cac=a cad=d cba=d cbb=a cbc=b cbd=c cca=b ccb=d ccc=c ccd=a cda=a cdb=c cdc=d cdd=b c♦1=c c♦2=c c♦3=c
daa=b dab=c dac=d dad=a dba=a dbb=d dbc=c dbd=b dca=c dcb=a dcc=b dcd=d dda=d ddb=b ddc=a ddd=c d♦1=b d♦2=c d♦3=a
c'ty none — a'ty none — self-d'ty none — m'ty false — decomp dexterior — sub_quasi {b} {c}

4:44570	identities: c_c		skews
aaa=d	aab=a	aac=c	aad=b	aba=b	abb=c	abc=a	abd=d	aca=a	acb=b	acc=d	acd=c	ada=c	adb=d	adc=b	add=a	a♦1=b	a♦2=c	a♦3=b
baa=a	bab=d	bac=b	bad=c	bba=c	bbb=b	bbc=d	bbd=a	bca=d	bcb=c	bcc=a	bcd=b	bda=b	bdb=a	bdc=c	bdd=d	b♦1=b	b♦2=b	b♦3=b
caa=c	cab=b	cac=a	cad=d	cba=d	cbb=a	cbc=b	cbd=c	cca=b	ccb=d	ccc=c	ccd=a	cda=a	cdb=c	cdc=d	cdd=b	c♦1=c	c♦2=c	c♦3=c
daa=b	dab=c	dac=d	dad=a	dba=a	dbb=d	dbc=c	dbd=b	dca=c	dcb=a	dcc=b	dcd=d	dda=d	ddb=b	ddc=a	ddd=c	d♦1=b	d♦2=c	d♦3=a
c'ty none — a'ty none — self-d'ty none — m'ty false — decomp dexterior — sub_quasi {b} {c}

4:44736 identities: _ab, _bc, _ca, _dd skews
aaa=d aab=a aac=c aad=b aba=b abb=c abc=a abd=d aca=a acb=d acc=b acd=c ada=c adb=b adc=d add=a a♦1=d a♦2=c a♦3=b
baa=c bab=b bac=d bad=a bba=a bbb=d bbc=b bbd=c bca=b bcb=c bcc=a bcd=d bda=d bdb=a bdc=c bdd=b b♦1=d b♦2=a b♦3=c
caa=b cab=c cac=a cad=d cba=d cbb=a cbc=c cbd=b cca=c ccb=b ccc=d ccd=a cda=a cdb=d cdc=b cdd=c c♦1=d c♦2=b c♦3=a
daa=a dab=d dac=b dad=c dba=c dbb=b dbc=d dbd=a dca=d dcb=a dcc=c dcd=b dda=b ddb=c ddc=a ddd=d d♦1=d d♦2=d d♦3=d
c'ty none — a'ty none — self-d'ty none — m'ty true — decomp sinister, dexterior — sub_quasi {d}

4:44736	identities: _ab, _bc, _ca, _dd		skews
aaa=d	aab=a	aac=c	aad=b	aba=b	abb=c	abc=a	abd=d	aca=a	acb=d	acc=b	acd=c	ada=c	adb=b	adc=d	add=a	a♦1=d	a♦2=c	a♦3=b
baa=c	bab=b	bac=d	bad=a	bba=a	bbb=d	bbc=b	bbd=c	bca=b	bcb=c	bcc=a	bcd=d	bda=d	bdb=a	bdc=c	bdd=b	b♦1=d	b♦2=a	b♦3=c
caa=b	cab=c	cac=a	cad=d	cba=d	cbb=a	cbc=c	cbd=b	cca=c	ccb=b	ccc=d	ccd=a	cda=a	cdb=d	cdc=b	cdd=c	c♦1=d	c♦2=b	c♦3=a
daa=a	dab=d	dac=b	dad=c	dba=c	dbb=b	dbc=d	dbd=a	dca=d	dcb=a	dcc=c	dcd=b	dda=b	ddb=c	ddc=a	ddd=d	d♦1=d	d♦2=d	d♦3=d
c'ty none — a'ty none — self-d'ty none — m'ty true — decomp sinister, dexterior — sub_quasi {d}

4:44985 identities: c_c skews
aaa=d aab=a aac=c aad=b aba=b abb=c abc=d abd=a aca=a acb=d acc=b acd=c ada=c adb=b adc=a add=d a♦1=b a♦2=c a♦3=b
baa=a bab=d bac=b bad=c bba=c bbb=b bbc=a bbd=d bca=b bcb=c bcc=d bcd=a bda=d bdb=a bdc=c bdd=b b♦1=b b♦2=b b♦3=b
caa=c cab=b cac=a cad=d cba=a cbb=d cbc=b cbd=c cca=d ccb=a ccc=c ccd=b cda=b cdb=c cdc=d cdd=a c♦1=c c♦2=c c♦3=c
daa=b dab=c dac=d dad=a dba=d dbb=a dbc=c dbd=b dca=c dcb=b dcc=a dcd=d dda=a ddb=d ddc=b ddd=c d♦1=a d♦2=c d♦3=b
c'ty none — a'ty none — self-d'ty none — m'ty false — decomp sinisterior — sub_quasi {b} {c}

4:44985	identities: c_c		skews
aaa=d	aab=a	aac=c	aad=b	aba=b	abb=c	abc=d	abd=a	aca=a	acb=d	acc=b	acd=c	ada=c	adb=b	adc=a	add=d	a♦1=b	a♦2=c	a♦3=b
baa=a	bab=d	bac=b	bad=c	bba=c	bbb=b	bbc=a	bbd=d	bca=b	bcb=c	bcc=d	bcd=a	bda=d	bdb=a	bdc=c	bdd=b	b♦1=b	b♦2=b	b♦3=b
caa=c	cab=b	cac=a	cad=d	cba=a	cbb=d	cbc=b	cbd=c	cca=d	ccb=a	ccc=c	ccd=b	cda=b	cdb=c	cdc=d	cdd=a	c♦1=c	c♦2=c	c♦3=c
daa=b	dab=c	dac=d	dad=a	dba=d	dbb=a	dbc=c	dbd=b	dca=c	dcb=b	dcc=a	dcd=d	dda=a	ddb=d	ddc=b	ddd=c	d♦1=a	d♦2=c	d♦3=b
c'ty none — a'ty none — self-d'ty none — m'ty false — decomp sinisterior — sub_quasi {b} {c}

4:45749 identities: c_a, a_b, b_c, d_d skews
aaa=d aab=a aac=c aad=b aba=c abb=b abc=d abd=a aca=b acb=c acc=a acd=d ada=a adb=d adc=b add=c a♦1=c a♦2=d a♦3=b
baa=b bab=c bac=a bad=d bba=a bbb=d bbc=b bbd=c bca=d bcb=a bcc=c bcd=b bda=c bdb=b bdc=d bdd=a b♦1=a b♦2=d b♦3=c
caa=a cab=d cac=b cad=c cba=b cbb=c cbc=a cbd=d cca=c ccb=b ccc=d ccd=a cda=d cdb=a cdc=c cdd=b c♦1=b c♦2=d c♦3=a
daa=c dab=b dac=d dad=a dba=d dbb=a dbc=c dbd=b dca=a dcb=d dcc=b dcd=c dda=b ddb=c ddc=a ddd=d d♦1=d d♦2=d d♦3=d
c'ty none — a'ty none — self-d'ty none — m'ty true — decomp sinister, dexterior — sub_quasi {d}

4:45749	identities: c_a, a_b, b_c, d_d		skews
aaa=d	aab=a	aac=c	aad=b	aba=c	abb=b	abc=d	abd=a	aca=b	acb=c	acc=a	acd=d	ada=a	adb=d	adc=b	add=c	a♦1=c	a♦2=d	a♦3=b
baa=b	bab=c	bac=a	bad=d	bba=a	bbb=d	bbc=b	bbd=c	bca=d	bcb=a	bcc=c	bcd=b	bda=c	bdb=b	bdc=d	bdd=a	b♦1=a	b♦2=d	b♦3=c
caa=a	cab=d	cac=b	cad=c	cba=b	cbb=c	cbc=a	cbd=d	cca=c	ccb=b	ccc=d	ccd=a	cda=d	cdb=a	cdc=c	cdd=b	c♦1=b	c♦2=d	c♦3=a
daa=c	dab=b	dac=d	dad=a	dba=d	dbb=a	dbc=c	dbd=b	dca=a	dcb=d	dcc=b	dcd=c	dda=b	ddb=c	ddc=a	ddd=d	d♦1=d	d♦2=d	d♦3=d
c'ty none — a'ty none — self-d'ty none — m'ty true — decomp sinister, dexterior — sub_quasi {d}

4:46570 identities: _ac, _ba, _cb, _dd skews
aaa=d aab=b aac=a aad=c aba=a abb=c abc=d abd=b aca=c acb=a acc=b acd=d ada=b adb=d adc=c add=a a♦1=d a♦2=b a♦3=c
baa=c bab=a bac=b bad=d bba=b bbb=d bbc=c bbd=a bca=d bcb=b bcc=a bcd=c bda=a bdb=c bdc=d bdd=b b♦1=d b♦2=c b♦3=a
caa=b cab=d cac=c cad=a cba=c cbb=a cbc=b cbd=d cca=a ccb=c ccc=d ccd=b cda=d cdb=b cdc=a cdd=c c♦1=d c♦2=a c♦3=b
daa=a dab=c dac=d dad=b dba=d dbb=b dbc=a dbd=c dca=b dcb=d dcc=c dcd=a dda=c ddb=a ddc=b ddd=d d♦1=d d♦2=d d♦3=d
c'ty none — a'ty none — self-d'ty none — m'ty true — decomp sinister, dexterior — sub_quasi {d}

4:46570	identities: _ac, _ba, _cb, _dd		skews
aaa=d	aab=b	aac=a	aad=c	aba=a	abb=c	abc=d	abd=b	aca=c	acb=a	acc=b	acd=d	ada=b	adb=d	adc=c	add=a	a♦1=d	a♦2=b	a♦3=c
baa=c	bab=a	bac=b	bad=d	bba=b	bbb=d	bbc=c	bbd=a	bca=d	bcb=b	bcc=a	bcd=c	bda=a	bdb=c	bdc=d	bdd=b	b♦1=d	b♦2=c	b♦3=a
caa=b	cab=d	cac=c	cad=a	cba=c	cbb=a	cbc=b	cbd=d	cca=a	ccb=c	ccc=d	ccd=b	cda=d	cdb=b	cdc=a	cdd=c	c♦1=d	c♦2=a	c♦3=b
daa=a	dab=c	dac=d	dad=b	dba=d	dbb=b	dbc=a	dbd=c	dca=b	dcb=d	dcc=c	dcd=a	dda=c	ddb=a	ddc=b	ddd=d	d♦1=d	d♦2=d	d♦3=d
c'ty none — a'ty none — self-d'ty none — m'ty true — decomp sinister, dexterior — sub_quasi {d}

4:47936 identities: b_a, c_b, a_c, d_d skews
aaa=d aab=b aac=a aad=c aba=c abb=a abc=b abd=d aca=b acb=d acc=c acd=a ada=a adb=c adc=d add=b a♦1=b a♦2=d a♦3=c
baa=a bab=c bac=d bad=b bba=b bbb=d bbc=c bbd=a bca=c bcb=a bcc=b bcd=d bda=d bdb=b bdc=a bdd=c b♦1=c b♦2=d b♦3=a
caa=c cab=a cac=b cad=d cba=d cbb=b cbc=a cbd=c cca=a ccb=c ccc=d ccd=b cda=b cdb=d cdc=c cdd=a c♦1=a c♦2=d c♦3=b
daa=b dab=d dac=c dad=a dba=a dbb=c dbc=d dbd=b dca=d dcb=b dcc=a dcd=c dda=c ddb=a ddc=b ddd=d d♦1=d d♦2=d d♦3=d
c'ty none — a'ty none — self-d'ty none — m'ty true — decomp sinister, dexterior — sub_quasi {d}

4:47936	identities: b_a, c_b, a_c, d_d		skews
aaa=d	aab=b	aac=a	aad=c	aba=c	abb=a	abc=b	abd=d	aca=b	acb=d	acc=c	acd=a	ada=a	adb=c	adc=d	add=b	a♦1=b	a♦2=d	a♦3=c
baa=a	bab=c	bac=d	bad=b	bba=b	bbb=d	bbc=c	bbd=a	bca=c	bcb=a	bcc=b	bcd=d	bda=d	bdb=b	bdc=a	bdd=c	b♦1=c	b♦2=d	b♦3=a
caa=c	cab=a	cac=b	cad=d	cba=d	cbb=b	cbc=a	cbd=c	cca=a	ccb=c	ccc=d	ccd=b	cda=b	cdb=d	cdc=c	cdd=a	c♦1=a	c♦2=d	c♦3=b
daa=b	dab=d	dac=c	dad=a	dba=a	dbb=c	dbc=d	dbd=b	dca=d	dcb=b	dcc=a	dcd=c	dda=c	ddb=a	ddc=b	ddd=d	d♦1=d	d♦2=d	d♦3=d
c'ty none — a'ty none — self-d'ty none — m'ty true — decomp sinister, dexterior — sub_quasi {d}

4:48569 identities: none skews
aaa=d aab=b aac=c aad=a aba=a abb=c abc=b abd=d aca=b acb=d acc=a acd=c ada=c adb=a adc=d add=b a♦1=c a♦2=b a♦3=d
baa=c bab=a bac=d bad=b bba=b bbb=d bbc=a bbd=c bca=a bcb=c bcc=b bcd=d bda=d bdb=b bdc=c bdd=a b♦1=c b♦2=d b♦3=a
caa=a cab=c cac=b cad=d cba=d cbb=b cbc=c cbd=a cca=c ccb=a ccc=d ccd=b cda=b cdb=d cdc=a cdd=c c♦1=d c♦2=b c♦3=a
daa=b dab=d dac=a dad=c dba=c dbb=a dbc=d dbd=b dca=d dcb=b dcc=c dcd=a dda=a ddb=c ddc=b ddd=d d♦1=d d♦2=d d♦3=d
c'ty none — a'ty none — self-d'ty none — m'ty false — decomp sinister, dexterior — sub_quasi {d}

4:48569	identities: none		skews
aaa=d	aab=b	aac=c	aad=a	aba=a	abb=c	abc=b	abd=d	aca=b	acb=d	acc=a	acd=c	ada=c	adb=a	adc=d	add=b	a♦1=c	a♦2=b	a♦3=d
baa=c	bab=a	bac=d	bad=b	bba=b	bbb=d	bbc=a	bbd=c	bca=a	bcb=c	bcc=b	bcd=d	bda=d	bdb=b	bdc=c	bdd=a	b♦1=c	b♦2=d	b♦3=a
caa=a	cab=c	cac=b	cad=d	cba=d	cbb=b	cbc=c	cbd=a	cca=c	ccb=a	ccc=d	ccd=b	cda=b	cdb=d	cdc=a	cdd=c	c♦1=d	c♦2=b	c♦3=a
daa=b	dab=d	dac=a	dad=c	dba=c	dbb=a	dbc=d	dbd=b	dca=d	dcb=b	dcc=c	dcd=a	dda=a	ddb=c	ddc=b	ddd=d	d♦1=d	d♦2=d	d♦3=d
c'ty none — a'ty none — self-d'ty none — m'ty false — decomp sinister, dexterior — sub_quasi {d}

4:50099 identities: none skews
aaa=d aab=b aac=c aad=a aba=c abb=a abc=d abd=b aca=a acb=c acc=b acd=d ada=b adb=d adc=a add=c a♦1=b a♦2=c a♦3=d
baa=a bab=c bac=b bad=d bba=b bbb=d bbc=a bbd=c bca=d bcb=b bcc=c bcd=a bda=c bdb=a bdc=d bdd=b b♦1=d b♦2=c b♦3=a
caa=b cab=d cac=a cad=c cba=a cbb=c cbc=b cbd=d cca=c ccb=a ccc=d ccd=b cda=d cdb=b cdc=c cdd=a c♦1=b c♦2=d c♦3=a
daa=c dab=a dac=d dad=b dba=d dbb=b dbc=c dbd=a dca=b dcb=d dcc=a dcd=c dda=a ddb=c ddc=b ddd=d d♦1=d d♦2=d d♦3=d
c'ty none — a'ty none — self-d'ty none — m'ty false — decomp sinister, dexterior — sub_quasi {d}

4:50099	identities: none		skews
aaa=d	aab=b	aac=c	aad=a	aba=c	abb=a	abc=d	abd=b	aca=a	acb=c	acc=b	acd=d	ada=b	adb=d	adc=a	add=c	a♦1=b	a♦2=c	a♦3=d
baa=a	bab=c	bac=b	bad=d	bba=b	bbb=d	bbc=a	bbd=c	bca=d	bcb=b	bcc=c	bcd=a	bda=c	bdb=a	bdc=d	bdd=b	b♦1=d	b♦2=c	b♦3=a
caa=b	cab=d	cac=a	cad=c	cba=a	cbb=c	cbc=b	cbd=d	cca=c	ccb=a	ccc=d	ccd=b	cda=d	cdb=b	cdc=c	cdd=a	c♦1=b	c♦2=d	c♦3=a
daa=c	dab=a	dac=d	dad=b	dba=d	dbb=b	dbc=c	dbd=a	dca=b	dcb=d	dcc=a	dcd=c	dda=a	ddb=c	ddc=b	ddd=d	d♦1=d	d♦2=d	d♦3=d
c'ty none — a'ty none — self-d'ty none — m'ty false — decomp sinister, dexterior — sub_quasi {d}

4:50471 identities: d_a, c_b, b_c, a_d skews
aaa=d aab=b aac=c aad=a aba=c abb=a abc=d abd=b aca=b acb=d acc=a acd=c ada=a adb=c adc=b add=d a♦1=d a♦2=d a♦3=d
baa=b bab=d bac=a bad=c bba=a bbb=c bbc=b bbd=d bca=d bcb=b bcc=c bcd=a bda=c bdb=a bdc=d bdd=b b♦1=c b♦2=c b♦3=c
caa=c cab=a cac=d cad=b cba=d cbb=b cbc=c cbd=a cca=a ccb=c ccc=b ccd=d cda=b cdb=d cdc=a cdd=c c♦1=b c♦2=b c♦3=b
daa=a dab=c dac=b dad=d dba=b dbb=d dbc=a dbd=c dca=c dcb=a dcc=d dcd=b dda=d ddb=b ddc=c ddd=a d♦1=a d♦2=a d♦3=a
c'ty exterior — a'ty none — self-d'ty full — m'ty true — decomp sinister, dexterior — sub_quasi {ad} {bc} all invertible

4:50471	identities: d_a, c_b, b_c, a_d		skews
aaa=d	aab=b	aac=c	aad=a	aba=c	abb=a	abc=d	abd=b	aca=b	acb=d	acc=a	acd=c	ada=a	adb=c	adc=b	add=d	a♦1=d	a♦2=d	a♦3=d
baa=b	bab=d	bac=a	bad=c	bba=a	bbb=c	bbc=b	bbd=d	bca=d	bcb=b	bcc=c	bcd=a	bda=c	bdb=a	bdc=d	bdd=b	b♦1=c	b♦2=c	b♦3=c
caa=c	cab=a	cac=d	cad=b	cba=d	cbb=b	cbc=c	cbd=a	cca=a	ccb=c	ccc=b	ccd=d	cda=b	cdb=d	cdc=a	cdd=c	c♦1=b	c♦2=b	c♦3=b
daa=a	dab=c	dac=b	dad=d	dba=b	dbb=d	dbc=a	dbd=c	dca=c	dcb=a	dcc=d	dcd=b	dda=d	ddb=b	ddc=c	ddd=a	d♦1=a	d♦2=a	d♦3=a
c'ty exterior — a'ty none — self-d'ty full — m'ty true — decomp sinister, dexterior — sub_quasi {ad} {bc}	all invertible

4:50920 identities: none skews
aaa=d aab=c aac=a aad=b aba=a abb=b abc=d abd=c aca=b acb=a acc=c acd=d ada=c adb=d adc=b add=a a♦1=d a♦2=b a♦3=c
baa=b bab=a bac=c bad=d bba=c bbb=d bbc=b bbd=a bca=d bcb=c bcc=a bcd=b bda=a bdb=b bdc=d bdd=c b♦1=a b♦2=d b♦3=c
caa=c cab=d cac=b cad=a cba=b cbb=a cbc=c cbd=d cca=a ccb=b ccc=d ccd=c cda=d cdb=c cdc=a cdd=b c♦1=a c♦2=b c♦3=d
daa=a dab=b dac=d dad=c dba=d dbb=c dbc=a dbd=b dca=c dcb=d dcc=b dcd=a dda=b ddb=a ddc=c ddd=d d♦1=d d♦2=d d♦3=d
c'ty none — a'ty none — self-d'ty none — m'ty false — decomp sinister, dexterior — sub_quasi {d}

4:50920	identities: none		skews
aaa=d	aab=c	aac=a	aad=b	aba=a	abb=b	abc=d	abd=c	aca=b	acb=a	acc=c	acd=d	ada=c	adb=d	adc=b	add=a	a♦1=d	a♦2=b	a♦3=c
baa=b	bab=a	bac=c	bad=d	bba=c	bbb=d	bbc=b	bbd=a	bca=d	bcb=c	bcc=a	bcd=b	bda=a	bdb=b	bdc=d	bdd=c	b♦1=a	b♦2=d	b♦3=c
caa=c	cab=d	cac=b	cad=a	cba=b	cbb=a	cbc=c	cbd=d	cca=a	ccb=b	ccc=d	ccd=c	cda=d	cdb=c	cdc=a	cdd=b	c♦1=a	c♦2=b	c♦3=d
daa=a	dab=b	dac=d	dad=c	dba=d	dbb=c	dbc=a	dbd=b	dca=c	dcb=d	dcc=b	dcd=a	dda=b	ddb=a	ddc=c	ddd=d	d♦1=d	d♦2=d	d♦3=d
c'ty none — a'ty none — self-d'ty none — m'ty false — decomp sinister, dexterior — sub_quasi {d}

4:51769 identities: none skews
aaa=d aab=c aac=a aad=b aba=b abb=a abc=c abd=d aca=c acb=d acc=b acd=a ada=a adb=b adc=d add=c a♦1=b a♦2=d a♦3=c
baa=a bab=b bac=d bad=c bba=c bbb=d bbc=b bbd=a bca=b bcb=a bcc=c bcd=d bda=d bdb=c bdc=a bdd=b b♦1=d b♦2=a b♦3=c
caa=b cab=a cac=c cad=d cba=d cbb=c cbc=a cbd=b cca=a ccb=b ccc=d ccd=c cda=c cdb=d cdc=b cdd=a c♦1=b c♦2=a c♦3=d
daa=c dab=d dac=b dad=a dba=a dbb=b dbc=d dbd=c dca=d dcb=c dcc=a dcd=b dda=b ddb=a ddc=c ddd=d d♦1=d d♦2=d d♦3=d
c'ty none — a'ty none — self-d'ty none — m'ty false — decomp sinister, dexterior — sub_quasi {d}

4:51769	identities: none		skews
aaa=d	aab=c	aac=a	aad=b	aba=b	abb=a	abc=c	abd=d	aca=c	acb=d	acc=b	acd=a	ada=a	adb=b	adc=d	add=c	a♦1=b	a♦2=d	a♦3=c
baa=a	bab=b	bac=d	bad=c	bba=c	bbb=d	bbc=b	bbd=a	bca=b	bcb=a	bcc=c	bcd=d	bda=d	bdb=c	bdc=a	bdd=b	b♦1=d	b♦2=a	b♦3=c
caa=b	cab=a	cac=c	cad=d	cba=d	cbb=c	cbc=a	cbd=b	cca=a	ccb=b	ccc=d	ccd=c	cda=c	cdb=d	cdc=b	cdd=a	c♦1=b	c♦2=a	c♦3=d
daa=c	dab=d	dac=b	dad=a	dba=a	dbb=b	dbc=d	dbd=c	dca=d	dcb=c	dcc=a	dcd=b	dda=b	ddb=a	ddc=c	ddd=d	d♦1=d	d♦2=d	d♦3=d
c'ty none — a'ty none — self-d'ty none — m'ty false — decomp sinister, dexterior — sub_quasi {d}

4:52642 identities: ac_, d_a, c_b, bd_, a_c, cb_, da_, b_d skews
aaa=d aab=c aac=a aad=b aba=c abb=d abc=b abd=a aca=a acb=b acc=c acd=d ada=b adb=a adc=d add=c a♦1=d a♦2=c a♦3=c
baa=c bab=d bac=b bad=a bba=d bbb=c bbc=a bbd=b bca=b bcb=a bcc=d bcd=c bda=a bdb=b bdc=c bdd=d b♦1=c b♦2=d b♦3=d
caa=b cab=a cac=d cad=c cba=a cbb=b cbc=c cbd=d cca=d ccb=c ccc=a ccd=b cda=c cdb=d cdc=b cdd=a c♦1=a c♦2=b c♦3=b
daa=a dab=b dac=c dad=d dba=b dbb=a dbc=d dbd=c dca=c dcb=d dcc=b dcd=a dda=d ddb=c ddc=a ddd=b d♦1=b d♦2=a d♦3=a
c'ty dexterior — a'ty none — self-d'ty interior, dexterior — m'ty true — decomp sinister, dexterior — sub_quasi none all invertible

4:52642	identities: ac_, d_a, c_b, bd_, a_c, cb_, da_, b_d		skews
aaa=d	aab=c	aac=a	aad=b	aba=c	abb=d	abc=b	abd=a	aca=a	acb=b	acc=c	acd=d	ada=b	adb=a	adc=d	add=c	a♦1=d	a♦2=c	a♦3=c
baa=c	bab=d	bac=b	bad=a	bba=d	bbb=c	bbc=a	bbd=b	bca=b	bcb=a	bcc=d	bcd=c	bda=a	bdb=b	bdc=c	bdd=d	b♦1=c	b♦2=d	b♦3=d
caa=b	cab=a	cac=d	cad=c	cba=a	cbb=b	cbc=c	cbd=d	cca=d	ccb=c	ccc=a	ccd=b	cda=c	cdb=d	cdc=b	cdd=a	c♦1=a	c♦2=b	c♦3=b
daa=a	dab=b	dac=c	dad=d	dba=b	dbb=a	dbc=d	dbd=c	dca=c	dcb=d	dcc=b	dcd=a	dda=d	ddb=c	ddc=a	ddd=b	d♦1=b	d♦2=a	d♦3=a
c'ty dexterior — a'ty none — self-d'ty interior, dexterior — m'ty true — decomp sinister, dexterior — sub_quasi none	all invertible

4:52766 identities: none skews
aaa=d aab=c aac=a aad=b aba=c abb=d abc=b abd=a aca=a acb=b acc=d acd=c ada=b adb=a adc=c add=d a♦1=c a♦2=c a♦3=c
baa=c bab=d bac=b bad=a bba=d bbb=c bbc=a bbd=b bca=b bcb=a bcc=c bcd=d bda=a bdb=b bdc=d bdd=c b♦1=d b♦2=d b♦3=d
caa=a cab=b cac=d cad=c cba=b cbb=a cbc=c cbd=d cca=d ccb=c ccc=a ccd=b cda=c cdb=d cdc=b cdd=a c♦1=b c♦2=b c♦3=b
daa=b dab=a dac=c dad=d dba=a dbb=b dbc=d dbd=c dca=c dcb=d dcc=b dcd=a dda=d ddb=c ddc=a ddd=b d♦1=a d♦2=a d♦3=a
c'ty full — a'ty none — self-d'ty none — m'ty true — decomp sinister, dexterior — sub_quasi none all invertible

4:52766	identities: none		skews
aaa=d	aab=c	aac=a	aad=b	aba=c	abb=d	abc=b	abd=a	aca=a	acb=b	acc=d	acd=c	ada=b	adb=a	adc=c	add=d	a♦1=c	a♦2=c	a♦3=c
baa=c	bab=d	bac=b	bad=a	bba=d	bbb=c	bbc=a	bbd=b	bca=b	bcb=a	bcc=c	bcd=d	bda=a	bdb=b	bdc=d	bdd=c	b♦1=d	b♦2=d	b♦3=d
caa=a	cab=b	cac=d	cad=c	cba=b	cbb=a	cbc=c	cbd=d	cca=d	ccb=c	ccc=a	ccd=b	cda=c	cdb=d	cdc=b	cdd=a	c♦1=b	c♦2=b	c♦3=b
daa=b	dab=a	dac=c	dad=d	dba=a	dbb=b	dbc=d	dbd=c	dca=c	dcb=d	dcc=b	dcd=a	dda=d	ddb=c	ddc=a	ddd=b	d♦1=a	d♦2=a	d♦3=a
c'ty full — a'ty none — self-d'ty none — m'ty true — decomp sinister, dexterior — sub_quasi none	all invertible

4:53347 identities: ab_, bc_, ca_, dd_ skews
aaa=d aab=c aac=b aad=a aba=a abb=b abc=c abd=d aca=c acb=d acc=a acd=b ada=b adb=a adc=d add=c a♦1=c a♦2=b a♦3=d
baa=b bab=a bac=d bad=c bba=c bbb=d bbc=a bbd=b bca=a bcb=b bcc=c bcd=d bda=d bdb=c bdc=b bdd=a b♦1=a b♦2=c b♦3=d
caa=a cab=b cac=c cad=d cba=d cbb=c cbc=b cbd=a cca=b ccb=a ccc=d ccd=c cda=c cdb=d cdc=a cdd=b c♦1=b c♦2=a c♦3=d
daa=c dab=d dac=a dad=b dba=b dbb=a dbc=d dbd=c dca=d dcb=c dcc=b dcd=a dda=a ddb=b ddc=c ddd=d d♦1=d d♦2=d d♦3=d
c'ty none — a'ty none — self-d'ty none — m'ty true — decomp sinister, dexterior — sub_quasi {d}

4:53347	identities: ab_, bc_, ca_, dd_		skews
aaa=d	aab=c	aac=b	aad=a	aba=a	abb=b	abc=c	abd=d	aca=c	acb=d	acc=a	acd=b	ada=b	adb=a	adc=d	add=c	a♦1=c	a♦2=b	a♦3=d
baa=b	bab=a	bac=d	bad=c	bba=c	bbb=d	bbc=a	bbd=b	bca=a	bcb=b	bcc=c	bcd=d	bda=d	bdb=c	bdc=b	bdd=a	b♦1=a	b♦2=c	b♦3=d
caa=a	cab=b	cac=c	cad=d	cba=d	cbb=c	cbc=b	cbd=a	cca=b	ccb=a	ccc=d	ccd=c	cda=c	cdb=d	cdc=a	cdd=b	c♦1=b	c♦2=a	c♦3=d
daa=c	dab=d	dac=a	dad=b	dba=b	dbb=a	dbc=d	dbd=c	dca=d	dcb=c	dcc=b	dcd=a	dda=a	ddb=b	ddc=c	ddd=d	d♦1=d	d♦2=d	d♦3=d
c'ty none — a'ty none — self-d'ty none — m'ty true — decomp sinister, dexterior — sub_quasi {d}

4:53946 identities: ac_, ba_, cb_, dd_ skews
aaa=d aab=c aac=b aad=a aba=b abb=a abc=d abd=c aca=a acb=b acc=c acd=d ada=c adb=d adc=a add=b a♦1=b a♦2=c a♦3=d
baa=a bab=b bac=c bad=d bba=c bbb=d bbc=a bbd=b bca=d bcb=c bcc=b bcd=a bda=b bdb=a bdc=d bdd=c b♦1=c b♦2=a b♦3=d
caa=c cab=d cac=a cad=b cba=a cbb=b cbc=c cbd=d cca=b ccb=a ccc=d ccd=c cda=d cdb=c cdc=b cdd=a c♦1=a c♦2=b c♦3=d
daa=b dab=a dac=d dad=c dba=d dbb=c dbc=b dbd=a dca=c dcb=d dcc=a dcd=b dda=a ddb=b ddc=c ddd=d d♦1=d d♦2=d d♦3=d
c'ty none — a'ty none — self-d'ty none — m'ty true — decomp sinister, dexterior — sub_quasi {d}

4:53946	identities: ac_, ba_, cb_, dd_		skews
aaa=d	aab=c	aac=b	aad=a	aba=b	abb=a	abc=d	abd=c	aca=a	acb=b	acc=c	acd=d	ada=c	adb=d	adc=a	add=b	a♦1=b	a♦2=c	a♦3=d
baa=a	bab=b	bac=c	bad=d	bba=c	bbb=d	bbc=a	bbd=b	bca=d	bcb=c	bcc=b	bcd=a	bda=b	bdb=a	bdc=d	bdd=c	b♦1=c	b♦2=a	b♦3=d
caa=c	cab=d	cac=a	cad=b	cba=a	cbb=b	cbc=c	cbd=d	cca=b	ccb=a	ccc=d	ccd=c	cda=d	cdb=c	cdc=b	cdd=a	c♦1=a	c♦2=b	c♦3=d
daa=b	dab=a	dac=d	dad=c	dba=d	dbb=c	dbc=b	dbd=a	dca=c	dcb=d	dcc=a	dcd=b	dda=a	ddb=b	ddc=c	ddd=d	d♦1=d	d♦2=d	d♦3=d
c'ty none — a'ty none — self-d'ty none — m'ty true — decomp sinister, dexterior — sub_quasi {d}

4:54163 identities: _bb, c_c skews
aaa=d aab=c aac=b aad=a aba=b abb=a abc=d abd=c aca=c acb=b acc=a acd=d ada=a adb=d adc=c add=b a♦1=b a♦2=d a♦3=d
baa=a bab=d bac=c bad=b bba=c bbb=b bbc=a bbd=d bca=b bcb=a bcc=d bcd=c bda=d bdb=c bdc=b bdd=a b♦1=b b♦2=b b♦3=b
caa=c cab=b cac=a cad=d cba=d cbb=c cbc=b cbd=a cca=a ccb=d ccc=c ccd=b cda=b cdb=a cdc=d cdd=c c♦1=c c♦2=c c♦3=c
daa=b dab=a dac=d dad=c dba=a dbb=d dbc=c dbd=b dca=d dcb=c dcc=b dcd=a dda=c ddb=b ddc=a ddd=d d♦1=d d♦2=d d♦3=d
c'ty none — a'ty none — self-d'ty none — m'ty false — decomp sinisterior — sub_quasi {b} {c} {d}

4:54163	identities: _bb, c_c		skews
aaa=d	aab=c	aac=b	aad=a	aba=b	abb=a	abc=d	abd=c	aca=c	acb=b	acc=a	acd=d	ada=a	adb=d	adc=c	add=b	a♦1=b	a♦2=d	a♦3=d
baa=a	bab=d	bac=c	bad=b	bba=c	bbb=b	bbc=a	bbd=d	bca=b	bcb=a	bcc=d	bcd=c	bda=d	bdb=c	bdc=b	bdd=a	b♦1=b	b♦2=b	b♦3=b
caa=c	cab=b	cac=a	cad=d	cba=d	cbb=c	cbc=b	cbd=a	cca=a	ccb=d	ccc=c	ccd=b	cda=b	cdb=a	cdc=d	cdd=c	c♦1=c	c♦2=c	c♦3=c
daa=b	dab=a	dac=d	dad=c	dba=a	dbb=d	dbc=c	dbd=b	dca=d	dcb=c	dcc=b	dcd=a	dda=c	ddb=b	ddc=a	ddd=d	d♦1=d	d♦2=d	d♦3=d
c'ty none — a'ty none — self-d'ty none — m'ty false — decomp sinisterior — sub_quasi {b} {c} {d}

4:54378 identities: ac_, ba_, cd_, db_ skews
aaa=d aab=c aac=b aad=a aba=b abb=d abc=a abd=c aca=a acb=b acc=c acd=d ada=c adb=a adc=d add=b a♦1=b a♦2=c a♦3=d
baa=a bab=b bac=c bad=d bba=d bbb=c bbc=b bbd=a bca=c bcb=a bcc=d bcd=b bda=b bdb=d bdc=a bdd=c b♦1=d b♦2=a b♦3=c
caa=b cab=d cac=a cad=c cba=c cbb=a cbc=d cbd=b cca=d ccb=c ccc=b ccd=a cda=a cdb=b cdc=c cdd=d c♦1=a c♦2=d c♦3=b
daa=c dab=a dac=d dad=b dba=a dbb=b dbc=c dbd=d dca=b dcb=d dcc=a dcd=c dda=d ddb=c ddc=b ddd=a d♦1=c d♦2=b d♦3=a
c'ty none — a'ty none — self-d'ty dexterior — m'ty false — decomp sinisterior — sub_quasi none all invertible

4:54378	identities: ac_, ba_, cd_, db_		skews
aaa=d	aab=c	aac=b	aad=a	aba=b	abb=d	abc=a	abd=c	aca=a	acb=b	acc=c	acd=d	ada=c	adb=a	adc=d	add=b	a♦1=b	a♦2=c	a♦3=d
baa=a	bab=b	bac=c	bad=d	bba=d	bbb=c	bbc=b	bbd=a	bca=c	bcb=a	bcc=d	bcd=b	bda=b	bdb=d	bdc=a	bdd=c	b♦1=d	b♦2=a	b♦3=c
caa=b	cab=d	cac=a	cad=c	cba=c	cbb=a	cbc=d	cbd=b	cca=d	ccb=c	ccc=b	ccd=a	cda=a	cdb=b	cdc=c	cdd=d	c♦1=a	c♦2=d	c♦3=b
daa=c	dab=a	dac=d	dad=b	dba=a	dbb=b	dbc=c	dbd=d	dca=b	dcb=d	dcc=a	dcd=c	dda=d	ddb=c	ddc=b	ddd=a	d♦1=c	d♦2=b	d♦3=a
c'ty none — a'ty none — self-d'ty dexterior — m'ty false — decomp sinisterior — sub_quasi none	all invertible

4:54631 identities: ad_, ba_, cc_, a_d, db_ skews
aaa=d aab=c aac=b aad=a aba=c abb=a abc=d abd=b aca=b acb=d acc=a acd=c ada=a adb=b adc=c add=d a♦1=b a♦2=d a♦3=d
baa=a bab=b bac=c bad=d bba=d bbb=c bbc=b bbd=a bca=c bcb=a bcc=d bcd=b bda=b bdb=d bdc=a bdd=c b♦1=d b♦2=a b♦3=c
caa=c cab=a cac=d cad=b cba=b cbb=d cbc=a cbd=c cca=a ccb=b ccc=c ccd=d cda=d cdb=c cdc=b cdd=a c♦1=c c♦2=c c♦3=c
daa=b dab=d dac=a dad=c dba=a dbb=b dbc=c dbd=d dca=d dcb=c dcc=b dcd=a dda=c ddb=a ddc=d ddd=b d♦1=a d♦2=b d♦3=c
c'ty none — a'ty none — self-d'ty none — m'ty false — decomp sinisterior — sub_quasi {c}

4:54631	identities: ad_, ba_, cc_, a_d, db_		skews
aaa=d	aab=c	aac=b	aad=a	aba=c	abb=a	abc=d	abd=b	aca=b	acb=d	acc=a	acd=c	ada=a	adb=b	adc=c	add=d	a♦1=b	a♦2=d	a♦3=d
baa=a	bab=b	bac=c	bad=d	bba=d	bbb=c	bbc=b	bbd=a	bca=c	bcb=a	bcc=d	bcd=b	bda=b	bdb=d	bdc=a	bdd=c	b♦1=d	b♦2=a	b♦3=c
caa=c	cab=a	cac=d	cad=b	cba=b	cbb=d	cbc=a	cbd=c	cca=a	ccb=b	ccc=c	ccd=d	cda=d	cdb=c	cdc=b	cdd=a	c♦1=c	c♦2=c	c♦3=c
daa=b	dab=d	dac=a	dad=c	dba=a	dbb=b	dbc=c	dbd=d	dca=d	dcb=c	dcc=b	dcd=a	dda=c	ddb=a	ddc=d	ddd=b	d♦1=a	d♦2=b	d♦3=c
c'ty none — a'ty none — self-d'ty none — m'ty false — decomp sinisterior — sub_quasi {c}

4:54653 identities: ad_, d_a, b_b, _bb, c_c, _cc, da_, a_d skews
aaa=d aab=c aac=b aad=a aba=c abb=a abc=d abd=b aca=b acb=d acc=a acd=c ada=a adb=b adc=c add=d a♦1=d a♦2=d a♦3=d
baa=b bab=a bac=d bad=c bba=d bbb=b bbc=c bbd=a bca=a bcb=c bcc=b bcd=d bda=c bdb=d bdc=a bdd=b b♦1=b b♦2=b b♦3=b
caa=c cab=d cac=a cad=b cba=a cbb=c cbc=b cbd=d cca=d ccb=b ccc=c ccd=a cda=b cdb=a cdc=d cdd=c c♦1=c c♦2=c c♦3=c
daa=a dab=b dac=c dad=d dba=b dbb=d dbc=a dbd=c dca=c dcb=a dcc=d dcd=b dda=d ddb=c ddc=b ddd=a d♦1=a d♦2=a d♦3=a
c'ty none — a'ty none — self-d'ty none — m'ty false — decomp none — sub_quasi {b} {c} {ad} {bc} all invertible

4:54653	identities: ad_, d_a, b_b, _bb, c_c, _cc, da_, a_d		skews
aaa=d	aab=c	aac=b	aad=a	aba=c	abb=a	abc=d	abd=b	aca=b	acb=d	acc=a	acd=c	ada=a	adb=b	adc=c	add=d	a♦1=d	a♦2=d	a♦3=d
baa=b	bab=a	bac=d	bad=c	bba=d	bbb=b	bbc=c	bbd=a	bca=a	bcb=c	bcc=b	bcd=d	bda=c	bdb=d	bdc=a	bdd=b	b♦1=b	b♦2=b	b♦3=b
caa=c	cab=d	cac=a	cad=b	cba=a	cbb=c	cbc=b	cbd=d	cca=d	ccb=b	ccc=c	ccd=a	cda=b	cdb=a	cdc=d	cdd=c	c♦1=c	c♦2=c	c♦3=c
daa=a	dab=b	dac=c	dad=d	dba=b	dbb=d	dbc=a	dbd=c	dca=c	dcb=a	dcc=d	dcd=b	dda=d	ddb=c	ddc=b	ddd=a	d♦1=a	d♦2=a	d♦3=a
c'ty none — a'ty none — self-d'ty none — m'ty false — decomp none — sub_quasi {b} {c} {ad} {bc}	all invertible

4:54669 identities: ad_, d_a, _ad, bb_, b_b, _bb, cc_, c_c, _cc, da_, a_d, _da skews
aaa=d aab=c aac=b aad=a aba=c abb=a abc=d abd=b aca=b acb=d acc=a acd=c ada=a adb=b adc=c add=d a♦1=d a♦2=d a♦3=d
baa=c bab=a bac=d bad=b bba=a bbb=b bbc=c bbd=d bca=d bcb=c bcc=b bcd=a bda=b bdb=d bdc=a bdd=c b♦1=b b♦2=b b♦3=b
caa=b cab=d cac=a cad=c cba=d cbb=c cbc=b cbd=a cca=a ccb=b ccc=c ccd=d cda=c cdb=a cdc=d cdd=b c♦1=c c♦2=c c♦3=c
daa=a dab=b dac=c dad=d dba=b dbb=d dbc=a dbd=c dca=c dcb=a dcc=d dcd=b dda=d ddb=c ddc=b ddd=a d♦1=a d♦2=a d♦3=a
c'ty full — a'ty full — self-d'ty none — m'ty true — decomp sinister, dexterior — sub_quasi {b} {c} {ad} {bc} all invertible

4:54669	identities: ad_, d_a, _ad, bb_, b_b, _bb, cc_, c_c, _cc, da_, a_d, _da		skews
aaa=d	aab=c	aac=b	aad=a	aba=c	abb=a	abc=d	abd=b	aca=b	acb=d	acc=a	acd=c	ada=a	adb=b	adc=c	add=d	a♦1=d	a♦2=d	a♦3=d
baa=c	bab=a	bac=d	bad=b	bba=a	bbb=b	bbc=c	bbd=d	bca=d	bcb=c	bcc=b	bcd=a	bda=b	bdb=d	bdc=a	bdd=c	b♦1=b	b♦2=b	b♦3=b
caa=b	cab=d	cac=a	cad=c	cba=d	cbb=c	cbc=b	cbd=a	cca=a	ccb=b	ccc=c	ccd=d	cda=c	cdb=a	cdc=d	cdd=b	c♦1=c	c♦2=c	c♦3=c
daa=a	dab=b	dac=c	dad=d	dba=b	dbb=d	dbc=a	dbd=c	dca=c	dcb=a	dcc=d	dcd=b	dda=d	ddb=c	ddc=b	ddd=a	d♦1=a	d♦2=a	d♦3=a
c'ty full — a'ty full — self-d'ty none — m'ty true — decomp sinister, dexterior — sub_quasi {b} {c} {ad} {bc}	all invertible

4:54671 identities: ad_, d_a, _ad, da_, a_d, _da skews
aaa=d aab=c aac=b aad=a aba=c abb=a abc=d abd=b aca=b acb=d acc=a acd=c ada=a adb=b adc=c add=d a♦1=d a♦2=d a♦3=d
baa=c bab=a bac=d bad=b bba=a bbb=c bbc=b bbd=d bca=d bcb=b bcc=c bcd=a bda=b bdb=d bdc=a bdd=c b♦1=c b♦2=c b♦3=c
caa=b cab=d cac=a cad=c cba=d cbb=b cbc=c cbd=a cca=a ccb=c ccc=b ccd=d cda=c cdb=a cdc=d cdd=b c♦1=b c♦2=b c♦3=b
daa=a dab=b dac=c dad=d dba=b dbb=d dbc=a dbd=c dca=c dcb=a dcc=d dcd=b dda=d ddb=c ddc=b ddd=a d♦1=a d♦2=a d♦3=a
c'ty full — a'ty none — self-d'ty none — m'ty false — decomp none — sub_quasi {ad} {bc} all invertible

4:54671	identities: ad_, d_a, _ad, da_, a_d, _da		skews
aaa=d	aab=c	aac=b	aad=a	aba=c	abb=a	abc=d	abd=b	aca=b	acb=d	acc=a	acd=c	ada=a	adb=b	adc=c	add=d	a♦1=d	a♦2=d	a♦3=d
baa=c	bab=a	bac=d	bad=b	bba=a	bbb=c	bbc=b	bbd=d	bca=d	bcb=b	bcc=c	bcd=a	bda=b	bdb=d	bdc=a	bdd=c	b♦1=c	b♦2=c	b♦3=c
caa=b	cab=d	cac=a	cad=c	cba=d	cbb=b	cbc=c	cbd=a	cca=a	ccb=c	ccc=b	ccd=d	cda=c	cdb=a	cdc=d	cdd=b	c♦1=b	c♦2=b	c♦3=b
daa=a	dab=b	dac=c	dad=d	dba=b	dbb=d	dbc=a	dbd=c	dca=c	dcb=a	dcc=d	dcd=b	dda=d	ddb=c	ddc=b	ddd=a	d♦1=a	d♦2=a	d♦3=a
c'ty full — a'ty none — self-d'ty none — m'ty false — decomp none — sub_quasi {ad} {bc}	all invertible

4:54688 identities: ad_, d_a, c_b, b_c, a_d, _da skews
aaa=d aab=c aac=b aad=a aba=c abb=a abc=d abd=b aca=b acb=d acc=a acd=c ada=a adb=b adc=c add=d a♦1=d a♦2=d a♦3=d
baa=c bab=d bac=a bad=b bba=a bbb=c bbc=b bbd=d bca=d bcb=b bcc=c bcd=a bda=b bdb=a bdc=d bdd=c b♦1=c b♦2=c b♦3=c
caa=b cab=a cac=c cad=d cba=d cbb=b cbc=a cbd=c cca=a ccb=c ccc=d ccd=b cda=c cdb=d cdc=b cdd=a c♦1=b c♦2=a c♦3=b
daa=a dab=b dac=d dad=c dba=b dbb=d dbc=c dbd=a dca=c dcb=a dcc=b dcd=d dda=d ddb=c ddc=a ddd=b d♦1=a d♦2=c d♦3=a
c'ty exterior — a'ty none — self-d'ty none — m'ty false — decomp none — sub_quasi none

4:54688	identities: ad_, d_a, c_b, b_c, a_d, _da		skews
aaa=d	aab=c	aac=b	aad=a	aba=c	abb=a	abc=d	abd=b	aca=b	acb=d	acc=a	acd=c	ada=a	adb=b	adc=c	add=d	a♦1=d	a♦2=d	a♦3=d
baa=c	bab=d	bac=a	bad=b	bba=a	bbb=c	bbc=b	bbd=d	bca=d	bcb=b	bcc=c	bcd=a	bda=b	bdb=a	bdc=d	bdd=c	b♦1=c	b♦2=c	b♦3=c
caa=b	cab=a	cac=c	cad=d	cba=d	cbb=b	cbc=a	cbd=c	cca=a	ccb=c	ccc=d	ccd=b	cda=c	cdb=d	cdc=b	cdd=a	c♦1=b	c♦2=a	c♦3=b
daa=a	dab=b	dac=d	dad=c	dba=b	dbb=d	dbc=c	dbd=a	dca=c	dcb=a	dcc=b	dcd=d	dda=d	ddb=c	ddc=a	ddd=b	d♦1=a	d♦2=c	d♦3=a
c'ty exterior — a'ty none — self-d'ty none — m'ty false — decomp none — sub_quasi none

4:54799 identities: b_a, c_c skews
aaa=d aab=c aac=b aad=a aba=c abb=b abc=a abd=d aca=b acb=a acc=d acd=c ada=a adb=d adc=c add=b a♦1=b a♦2=d a♦3=d
baa=a bab=d bac=c bad=b bba=b bbb=a bbc=d bbd=c bca=c bcb=b bcc=a bcd=d bda=d bdb=c bdc=b bdd=a b♦1=a b♦2=c b♦3=a
caa=c cab=b cac=a cad=d cba=d cbb=c cbc=b cbd=a cca=a ccb=d ccc=c ccd=b cda=b cdb=a cdc=d cdd=c c♦1=c c♦2=c c♦3=c
daa=b dab=a dac=d dad=c dba=a dbb=d dbc=c dbd=b dca=d dcb=c dcc=b dcd=a dda=c ddb=b ddc=a ddd=d d♦1=d d♦2=d d♦3=d
c'ty none — a'ty none — self-d'ty none — m'ty false — decomp sinisterior — sub_quasi {c} {d}

4:54799	identities: b_a, c_c		skews
aaa=d	aab=c	aac=b	aad=a	aba=c	abb=b	abc=a	abd=d	aca=b	acb=a	acc=d	acd=c	ada=a	adb=d	adc=c	add=b	a♦1=b	a♦2=d	a♦3=d
baa=a	bab=d	bac=c	bad=b	bba=b	bbb=a	bbc=d	bbd=c	bca=c	bcb=b	bcc=a	bcd=d	bda=d	bdb=c	bdc=b	bdd=a	b♦1=a	b♦2=c	b♦3=a
caa=c	cab=b	cac=a	cad=d	cba=d	cbb=c	cbc=b	cbd=a	cca=a	ccb=d	ccc=c	ccd=b	cda=b	cdb=a	cdc=d	cdd=c	c♦1=c	c♦2=c	c♦3=c
daa=b	dab=a	dac=d	dad=c	dba=a	dbb=d	dbc=c	dbd=b	dca=d	dcb=c	dcc=b	dcd=a	dda=c	ddb=b	ddc=a	ddd=d	d♦1=d	d♦2=d	d♦3=d
c'ty none — a'ty none — self-d'ty none — m'ty false — decomp sinisterior — sub_quasi {c} {d}

4:54908 identities: ac_, dd_ skews
aaa=d aab=c aac=b aad=a aba=c abb=d abc=a abd=b aca=a acb=b acc=c acd=d ada=b adb=a adc=d add=c a♦1=c a♦2=c a♦3=d
baa=b bab=a bac=c bad=d bba=a bbb=b bbc=d bbd=c bca=c bcb=d bcc=a bcd=b bda=d bdb=c bdc=b bdd=a b♦1=b b♦2=b b♦3=b
caa=a cab=b cac=d cad=c cba=b cbb=a cbc=c cbd=d cca=d ccb=c ccc=b ccd=a cda=c cdb=d cdc=a cdd=b c♦1=a c♦2=b c♦3=b
daa=c dab=d dac=a dad=b dba=d dbb=c dbc=b dbd=a dca=b dcb=a dcc=d dcd=c dda=a ddb=b ddc=c ddd=d d♦1=d d♦2=d d♦3=d
c'ty none — a'ty none — self-d'ty none — m'ty false — decomp none — sub_quasi {b} {d}

4:54908	identities: ac_, dd_		skews
aaa=d	aab=c	aac=b	aad=a	aba=c	abb=d	abc=a	abd=b	aca=a	acb=b	acc=c	acd=d	ada=b	adb=a	adc=d	add=c	a♦1=c	a♦2=c	a♦3=d
baa=b	bab=a	bac=c	bad=d	bba=a	bbb=b	bbc=d	bbd=c	bca=c	bcb=d	bcc=a	bcd=b	bda=d	bdb=c	bdc=b	bdd=a	b♦1=b	b♦2=b	b♦3=b
caa=a	cab=b	cac=d	cad=c	cba=b	cbb=a	cbc=c	cbd=d	cca=d	ccb=c	ccc=b	ccd=a	cda=c	cdb=d	cdc=a	cdd=b	c♦1=a	c♦2=b	c♦3=b
daa=c	dab=d	dac=a	dad=b	dba=d	dbb=c	dbc=b	dbd=a	dca=b	dcb=a	dcc=d	dcd=c	dda=a	ddb=b	ddc=c	ddd=d	d♦1=d	d♦2=d	d♦3=d
c'ty none — a'ty none — self-d'ty none — m'ty false — decomp none — sub_quasi {b} {d}

4:55080 identities: b_a, ba_, c_b, cb_ skews
aaa=d aab=c aac=b aad=a aba=c abb=d abc=a abd=b aca=b acb=a acc=c acd=d ada=a adb=b adc=d add=c a♦1=b a♦2=d a♦3=d
baa=a bab=b bac=c bad=d bba=b bbb=a bbc=d bbd=c bca=c bcb=d bcc=a bcd=b bda=d bdb=c bdc=b bdd=a b♦1=c b♦2=a b♦3=a
caa=b cab=a cac=d cad=c cba=a cbb=b cbc=c cbd=d cca=d ccb=c ccc=b ccd=a cda=c cdb=d cdc=a cdd=b c♦1=a c♦2=b c♦3=b
daa=c dab=d dac=a dad=b dba=d dbb=c dbc=b dbd=a dca=a dcb=b dcc=d dcd=c dda=b ddb=a ddc=c ddd=d d♦1=d d♦2=d d♦3=d
c'ty dexterior — a'ty none — self-d'ty none — m'ty false — decomp none — sub_quasi {d}

4:55080	identities: b_a, ba_, c_b, cb_		skews
aaa=d	aab=c	aac=b	aad=a	aba=c	abb=d	abc=a	abd=b	aca=b	acb=a	acc=c	acd=d	ada=a	adb=b	adc=d	add=c	a♦1=b	a♦2=d	a♦3=d
baa=a	bab=b	bac=c	bad=d	bba=b	bbb=a	bbc=d	bbd=c	bca=c	bcb=d	bcc=a	bcd=b	bda=d	bdb=c	bdc=b	bdd=a	b♦1=c	b♦2=a	b♦3=a
caa=b	cab=a	cac=d	cad=c	cba=a	cbb=b	cbc=c	cbd=d	cca=d	ccb=c	ccc=b	ccd=a	cda=c	cdb=d	cdc=a	cdd=b	c♦1=a	c♦2=b	c♦3=b
daa=c	dab=d	dac=a	dad=b	dba=d	dbb=c	dbc=b	dbd=a	dca=a	dcb=b	dcc=d	dcd=c	dda=b	ddb=a	ddc=c	ddd=d	d♦1=d	d♦2=d	d♦3=d
c'ty dexterior — a'ty none — self-d'ty none — m'ty false — decomp none — sub_quasi {d}

4:55191 identities: ad_, ba_, d_b, cc_, a_d, db_ skews
aaa=d aab=c aac=b aad=a aba=c abb=d abc=a abd=b aca=b acb=a acc=d acd=c ada=a adb=b adc=c add=d a♦1=b a♦2=d a♦3=d
baa=a bab=b bac=c bad=d bba=d bbb=c bbc=b bbd=a bca=c bcb=d bcc=a bcd=b bda=b bdb=a bdc=d bdd=c b♦1=d b♦2=a b♦3=c
caa=c cab=d cac=a cad=b cba=b cbb=a cbc=d cbd=c cca=a ccb=b ccc=c ccd=d cda=d cdb=c cdc=b cdd=a c♦1=c c♦2=c c♦3=c
daa=b dab=a dac=d dad=c dba=a dbb=b dbc=c dbd=d dca=d dcb=c dcc=b dcd=a dda=c ddb=d ddc=a ddd=b d♦1=a d♦2=b d♦3=b
c'ty none — a'ty none — self-d'ty none — m'ty false — decomp sinisterior — sub_quasi {c}

4:55191	identities: ad_, ba_, d_b, cc_, a_d, db_		skews
aaa=d	aab=c	aac=b	aad=a	aba=c	abb=d	abc=a	abd=b	aca=b	acb=a	acc=d	acd=c	ada=a	adb=b	adc=c	add=d	a♦1=b	a♦2=d	a♦3=d
baa=a	bab=b	bac=c	bad=d	bba=d	bbb=c	bbc=b	bbd=a	bca=c	bcb=d	bcc=a	bcd=b	bda=b	bdb=a	bdc=d	bdd=c	b♦1=d	b♦2=a	b♦3=c
caa=c	cab=d	cac=a	cad=b	cba=b	cbb=a	cbc=d	cbd=c	cca=a	ccb=b	ccc=c	ccd=d	cda=d	cdb=c	cdc=b	cdd=a	c♦1=c	c♦2=c	c♦3=c
daa=b	dab=a	dac=d	dad=c	dba=a	dbb=b	dbc=c	dbd=d	dca=d	dcb=c	dcc=b	dcd=a	dda=c	ddb=d	ddc=a	ddd=b	d♦1=a	d♦2=b	d♦3=b
c'ty none — a'ty none — self-d'ty none — m'ty false — decomp sinisterior — sub_quasi {c}

4:55230 identities: ad_, bb_, b_b, a_d skews
aaa=d aab=c aac=b aad=a aba=c abb=d abc=a abd=b aca=b acb=a acc=d acd=c ada=a adb=b adc=c add=d a♦1=d a♦2=d a♦3=d
baa=b bab=a bac=d bad=c bba=a bbb=b bbc=c bbd=d bca=d bcb=c bcc=b bcd=a bda=c bdb=d bdc=a bdd=b b♦1=b b♦2=b b♦3=b
caa=c cab=b cac=a cad=d cba=b cbb=a cbc=d cbd=c cca=a ccb=d ccc=c ccd=b cda=d cdb=c cdc=b cdd=a c♦1=c c♦2=c c♦3=c
daa=a dab=d dac=c dad=b dba=d dbb=c dbc=b dbd=a dca=c dcb=b dcc=a dcd=d dda=b ddb=a ddc=d ddd=c d♦1=a d♦2=c d♦3=c
c'ty dexterior — a'ty none — self-d'ty none — m'ty false — decomp none — sub_quasi {b} {c}

4:55230	identities: ad_, bb_, b_b, a_d		skews
aaa=d	aab=c	aac=b	aad=a	aba=c	abb=d	abc=a	abd=b	aca=b	acb=a	acc=d	acd=c	ada=a	adb=b	adc=c	add=d	a♦1=d	a♦2=d	a♦3=d
baa=b	bab=a	bac=d	bad=c	bba=a	bbb=b	bbc=c	bbd=d	bca=d	bcb=c	bcc=b	bcd=a	bda=c	bdb=d	bdc=a	bdd=b	b♦1=b	b♦2=b	b♦3=b
caa=c	cab=b	cac=a	cad=d	cba=b	cbb=a	cbc=d	cbd=c	cca=a	ccb=d	ccc=c	ccd=b	cda=d	cdb=c	cdc=b	cdd=a	c♦1=c	c♦2=c	c♦3=c
daa=a	dab=d	dac=c	dad=b	dba=d	dbb=c	dbc=b	dbd=a	dca=c	dcb=b	dcc=a	dcd=d	dda=b	ddb=a	ddc=d	ddd=c	d♦1=a	d♦2=c	d♦3=c
c'ty dexterior — a'ty none — self-d'ty none — m'ty false — decomp none — sub_quasi {b} {c}

4:55237 identities: ad_, d_a, bb_, b_b, cc_, c_c, da_, a_d skews
aaa=d aab=c aac=b aad=a aba=c abb=d abc=a abd=b aca=b acb=a acc=d acd=c ada=a adb=b adc=c add=d a♦1=d a♦2=d a♦3=d
baa=b bab=a bac=d bad=c bba=a bbb=b bbc=c bbd=d bca=d bcb=c bcc=b bcd=a bda=c bdb=d bdc=a bdd=b b♦1=b b♦2=b b♦3=b
caa=c cab=d cac=a cad=b cba=d cbb=c cbc=b cbd=a cca=a ccb=b ccc=c ccd=d cda=b cdb=a cdc=d cdd=c c♦1=c c♦2=c c♦3=c
daa=a dab=b dac=c dad=d dba=b dbb=a dbc=d dbd=c dca=c dcb=d dcc=a dcd=b dda=d ddb=c ddc=b ddd=a d♦1=a d♦2=a d♦3=a
c'ty dexterior — a'ty none — self-d'ty none — m'ty true — decomp sinister, dexterior — sub_quasi {b} {c} {ad} {bc} all invertible

4:55237	identities: ad_, d_a, bb_, b_b, cc_, c_c, da_, a_d		skews
aaa=d	aab=c	aac=b	aad=a	aba=c	abb=d	abc=a	abd=b	aca=b	acb=a	acc=d	acd=c	ada=a	adb=b	adc=c	add=d	a♦1=d	a♦2=d	a♦3=d
baa=b	bab=a	bac=d	bad=c	bba=a	bbb=b	bbc=c	bbd=d	bca=d	bcb=c	bcc=b	bcd=a	bda=c	bdb=d	bdc=a	bdd=b	b♦1=b	b♦2=b	b♦3=b
caa=c	cab=d	cac=a	cad=b	cba=d	cbb=c	cbc=b	cbd=a	cca=a	ccb=b	ccc=c	ccd=d	cda=b	cdb=a	cdc=d	cdd=c	c♦1=c	c♦2=c	c♦3=c
daa=a	dab=b	dac=c	dad=d	dba=b	dbb=a	dbc=d	dbd=c	dca=c	dcb=d	dcc=a	dcd=b	dda=d	ddb=c	ddc=b	ddd=a	d♦1=a	d♦2=a	d♦3=a
c'ty dexterior — a'ty none — self-d'ty none — m'ty true — decomp sinister, dexterior — sub_quasi {b} {c} {ad} {bc}	all invertible

4:55243 identities: ad_, d_a, bc_, _bc, cb_, _cb, da_, a_d skews
aaa=d aab=c aac=b aad=a aba=c abb=d abc=a abd=b aca=b acb=a acc=d acd=c ada=a adb=b adc=c add=d a♦1=d a♦2=d a♦3=d
baa=b bab=a bac=d bad=c bba=d bbb=c bbc=b bbd=a bca=a bcb=b bcc=c bcd=d bda=c bdb=d bdc=a bdd=b b♦1=c b♦2=c b♦3=c
caa=c cab=d cac=a cad=b cba=a cbb=b cbc=c cbd=d cca=d ccb=c ccc=b ccd=a cda=b cdb=a cdc=d cdd=c c♦1=b c♦2=b c♦3=b
daa=a dab=b dac=c dad=d dba=b dbb=a dbc=d dbd=c dca=c dcb=d dcc=a dcd=b dda=d ddb=c ddc=b ddd=a d♦1=a d♦2=a d♦3=a
c'ty none — a'ty none — self-d'ty none — m'ty false — decomp sinisterior — sub_quasi {ad} {bc} all invertible

4:55243	identities: ad_, d_a, bc_, _bc, cb_, _cb, da_, a_d		skews
aaa=d	aab=c	aac=b	aad=a	aba=c	abb=d	abc=a	abd=b	aca=b	acb=a	acc=d	acd=c	ada=a	adb=b	adc=c	add=d	a♦1=d	a♦2=d	a♦3=d
baa=b	bab=a	bac=d	bad=c	bba=d	bbb=c	bbc=b	bbd=a	bca=a	bcb=b	bcc=c	bcd=d	bda=c	bdb=d	bdc=a	bdd=b	b♦1=c	b♦2=c	b♦3=c
caa=c	cab=d	cac=a	cad=b	cba=a	cbb=b	cbc=c	cbd=d	cca=d	ccb=c	ccc=b	ccd=a	cda=b	cdb=a	cdc=d	cdd=c	c♦1=b	c♦2=b	c♦3=b
daa=a	dab=b	dac=c	dad=d	dba=b	dbb=a	dbc=d	dbd=c	dca=c	dcb=d	dcc=a	dcd=b	dda=d	ddb=c	ddc=b	ddd=a	d♦1=a	d♦2=a	d♦3=a
c'ty none — a'ty none — self-d'ty none — m'ty false — decomp sinisterior — sub_quasi {ad} {bc}	all invertible

4:55245 identities: ad_, d_a, bb_, cc_, da_, a_d skews
aaa=d aab=c aac=b aad=a aba=c abb=d abc=a abd=b aca=b acb=a acc=d acd=c ada=a adb=b adc=c add=d a♦1=d a♦2=d a♦3=d
baa=b bab=d bac=a bad=c bba=a bbb=b bbc=c bbd=d bca=d bcb=c bcc=b bcd=a bda=c bdb=a bdc=d bdd=b b♦1=b b♦2=b b♦3=b
caa=c cab=a cac=d cad=b cba=d cbb=c cbc=b cbd=a cca=a ccb=b ccc=c ccd=d cda=b cdb=d cdc=a cdd=c c♦1=c c♦2=c c♦3=c
daa=a dab=b dac=c dad=d dba=b dbb=a dbc=d dbd=c dca=c dcb=d dcc=a dcd=b dda=d ddb=c ddc=b ddd=a d♦1=a d♦2=a d♦3=a
c'ty none — a'ty none — self-d'ty none — m'ty false — decomp none — sub_quasi {b} {c} {ad} {bc} all invertible

4:55245	identities: ad_, d_a, bb_, cc_, da_, a_d		skews
aaa=d	aab=c	aac=b	aad=a	aba=c	abb=d	abc=a	abd=b	aca=b	acb=a	acc=d	acd=c	ada=a	adb=b	adc=c	add=d	a♦1=d	a♦2=d	a♦3=d
baa=b	bab=d	bac=a	bad=c	bba=a	bbb=b	bbc=c	bbd=d	bca=d	bcb=c	bcc=b	bcd=a	bda=c	bdb=a	bdc=d	bdd=b	b♦1=b	b♦2=b	b♦3=b
caa=c	cab=a	cac=d	cad=b	cba=d	cbb=c	cbc=b	cbd=a	cca=a	ccb=b	ccc=c	ccd=d	cda=b	cdb=d	cdc=a	cdd=c	c♦1=c	c♦2=c	c♦3=c
daa=a	dab=b	dac=c	dad=d	dba=b	dbb=a	dbc=d	dbd=c	dca=c	dcb=d	dcc=a	dcd=b	dda=d	ddb=c	ddc=b	ddd=a	d♦1=a	d♦2=a	d♦3=a
c'ty none — a'ty none — self-d'ty none — m'ty false — decomp none — sub_quasi {b} {c} {ad} {bc}	all invertible

4:55278 identities: c_a, ad_, ca_, a_d skews
aaa=d aab=c aac=b aad=a aba=c abb=d abc=a abd=b aca=b acb=a acc=d acd=c ada=a adb=b adc=c add=d a♦1=c a♦2=d a♦3=d
baa=c bab=d bac=a bad=b bba=d bbb=b bbc=c bbd=a bca=a bcb=c bcc=b bcd=d bda=b bdb=a bdc=d bdd=c b♦1=b b♦2=b b♦3=b
caa=a cab=b cac=c cad=d cba=b cbb=a cbc=d cbd=c cca=c ccb=d ccc=a ccd=b cda=d cdb=c cdc=b cdd=a c♦1=d c♦2=a c♦3=a
daa=b dab=a dac=d dad=c dba=a dbb=c dbc=b dbd=d dca=d dcb=b dcc=c dcd=a dda=c ddb=d ddc=a ddd=b d♦1=a d♦2=b d♦3=b
c'ty dexterior — a'ty none — self-d'ty none — m'ty false — decomp none — sub_quasi {b}

4:55278	identities: c_a, ad_, ca_, a_d		skews
aaa=d	aab=c	aac=b	aad=a	aba=c	abb=d	abc=a	abd=b	aca=b	acb=a	acc=d	acd=c	ada=a	adb=b	adc=c	add=d	a♦1=c	a♦2=d	a♦3=d
baa=c	bab=d	bac=a	bad=b	bba=d	bbb=b	bbc=c	bbd=a	bca=a	bcb=c	bcc=b	bcd=d	bda=b	bdb=a	bdc=d	bdd=c	b♦1=b	b♦2=b	b♦3=b
caa=a	cab=b	cac=c	cad=d	cba=b	cbb=a	cbc=d	cbd=c	cca=c	ccb=d	ccc=a	ccd=b	cda=d	cdb=c	cdc=b	cdd=a	c♦1=d	c♦2=a	c♦3=a
daa=b	dab=a	dac=d	dad=c	dba=a	dbb=c	dbc=b	dbd=d	dca=d	dcb=b	dcc=c	dcd=a	dda=c	ddb=d	ddc=a	ddd=b	d♦1=a	d♦2=b	d♦3=b
c'ty dexterior — a'ty none — self-d'ty none — m'ty false — decomp none — sub_quasi {b}

4:55295 identities: ad_, d_a, _ad, bc_, c_b, _bc, cb_, b_c, _cb, da_, a_d, _da skews
aaa=d aab=c aac=b aad=a aba=c abb=d abc=a abd=b aca=b acb=a acc=d acd=c ada=a adb=b adc=c add=d a♦1=d a♦2=d a♦3=d
baa=c bab=d bac=a bad=b bba=d bbb=c bbc=b bbd=a bca=a bcb=b bcc=c bcd=d bda=b bdb=a bdc=d bdd=c b♦1=c b♦2=c b♦3=c
caa=b cab=a cac=d cad=c cba=a cbb=b cbc=c cbd=d cca=d ccb=c ccc=b ccd=a cda=c cdb=d cdc=a cdd=b c♦1=b c♦2=b c♦3=b
daa=a dab=b dac=c dad=d dba=b dbb=a dbc=d dbd=c dca=c dcb=d dcc=a dcd=b dda=d ddb=c ddc=b ddd=a d♦1=a d♦2=a d♦3=a
c'ty full — a'ty full — self-d'ty full — m'ty true — decomp sinister, dexterior — sub_quasi {ad} {bc} all invertible

4:55295	identities: ad_, d_a, _ad, bc_, c_b, _bc, cb_, b_c, _cb, da_, a_d, _da		skews
aaa=d	aab=c	aac=b	aad=a	aba=c	abb=d	abc=a	abd=b	aca=b	acb=a	acc=d	acd=c	ada=a	adb=b	adc=c	add=d	a♦1=d	a♦2=d	a♦3=d
baa=c	bab=d	bac=a	bad=b	bba=d	bbb=c	bbc=b	bbd=a	bca=a	bcb=b	bcc=c	bcd=d	bda=b	bdb=a	bdc=d	bdd=c	b♦1=c	b♦2=c	b♦3=c
caa=b	cab=a	cac=d	cad=c	cba=a	cbb=b	cbc=c	cbd=d	cca=d	ccb=c	ccc=b	ccd=a	cda=c	cdb=d	cdc=a	cdd=b	c♦1=b	c♦2=b	c♦3=b
daa=a	dab=b	dac=c	dad=d	dba=b	dbb=a	dbc=d	dbd=c	dca=c	dcb=d	dcc=a	dcd=b	dda=d	ddb=c	ddc=b	ddd=a	d♦1=a	d♦2=a	d♦3=a
c'ty full — a'ty full — self-d'ty full — m'ty true — decomp sinister, dexterior — sub_quasi {ad} {bc}	all invertible

This is page D, containing operations selected from the range 4:41472 to 4:55295.
Page A from 4:0 to 4:13823
Page B from 4:13824 to 4:27647
Page C from 4:27648 to 4:41471