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

4:0		identities:   aa_,   a_a,   _aa,   bb_,   b_b,   _bb,   cc_,   c_c,   _cc,   dd_,   d_d,   _dd															skews
aaa=a	aab=b	aac=c	aad=d	aba=b	abb=a	abc=d	abd=c	aca=c	acb=d	acc=a	acd=b	ada=d	adb=c	adc=b	add=a		a♦1=a	a♦2=a	a♦3=a
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=d	dab=c	dac=b	dad=a	dba=c	dbb=d	dbc=a	dbd=b	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 full — a'ty full — self-d'ty full — m'ty true — decomp sinister, dexterior — sub_quasi {a} {b} {c} {d} {ab} {ac} {ad} {bc} {bd} {cd}																	all invertible

4:1		identities:   aa_,   a_a,   _aa,   bb_,   b_b,   _bb															skews
aaa=a	aab=b	aac=c	aad=d	aba=b	abb=a	abc=d	abd=c	aca=c	acb=d	acc=a	acd=b	ada=d	adb=c	adc=b	add=a		a♦1=a	a♦2=a	a♦3=a
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=d	ccd=c	cda=b	cdb=a	cdc=c	cdd=d		c♦1=d	c♦2=d	c♦3=d
daa=d	dab=c	dac=b	dad=a	dba=c	dbb=d	dbc=a	dbd=b	dca=b	dcb=a	dcc=c	dcd=d	dda=a	ddb=b	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 {a} {b} {ab} {cd}																	all invertible

4:2		identities:   aa_,   a_a,   _aa,   bb_,   b_b,   _bb,   c_c,   _cc,   d_d,   _dd															skews
aaa=a	aab=b	aac=c	aad=d	aba=b	abb=a	abc=d	abd=c	aca=c	acb=d	acc=a	acd=b	ada=d	adb=c	adc=b	add=a		a♦1=a	a♦2=a	a♦3=a
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=b	ccb=a	ccc=c	ccd=d	cda=a	cdb=b	cdc=d	cdd=c		c♦1=c	c♦2=c	c♦3=c
daa=d	dab=c	dac=b	dad=a	dba=c	dbb=d	dbc=a	dbd=b	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 sinisterior — a'ty none — self-d'ty none — m'ty false — decomp none — sub_quasi {a} {b} {c} {d} {ab} {cd}																	all invertible

4:8		identities:   aa_,   a_a,   bb_,   b_b,   cc_,   c_c,   _cc,   dd_,   d_d,   _dd															skews
aaa=a	aab=b	aac=c	aad=d	aba=b	abb=a	abc=d	abd=c	aca=c	acb=d	acc=a	acd=b	ada=d	adb=c	adc=b	add=a		a♦1=a	a♦2=a	a♦3=a
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=d	cab=c	cac=a	cad=b	cba=c	cbb=d	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=c	dab=d	dac=b	dad=a	dba=d	dbb=c	dbc=a	dbd=b	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 dexterior — a'ty none — self-d'ty none — m'ty false — decomp none — sub_quasi {a} {b} {c} {d} {ab} {cd}																	all invertible

4:15		identities:   aa_,   a_a,   bb_,   b_b,   cd_,   d_c,   dc_,   c_d															skews
aaa=a	aab=b	aac=c	aad=d	aba=b	abb=a	abc=d	abd=c	aca=c	acb=d	acc=a	acd=b	ada=d	adb=c	adc=b	add=a		a♦1=a	a♦2=a	a♦3=a
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=d	cab=c	cac=b	cad=a	cba=c	cbb=d	cbc=a	cbd=b	cca=b	ccb=a	ccc=d	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 dexterior — a'ty none — self-d'ty none — m'ty true — decomp sinister, dexterior — sub_quasi {a} {b} {ab} {cd}																	all invertible

4:16		identities:   aa_,   a_a,   _aa,   dd_,   d_d,   _dd															skews
aaa=a	aab=b	aac=c	aad=d	aba=b	abb=a	abc=d	abd=c	aca=c	acb=d	acc=a	acd=b	ada=d	adb=c	adc=b	add=a		a♦1=a	a♦2=a	a♦3=a
baa=b	bab=a	bac=d	bad=c	bba=a	bbb=c	bbc=b	bbd=d	bca=d	bcb=b	bcc=c	bcd=a	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=d	cbb=b	cbc=c	cbd=a	cca=a	ccb=c	ccc=b	ccd=d	cda=b	cdb=a	cdc=d	cdd=c		c♦1=b	c♦2=b	c♦3=b
daa=d	dab=c	dac=b	dad=a	dba=c	dbb=d	dbc=a	dbd=b	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 full — a'ty none — self-d'ty none — m'ty false — decomp none — sub_quasi {a} {d} {ad} {bc}																	all invertible

4:18		identities:   aa_,   a_a,   _aa,   cc_,   c_c,   _cc															skews
aaa=a	aab=b	aac=c	aad=d	aba=b	abb=a	abc=d	abd=c	aca=c	acb=d	acc=a	acd=b	ada=d	adb=c	adc=b	add=a		a♦1=a	a♦2=a	a♦3=a
baa=b	bab=a	bac=d	bad=c	bba=a	bbb=d	bbc=c	bbd=b	bca=d	bcb=c	bcc=b	bcd=a	bda=c	bdb=b	bdc=a	bdd=d		b♦1=d	b♦2=d	b♦3=d
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=d	dab=c	dac=b	dad=a	dba=c	dbb=b	dbc=a	dbd=d	dca=b	dcb=a	dcc=d	dcd=c	dda=a	ddb=d	ddc=c	ddd=b		d♦1=b	d♦2=b	d♦3=b
c'ty full — a'ty none — self-d'ty none — m'ty false — decomp none — sub_quasi {a} {c} {ac} {bd}																	all invertible

4:44		identities:   aa_,   a_a,   bb_,   b_b,   _bb,   cc_,   c_c,   _cc,   dd_,   d_d															skews
aaa=a	aab=b	aac=c	aad=d	aba=b	abb=a	abc=d	abd=c	aca=c	acb=d	acc=a	acd=b	ada=d	adb=c	adc=b	add=a		a♦1=a	a♦2=a	a♦3=a
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=d	dab=c	dac=b	dad=a	dba=c	dbb=d	dbc=a	dbd=b	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 dexterior — a'ty none — self-d'ty none — m'ty false — decomp none — sub_quasi {a} {b} {c} {d} {ad} {bc}																	all invertible

4:50		identities:   aa_,   a_a,   bc_,   cb_,   dd_,   d_d															skews
aaa=a	aab=b	aac=c	aad=d	aba=b	abb=a	abc=d	abd=c	aca=c	acb=d	acc=a	acd=b	ada=d	adb=c	adc=b	add=a		a♦1=a	a♦2=a	a♦3=a
baa=c	bab=a	bac=d	bad=b	bba=d	bbb=c	bbc=b	bbd=a	bca=a	bcb=b	bcc=c	bcd=d	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=a	cbb=b	cbc=c	cbd=d	cca=d	ccb=c	ccc=b	ccd=a	cda=c	cdb=a	cdc=d	cdd=b		c♦1=b	c♦2=b	c♦3=b
daa=d	dab=c	dac=b	dad=a	dba=c	dbb=d	dbc=a	dbd=b	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 {a} {d} {ad} {bc}																	all invertible

4:58		identities:   aa_,   a_a,   bc_,   c_b,   cb_,   b_c,   dd_,   d_d															skews
aaa=a	aab=b	aac=c	aad=d	aba=b	abb=a	abc=d	abd=c	aca=c	acb=d	acc=a	acd=b	ada=d	adb=c	adc=b	add=a		a♦1=a	a♦2=a	a♦3=a
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=d	dab=c	dac=b	dad=a	dba=c	dbb=d	dbc=a	dbd=b	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 dexterior — a'ty none — self-d'ty none — m'ty true — decomp sinister, dexterior — sub_quasi {a} {d} {ad} {bc}																	all invertible

4:73		identities:   aa_,   a_a,   bc_,   d_b,   b_c,   cd_,   db_,   c_d															skews
aaa=a	aab=b	aac=c	aad=d	aba=b	abb=a	abc=d	abd=c	aca=c	acb=d	acc=a	acd=b	ada=d	adb=c	adc=b	add=a		a♦1=a	a♦2=a	a♦3=a
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=d	b♦2=c	b♦3=c
caa=d	cab=c	cac=b	cad=a	cba=c	cbb=d	cbc=a	cbd=b	cca=b	ccb=a	ccc=d	ccd=c	cda=a	cdb=b	cdc=c	cdd=d		c♦1=b	c♦2=d	c♦3=d
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=c	d♦2=b	d♦3=b
c'ty dexterior — a'ty none — self-d'ty none — m'ty true — decomp sinister, dexterior — sub_quasi {a}																	all invertible

4:89		identities:   aa_,   a_a,   bb_,   b_b,   _bb,   cc_,   c_c,   dd_,   d_d,   _dd															skews
aaa=a	aab=b	aac=c	aad=d	aba=b	abb=a	abc=d	abd=c	aca=c	acb=d	acc=a	acd=b	ada=d	adb=c	adc=b	add=a		a♦1=a	a♦2=a	a♦3=a
baa=d	bab=a	bac=b	bad=c	bba=a	bbb=b	bbc=c	bbd=d	bca=b	bcb=c	bcc=d	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=b	dab=c	dac=d	dad=a	dba=c	dbb=d	dbc=a	dbd=b	dca=d	dcb=a	dcc=b	dcd=c	dda=a	ddb=b	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 {a} {b} {c} {d} {ac} {bd}																	all invertible

4:116		identities:   aa_,   a_a,   c_b,   bd_,   cb_,   d_c,   b_d,   dc_															skews
aaa=a	aab=b	aac=c	aad=d	aba=b	abb=a	abc=d	abd=c	aca=c	acb=d	acc=a	acd=b	ada=d	adb=c	adc=b	add=a		a♦1=a	a♦2=a	a♦3=a
baa=d	bab=c	bac=b	bad=a	bba=c	bbb=d	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=b	ccd=a	cda=c	cdb=d	cdc=a	cdd=b		c♦1=d	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=c	dcd=d	dda=b	ddb=a	ddc=d	ddd=c		d♦1=b	d♦2=c	d♦3=c
c'ty dexterior — a'ty none — self-d'ty none — m'ty true — decomp sinister, dexterior — sub_quasi {a}																	all invertible

4:126		identities:   aa_,   a_a,   c_b,   bd_,   d_c,   b_d															skews
aaa=a	aab=b	aac=c	aad=d	aba=b	abb=a	abc=d	abd=c	aca=c	acb=d	acc=a	acd=b	ada=d	adb=c	adc=b	add=a		a♦1=a	a♦2=a	a♦3=a
baa=d	bab=c	bac=b	bad=a	bba=c	bbb=d	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=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=d	c♦2=b	c♦3=b
daa=b	dab=d	dac=a	dad=c	dba=a	dbb=c	dbc=b	dbd=d	dca=d	dcb=b	dcc=c	dcd=a	dda=c	ddb=a	ddc=d	ddd=b		d♦1=b	d♦2=b	d♦3=c
c'ty none — a'ty none — self-d'ty none — m'ty false — decomp none — sub_quasi {a}

4:139		identities:   aa_,   a_a,   _aa,   bb_,   b_b,   _bb,   cd_,   d_c,   _cd,   dc_,   c_d,   _dc															skews
aaa=a	aab=b	aac=c	aad=d	aba=b	abb=a	abc=d	abd=c	aca=c	acb=d	acc=b	acd=a	ada=d	adb=c	adc=a	add=b		a♦1=a	a♦2=a	a♦3=a
baa=b	bab=a	bac=d	bad=c	bba=a	bbb=b	bbc=c	bbd=d	bca=d	bcb=c	bcc=a	bcd=b	bda=c	bdb=d	bdc=b	bdd=a		b♦1=b	b♦2=b	b♦3=b
caa=c	cab=d	cac=b	cad=a	cba=d	cbb=c	cbc=a	cbd=b	cca=b	ccb=a	ccc=d	ccd=c	cda=a	cdb=b	cdc=c	cdd=d		c♦1=d	c♦2=d	c♦3=d
daa=d	dab=c	dac=a	dad=b	dba=c	dbb=d	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 full — self-d'ty none — m'ty true — decomp sinister, dexterior — sub_quasi {a} {b} {ab} {cd}																	all invertible

4:147		identities:   aa_,   a_a,   bb_,   b_b,   cd_,   d_c,   _cd,   dc_,   c_d,   _dc															skews
aaa=a	aab=b	aac=c	aad=d	aba=b	abb=a	abc=d	abd=c	aca=c	acb=d	acc=b	acd=a	ada=d	adb=c	adc=a	add=b		a♦1=a	a♦2=a	a♦3=a
baa=b	bab=a	bac=d	bad=c	bba=a	bbb=b	bbc=c	bbd=d	bca=d	bcb=c	bcc=a	bcd=b	bda=c	bdb=d	bdc=b	bdd=a		b♦1=b	b♦2=b	b♦3=b
caa=d	cab=c	cac=b	cad=a	cba=c	cbb=d	cbc=a	cbd=b	cca=b	ccb=a	ccc=d	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 dexterior — a'ty none — self-d'ty none — m'ty false — decomp none — sub_quasi {a} {b} {ab} {cd}																	all invertible

4:148		identities:   aa_,   a_a,   _aa,   bd_,   cc_,   db_															skews
aaa=a	aab=b	aac=c	aad=d	aba=b	abb=a	abc=d	abd=c	aca=c	acb=d	acc=b	acd=a	ada=d	adb=c	adc=a	add=b		a♦1=a	a♦2=a	a♦3=a
baa=b	bab=a	bac=d	bad=c	bba=c	bbb=d	bbc=b	bbd=a	bca=d	bcb=c	bcc=a	bcd=b	bda=a	bdb=b	bdc=c	bdd=d		b♦1=d	b♦2=d	b♦3=c
caa=c	cab=d	cac=b	cad=a	cba=d	cbb=c	cbc=a	cbd=b	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=d	dab=c	dac=a	dad=b	dba=a	dbb=b	dbc=c	dbd=d	dca=b	dcb=a	dcc=d	dcd=c	dda=c	ddb=d	ddc=b	ddd=a		d♦1=b	d♦2=b	d♦3=b
c'ty sinisterior — a'ty none — self-d'ty none — m'ty false — decomp sinisterior — sub_quasi {a} {c}

4:210		identities:   aa_,   a_a,   c_b,   cb_															skews
aaa=a	aab=b	aac=c	aad=d	aba=b	abb=a	abc=d	abd=c	aca=c	acb=d	acc=b	acd=a	ada=d	adb=c	adc=a	add=b		a♦1=a	a♦2=a	a♦3=a
baa=d	bab=c	bac=b	bad=a	bba=c	bbb=d	bbc=a	bbd=b	bca=b	bcb=a	bcc=c	bcd=d	bda=a	bdb=b	bdc=d	bdd=c		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=b	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 dexterior — sub_quasi {a} {d}

4:220		identities:   aa_,   _aa,   bb_,   _bb,   cc_,   _cc,   dd_,   _dd															skews
aaa=a	aab=b	aac=c	aad=d	aba=b	abb=a	abc=d	abd=c	aca=d	acb=c	acc=a	acd=b	ada=c	adb=d	adc=b	add=a		a♦1=a	a♦2=a	a♦3=a
baa=b	bab=a	bac=d	bad=c	bba=a	bbb=b	bbc=c	bbd=d	bca=c	bcb=d	bcc=b	bcd=a	bda=d	bdb=c	bdc=a	bdd=b		b♦1=b	b♦2=b	b♦3=b
caa=c	cab=d	cac=b	cad=a	cba=d	cbb=c	cbc=a	cbd=b	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=d	dab=c	dac=a	dad=b	dba=c	dbb=d	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 exterior — a'ty full — self-d'ty full — m'ty true — decomp sinister, dexterior — sub_quasi {a} {b} {c} {d} {ab} {cd}																	all invertible

4:233		identities:   aa_,   bc_,   cb_,   dd_,   d_d,   _dd															skews
aaa=a	aab=b	aac=c	aad=d	aba=b	abb=a	abc=d	abd=c	aca=d	acb=c	acc=a	acd=b	ada=c	adb=d	adc=b	add=a		a♦1=a	a♦2=a	a♦3=a
baa=b	bab=a	bac=d	bad=c	bba=c	bbb=d	bbc=b	bbd=a	bca=a	bcb=b	bcc=c	bcd=d	bda=d	bdb=c	bdc=a	bdd=b		b♦1=c	b♦2=c	b♦3=c
caa=d	cab=c	cac=a	cad=b	cba=a	cbb=b	cbc=c	cbd=d	cca=c	ccb=d	ccc=b	ccd=a	cda=b	cdb=a	cdc=d	cdd=c		c♦1=b	c♦2=b	c♦3=a
daa=c	dab=d	dac=b	dad=a	dba=d	dbb=c	dbc=a	dbd=b	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 sinisterior — a'ty none — self-d'ty none — m'ty false — decomp sinisterior — sub_quasi {a} {d}

4:235		identities:   aa_,   bd_,   cc_,   c_c,   _cc,   db_															skews
aaa=a	aab=b	aac=c	aad=d	aba=b	abb=a	abc=d	abd=c	aca=d	acb=c	acc=a	acd=b	ada=c	adb=d	adc=b	add=a		a♦1=a	a♦2=a	a♦3=a
baa=b	bab=a	bac=d	bad=c	bba=d	bbb=c	bbc=a	bbd=b	bca=c	bcb=d	bcc=b	bcd=a	bda=a	bdb=b	bdc=c	bdd=d		b♦1=d	b♦2=d	b♦3=d
caa=d	cab=c	cac=a	cad=b	cba=c	cbb=d	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=c	dab=d	dac=b	dad=a	dba=a	dbb=b	dbc=c	dbd=d	dca=b	dcb=a	dcc=d	dcd=c	dda=d	ddb=c	ddc=a	ddd=b		d♦1=b	d♦2=b	d♦3=a
c'ty sinisterior — a'ty none — self-d'ty none — m'ty false — decomp sinisterior — sub_quasi {a} {c}

4:246		identities:   aa_,   _bb															skews
aaa=a	aab=b	aac=c	aad=d	aba=b	abb=a	abc=d	abd=c	aca=d	acb=c	acc=a	acd=b	ada=c	adb=d	adc=b	add=a		a♦1=a	a♦2=a	a♦3=a
baa=c	bab=a	bac=d	bad=b	bba=d	bbb=b	bbc=c	bbd=a	bca=a	bcb=d	bcc=b	bcd=c	bda=b	bdb=c	bdc=a	bdd=d		b♦1=b	b♦2=b	b♦3=b
caa=b	cab=d	cac=a	cad=c	cba=a	cbb=c	cbc=b	cbd=d	cca=c	ccb=b	ccc=d	ccd=a	cda=d	cdb=a	cdc=c	cdd=b		c♦1=d	c♦2=d	c♦3=a
daa=d	dab=c	dac=b	dad=a	dba=c	dbb=d	dbc=a	dbd=b	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 {a} {b}

4:292		identities:   aa_,   b_d															skews
aaa=a	aab=b	aac=c	aad=d	aba=b	abb=a	abc=d	abd=c	aca=d	acb=c	acc=a	acd=b	ada=c	adb=d	adc=b	add=a		a♦1=a	a♦2=a	a♦3=a
baa=d	bab=c	bac=b	bad=a	bba=c	bbb=d	bbc=a	bbd=b	bca=a	bcb=b	bcc=d	bcd=c	bda=b	bdb=a	bdc=c	bdd=d		b♦1=d	b♦2=c	b♦3=d
caa=c	cab=a	cac=d	cad=b	cba=a	cbb=c	cbc=b	cbd=d	cca=b	ccb=d	ccc=c	ccd=a	cda=d	cdb=b	cdc=a	cdd=c		c♦1=c	c♦2=c	c♦3=c
daa=b	dab=d	dac=a	dad=c	dba=d	dbb=b	dbc=c	dbd=a	dca=c	dcb=a	dcc=b	dcd=d	dda=a	ddb=c	ddc=d	ddd=b		d♦1=b	d♦2=c	d♦3=c
c'ty none — a'ty none — self-d'ty none — m'ty false — decomp dexterior — sub_quasi {a} {c}

4:303		identities:   aa_,   _aa,   bb_,   _bb,   cd_,   _cd,   dc_,   _dc															skews
aaa=a	aab=b	aac=c	aad=d	aba=b	abb=a	abc=d	abd=c	aca=d	acb=c	acc=b	acd=a	ada=c	adb=d	adc=a	add=b		a♦1=a	a♦2=a	a♦3=a
baa=b	bab=a	bac=d	bad=c	bba=a	bbb=b	bbc=c	bbd=d	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=c	cab=d	cac=a	cad=b	cba=d	cbb=c	cbc=b	cbd=a	cca=b	ccb=a	ccc=d	ccd=c	cda=a	cdb=b	cdc=c	cdd=d		c♦1=d	c♦2=d	c♦3=d
daa=d	dab=c	dac=b	dad=a	dba=c	dbb=d	dbc=a	dbd=b	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 exterior — a'ty full — self-d'ty none — m'ty true — decomp sinister, dexterior — sub_quasi {a} {b} {ab} {cd}																	all invertible

4:452		identities:   aa_,   a_a,   _aa,   bd_,   d_b,   _bd,   cc_,   c_c,   _cc,   db_,   b_d,   _db															skews
aaa=a	aab=b	aac=c	aad=d	aba=b	abb=c	abc=d	abd=a	aca=c	acb=d	acc=a	acd=b	ada=d	adb=a	adc=b	add=c		a♦1=a	a♦2=a	a♦3=a
baa=b	bab=c	bac=d	bad=a	bba=c	bbb=d	bbc=a	bbd=b	bca=d	bcb=a	bcc=b	bcd=c	bda=a	bdb=b	bdc=c	bdd=d		b♦1=d	b♦2=d	b♦3=d
caa=c	cab=d	cac=a	cad=b	cba=d	cbb=a	cbc=b	cbd=c	cca=a	ccb=b	ccc=c	ccd=d	cda=b	cdb=c	cdc=d	cdd=a		c♦1=c	c♦2=c	c♦3=c
daa=d	dab=a	dac=b	dad=c	dba=a	dbb=b	dbc=c	dbd=d	dca=b	dcb=c	dcc=d	dcd=a	dda=c	ddb=d	ddc=a	ddd=b		d♦1=b	d♦2=b	d♦3=b
c'ty full — a'ty full — self-d'ty none — m'ty true — decomp sinister, dexterior — sub_quasi {a} {c} {ac} {bd}																	all invertible

4:489		identities:   aa_,   a_a,   bb_,   b_b,   cc_,   c_c,   dd_,   d_d															skews
aaa=a	aab=b	aac=c	aad=d	aba=b	abb=c	abc=d	abd=a	aca=c	acb=d	acc=a	acd=b	ada=d	adb=a	adc=b	add=c		a♦1=a	a♦2=a	a♦3=a
baa=d	bab=a	bac=b	bad=c	bba=a	bbb=b	bbc=c	bbd=d	bca=b	bcb=c	bcc=d	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=a	cbc=b	cbd=c	cca=a	ccb=b	ccc=c	ccd=d	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=c	dbb=d	dbc=a	dbd=b	dca=d	dcb=a	dcc=b	dcd=c	dda=a	ddb=b	ddc=c	ddd=d		d♦1=d	d♦2=d	d♦3=d
c'ty dexterior — a'ty none — self-d'ty full — m'ty true — decomp sinister, dexterior — sub_quasi {a} {b} {c} {d} {ac} {bd}																	all invertible

4:515		identities:   aa_,   a_a,   bd_,   d_b,   _bd,   cc_,   c_c,   db_,   b_d,   _db															skews
aaa=a	aab=b	aac=c	aad=d	aba=b	abb=c	abc=d	abd=a	aca=c	acb=d	acc=a	acd=b	ada=d	adb=a	adc=b	add=c		a♦1=a	a♦2=a	a♦3=a
baa=d	bab=c	bac=b	bad=a	bba=c	bbb=d	bbc=a	bbd=b	bca=b	bcb=a	bcc=d	bcd=c	bda=a	bdb=b	bdc=c	bdd=d		b♦1=d	b♦2=d	b♦3=d
caa=c	cab=d	cac=a	cad=b	cba=d	cbb=a	cbc=b	cbd=c	cca=a	ccb=b	ccc=c	ccd=d	cda=b	cdb=c	cdc=d	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=b	d♦2=b	d♦3=b
c'ty dexterior — a'ty none — self-d'ty none — m'ty false — decomp none — sub_quasi {a} {c} {ac} {bd}																	all invertible

4:546		identities:   aa_,   _dc															skews
aaa=a	aab=b	aac=c	aad=d	aba=b	abb=c	abc=d	abd=a	aca=d	acb=a	acc=b	acd=c	ada=c	adb=d	adc=a	add=b		a♦1=a	a♦2=a	a♦3=a
baa=c	bab=a	bac=d	bad=b	bba=d	bbb=b	bbc=a	bbd=c	bca=b	bcb=d	bcc=c	bcd=a	bda=a	bdb=c	bdc=b	bdd=d		b♦1=b	b♦2=b	b♦3=b
caa=b	cab=d	cac=a	cad=c	cba=c	cbb=a	cbc=b	cbd=d	cca=a	ccb=c	ccc=d	ccd=b	cda=d	cdb=b	cdc=c	cdd=a		c♦1=b	c♦2=d	c♦3=b
daa=d	dab=c	dac=b	dad=a	dba=a	dbb=d	dbc=c	dbd=b	dca=c	dcb=b	dcc=a	dcd=d	dda=b	ddb=a	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 {a} {b}

4:607		identities:   aa_,   a_a,   _aa,   b_b,   d_c,   c_d															skews
aaa=a	aab=b	aac=c	aad=d	aba=b	abb=d	abc=a	abd=c	aca=c	acb=a	acc=d	acd=b	ada=d	adb=c	adc=b	add=a		a♦1=a	a♦2=a	a♦3=a
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=b	cad=a	cba=a	cbb=c	cbc=d	cbd=b	cca=d	ccb=b	ccc=a	ccd=c	cda=b	cdb=a	cdc=c	cdd=d		c♦1=d	c♦2=d	c♦3=d
daa=d	dab=c	dac=a	dad=b	dba=c	dbb=a	dbc=b	dbd=d	dca=b	dcb=d	dcc=c	dcd=a	dda=a	ddb=b	ddc=d	ddd=c		d♦1=c	d♦2=b	d♦3=c
c'ty exterior — a'ty none — self-d'ty none — m'ty false — decomp none — sub_quasi {a} {b}

4:626		identities:   aa_,   a_a,   _aa,   bc_,   c_b,   _bc,   cb_,   b_c,   _cb,   dd_,   d_d,   _dd															skews
aaa=a	aab=b	aac=c	aad=d	aba=b	abb=d	abc=a	abd=c	aca=c	acb=a	acc=d	acd=b	ada=d	adb=c	adc=b	add=a		a♦1=a	a♦2=a	a♦3=a
baa=b	bab=d	bac=a	bad=c	bba=d	bbb=c	bbc=b	bbd=a	bca=a	bcb=b	bcc=c	bcd=d	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=a	cbb=b	cbc=c	cbd=d	cca=d	ccb=c	ccc=b	ccd=a	cda=b	cdb=d	cdc=a	cdd=c		c♦1=b	c♦2=b	c♦3=b
daa=d	dab=c	dac=b	dad=a	dba=c	dbb=a	dbc=d	dbd=b	dca=b	dcb=d	dcc=a	dcd=c	dda=a	ddb=b	ddc=c	ddd=d		d♦1=d	d♦2=d	d♦3=d
c'ty full — a'ty full — self-d'ty none — m'ty true — decomp sinister, dexterior — sub_quasi {a} {d} {ad} {bc}																	all invertible

4:650		identities:   aa_,   a_a,   bc_,   c_b,   _bc,   cb_,   b_c,   _cb,   dd_,   d_d															skews
aaa=a	aab=b	aac=c	aad=d	aba=b	abb=d	abc=a	abd=c	aca=c	acb=a	acc=d	acd=b	ada=d	adb=c	adc=b	add=a		a♦1=a	a♦2=a	a♦3=a
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=d	dab=c	dac=b	dad=a	dba=c	dbb=a	dbc=d	dbd=b	dca=b	dcb=d	dcc=a	dcd=c	dda=a	ddb=b	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 {a} {d} {ad} {bc}																	all invertible

4:664		identities:   aa_,   a_a,   bb_,   cd_,   dc_															skews
aaa=a	aab=b	aac=c	aad=d	aba=b	abb=d	abc=a	abd=c	aca=c	acb=a	acc=d	acd=b	ada=d	adb=c	adc=b	add=a		a♦1=a	a♦2=a	a♦3=a
baa=d	bab=c	bac=b	bad=a	bba=a	bbb=b	bbc=c	bbd=d	bca=b	bcb=d	bcc=a	bcd=c	bda=c	bdb=a	bdc=d	bdd=b		b♦1=b	b♦2=b	b♦3=b
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=d	c♦2=d	c♦3=b
daa=c	dab=a	dac=d	dad=b	dba=d	dbb=c	dbc=b	dbd=a	dca=a	dcb=b	dcc=c	dcd=d	dda=b	ddb=d	ddc=a	ddd=c		d♦1=c	d♦2=c	d♦3=b
c'ty none — a'ty none — self-d'ty none — m'ty false — decomp sinisterior — sub_quasi {a} {b}

4:748		identities:   aa_,   bb_,   cc_,   dd_															skews
aaa=a	aab=b	aac=c	aad=d	aba=b	abb=d	abc=a	abd=c	aca=d	acb=c	acc=b	acd=a	ada=c	adb=a	adc=d	add=b		a♦1=a	a♦2=a	a♦3=a
baa=d	bab=c	bac=b	bad=a	bba=a	bbb=b	bbc=c	bbd=d	bca=c	bcb=a	bcc=d	bcd=b	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=c	cbb=a	cbc=d	cbd=b	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=c	dab=a	dac=d	dad=b	dba=d	dbb=c	dbc=b	dbd=a	dca=b	dcb=d	dcc=a	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 dexterior — m'ty false — decomp sinisterior — sub_quasi {a} {b} {c} {d}																	all invertible

4:797		identities:   aa_,   bb_,   b_b,   _bb,   cd_,   dc_															skews
aaa=a	aab=b	aac=c	aad=d	aba=c	abb=a	abc=d	abd=b	aca=b	acb=d	acc=a	acd=c	ada=d	adb=c	adc=b	add=a		a♦1=a	a♦2=a	a♦3=a
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=c	ccb=a	ccc=d	ccd=b	cda=a	cdb=b	cdc=c	cdd=d		c♦1=d	c♦2=d	c♦3=a
daa=d	dab=c	dac=b	dad=a	dba=b	dbb=d	dbc=a	dbd=c	dca=a	dcb=b	dcc=c	dcd=d	dda=c	ddb=a	ddc=d	ddd=b		d♦1=c	d♦2=c	d♦3=c
c'ty sinisterior — a'ty none — self-d'ty none — m'ty false — decomp sinisterior — sub_quasi {a} {b}

4:1300		identities:   aa_,   bb_,   cc_,   dd_															skews
aaa=a	aab=b	aac=c	aad=d	aba=c	abb=d	abc=a	abd=b	aca=d	acb=c	acc=b	acd=a	ada=b	adb=a	adc=d	add=c		a♦1=a	a♦2=a	a♦3=a
baa=c	bab=d	bac=a	bad=b	bba=a	bbb=b	bbc=c	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=d	cab=c	cac=b	cad=a	cba=b	cbb=a	cbc=d	cbd=c	cca=a	ccb=b	ccc=c	ccd=d	cda=c	cdb=d	cdc=a	cdd=b		c♦1=c	c♦2=c	c♦3=c
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 sinisterior — a'ty none — self-d'ty full — m'ty true — decomp sinister, dexterior — sub_quasi {a} {b} {c} {d}																	all invertible

4:1349		identities:   aa_,   bc_,   cd_,   db_															skews
aaa=a	aab=b	aac=c	aad=d	aba=c	abb=d	abc=a	abd=b	aca=d	acb=c	acc=b	acd=a	ada=b	adb=a	adc=d	add=c		a♦1=a	a♦2=a	a♦3=a
baa=d	bab=c	bac=b	bad=a	bba=b	bbb=a	bbc=d	bbd=c	bca=a	bcb=b	bcc=c	bcd=d	bda=c	bdb=d	bdc=a	bdd=b		b♦1=d	b♦2=c	b♦3=a
caa=b	cab=a	cac=d	cad=c	cba=d	cbb=c	cbc=b	cbd=a	cca=c	ccb=d	ccc=a	ccd=b	cda=a	cdb=b	cdc=c	cdd=d		c♦1=b	c♦2=d	c♦3=a
daa=c	dab=d	dac=a	dad=b	dba=a	dbb=b	dbc=c	dbd=d	dca=b	dcb=a	dcc=d	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 none — m'ty true — decomp sinister, dexterior — sub_quasi {a}

4:1632		identities:   aa_,   _aa,   bb_,   _bb,   cc_,   _cc,   dd_,   _dd															skews
aaa=a	aab=b	aac=c	aad=d	aba=d	abb=a	abc=b	abd=c	aca=c	acb=d	acc=a	acd=b	ada=b	adb=c	adc=d	add=a		a♦1=a	a♦2=a	a♦3=a
baa=b	bab=c	bac=d	bad=a	bba=a	bbb=b	bbc=c	bbd=d	bca=d	bcb=a	bcc=b	bcd=c	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=b	cbb=c	cbc=d	cbd=a	cca=a	ccb=b	ccc=c	ccd=d	cda=d	cdb=a	cdc=b	cdd=c		c♦1=c	c♦2=c	c♦3=c
daa=d	dab=a	dac=b	dad=c	dba=c	dbb=d	dbc=a	dbd=b	dca=b	dcb=c	dcc=d	dcd=a	dda=a	ddb=b	ddc=c	ddd=d		d♦1=d	d♦2=d	d♦3=d
c'ty exterior — a'ty full — self-d'ty full — m'ty true — decomp sinister, dexterior — sub_quasi {a} {b} {c} {d} {ac} {bd}																	all invertible

4:1881		identities:   aa_,   _aa,   bc_,   _bd,   _cb,   cd_,   db_,   _dc															skews
aaa=a	aab=b	aac=c	aad=d	aba=d	abb=c	abc=b	abd=a	aca=b	acb=a	acc=d	acd=c	ada=c	adb=d	adc=a	add=b		a♦1=a	a♦2=a	a♦3=a
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=d	b♦2=c	b♦3=d
caa=c	cab=d	cac=a	cad=b	cba=b	cbb=a	cbc=d	cbd=c	cca=d	ccb=c	ccc=b	ccd=a	cda=a	cdb=b	cdc=c	cdd=d		c♦1=b	c♦2=d	c♦3=b
daa=d	dab=c	dac=b	dad=a	dba=a	dbb=b	dbc=c	dbd=d	dca=c	dcb=d	dcc=a	dcd=b	dda=b	ddb=a	ddc=d	ddd=c		d♦1=c	d♦2=b	d♦3=c
c'ty exterior — a'ty exterior — self-d'ty none — m'ty true — decomp sinister, dexterior — sub_quasi {a}																	all invertible

4:1948		identities:   aa_,   bd_,   cb_,   dc_															skews
aaa=a	aab=b	aac=c	aad=d	aba=d	abb=c	abc=b	abd=a	aca=b	acb=a	acc=d	acd=c	ada=c	adb=d	adc=a	add=b		a♦1=a	a♦2=a	a♦3=a
baa=c	bab=d	bac=a	bad=b	bba=b	bbb=a	bbc=d	bbd=c	bca=d	bcb=c	bcc=b	bcd=a	bda=a	bdb=b	bdc=c	bdd=d		b♦1=c	b♦2=d	b♦3=a
caa=d	cab=c	cac=b	cad=a	cba=a	cbb=b	cbc=c	cbd=d	cca=c	ccb=d	ccc=a	ccd=b	cda=b	cdb=a	cdc=d	cdd=c		c♦1=d	c♦2=b	c♦3=a
daa=b	dab=a	dac=d	dad=c	dba=c	dbb=d	dbc=a	dbd=b	dca=a	dcb=b	dcc=c	dcd=d	dda=d	ddb=c	ddc=b	ddd=a		d♦1=b	d♦2=c	d♦3=a
c'ty none — a'ty none — self-d'ty none — m'ty true — decomp sinister, dexterior — sub_quasi {a}

4:2023		identities:   aa_,   _aa,   bc_,   _bd,   cd_,   db_															skews
aaa=a	aab=b	aac=c	aad=d	aba=d	abb=c	abc=b	abd=a	aca=b	acb=d	acc=a	acd=c	ada=c	adb=a	adc=d	add=b		a♦1=a	a♦2=a	a♦3=a
baa=b	bab=d	bac=a	bad=c	bba=c	bbb=a	bbc=d	bbd=b	bca=a	bcb=b	bcc=c	bcd=d	bda=d	bdb=c	bdc=b	bdd=a		b♦1=d	b♦2=c	b♦3=d
caa=c	cab=a	cac=d	cad=b	cba=b	cbb=d	cbc=a	cbd=c	cca=d	ccb=c	ccc=b	ccd=a	cda=a	cdb=b	cdc=c	cdd=d		c♦1=b	c♦2=d	c♦3=b
daa=d	dab=c	dac=b	dad=a	dba=a	dbb=b	dbc=c	dbd=d	dca=c	dcb=a	dcc=d	dcd=b	dda=b	ddb=d	ddc=a	ddd=c		d♦1=c	d♦2=b	d♦3=b
c'ty none — a'ty none — self-d'ty none — m'ty false — decomp sinisterior — sub_quasi {a}

4:2666		identities:   none															skews
aaa=a	aab=b	aac=d	aad=c	aba=b	abb=a	abc=c	abd=d	aca=d	acb=c	acc=b	acd=a	ada=c	adb=d	adc=a	add=b		a♦1=a	a♦2=a	a♦3=a
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=d	cab=c	cac=b	cad=a	cba=c	cbb=d	cbc=a	cbd=b	cca=b	ccb=a	ccc=c	ccd=d	cda=a	cdb=b	cdc=d	cdd=c		c♦1=c	c♦2=c	c♦3=c
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 full — a'ty none — self-d'ty full — m'ty true — decomp sinister, dexterior — sub_quasi {a} {b} {c} {d} {ab} {cd}																	all invertible

4:2667		identities:   cd_,   d_c,   _cd,   dc_,   c_d,   _dc															skews
aaa=a	aab=b	aac=d	aad=c	aba=b	abb=a	abc=c	abd=d	aca=d	acb=c	acc=b	acd=a	ada=c	adb=d	adc=a	add=b		a♦1=a	a♦2=a	a♦3=a
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=d	cab=c	cac=b	cad=a	cba=c	cbb=d	cbc=a	cbd=b	cca=b	ccb=a	ccc=d	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 {a} {b} {ab} {cd}																	all invertible

4:2756		identities:   a_a,   _aa,   _bc,   d_b,   b_c,   _cd,   _db,   c_d															skews
aaa=a	aab=b	aac=d	aad=c	aba=b	abb=c	abc=a	abd=d	aca=c	acb=d	acc=b	acd=a	ada=d	adb=a	adc=c	add=b		a♦1=a	a♦2=a	a♦3=a
baa=b	bab=c	bac=a	bad=d	bba=c	bbb=d	bbc=b	bbd=a	bca=d	bcb=a	bcc=c	bcd=b	bda=a	bdb=b	bdc=d	bdd=c		b♦1=d	b♦2=d	b♦3=c
caa=c	cab=d	cac=b	cad=a	cba=d	cbb=a	cbc=c	cbd=b	cca=a	ccb=b	ccc=d	ccd=c	cda=b	cdb=c	cdc=a	cdd=d		c♦1=b	c♦2=b	c♦3=d
daa=d	dab=a	dac=c	dad=b	dba=a	dbb=b	dbc=d	dbd=c	dca=b	dcb=c	dcc=a	dcd=d	dda=c	ddb=d	ddc=b	ddd=a		d♦1=c	d♦2=c	d♦3=b
c'ty sinisterior — a'ty none — self-d'ty none — m'ty false — decomp sinister, dexterior — sub_quasi {a}																	all invertible