#25603 ⟨a, b | ab=a, bbaaa=bbb

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Properties

Element profile

Complete rewriting system

Format:
Word to reduce:
Tips:
  • Lowercase letters stand for generators.
  • Spaces are ignored.
  • Numbers repeat the previous letter, e.g. b90.
Reduction strategy:
Path to normal form: 1 
1
  1. a4a
  2. aba
  3. b3b2a3 
# ab:ab=a,bbaaa=bbb a/b
aaaa=a
ab=a
bbb=bbaaa

Cayley table

Idempotents are shown in bold.

1aba2bab2a3ba2b2aba3b2a2b2a3
11aba2bab2a3ba2b2aba3b2a2b2a3
aaa2aa3a2aaa3a2aa3a
bbbab2ba2b2ab2a3ba3b2a2b2ab2a3b2a2b2a3
a2a2a3a2aa3a2a2aa3a2aa2
bababa2baba3ba2bababa3ba2baba3ba
b2b2b2ab2a3b2a2b2ab2a3b2a3b2a2b2ab2a3b2a2b2a3
a3a3aa3a2aa3a3a2aa3a2a3
ba2ba2ba3ba2baba3ba2ba2baba3ba2baba2
b2ab2ab2a2b2ab2a3b2a2b2ab2ab2a3b2a2b2ab2a3b2a
ba3ba3baba3ba2baba3ba3ba2baba3ba2ba3
b2a2b2a2b2a3b2a2b2ab2a3b2a2b2a2b2ab2a3b2a2b2ab2a2
b2a3b2a3b2ab2a3b2a2b2ab2a3b2a3b2a2b2ab2a3b2a2b2a3

Right Cayley graph

Idempotents are shown in bold.

Left Cayley graph

Idempotents are shown in bold.

Others with same cardinality

37 unique, 659 total

Σ#PresentationDescriptionRelated
7124a, b | aab=a, bbb=1⟩Finite non-commutative monoid with 12 elements23 iso, 38 anti-iso
8458a, b | aaaa=1, abbb=1⟩Isomorphic to ℤ12325 iso
8645a, b | ab=aa, bbb=bFinite non-commutative monoid with 12 elements1 anti-iso
91646a, b | aab=bb, aba=aFinite non-commutative monoid with 12 elements2 iso
91963a, b | aba=b, aaabb=1⟩Finite non-Abelian group with 12 elements30 iso
91998a, b | aaa=a, bbbb=aIsomorphic to ℕ(12 = 4)6 iso
92018a, b | aaa=b, bbbb=aIsomorphic to ℕ(12 = 1)27 iso
92019a, b | aaa=b, bbbb=bIsomorphic to ℕ(12 = 3)23 iso
92259a, b | ab=aa, bbb=bbFinite non-commutative monoid with 12 elements
105040a, b | aaa=aa, bbbb=aIsomorphic to ℕ(12 = 8)
105072a, b | aaa=ab, bbbb=aIsomorphic to ℕ(12 = 5)7 iso
105092a, b | aaa=bb, bbbb=aIsomorphic to ℕ(12 = 2)43 iso
105202a, b | aab=bb, abba=aFinite non-commutative monoid with 12 elements9 iso, 32 anti-iso
105330a, b | aaa=ab, bab=bbFinite non-commutative monoid with 12 elements1 iso
106597a, b | aaa=b, bbbb=bbIsomorphic to ℕ(12 = 6)4 iso
106660a, b | aab=a, bbbb=baFinite non-commutative monoid with 12 elements1 anti-iso
106661a, b | aab=a, bbbb=bbFinite non-commutative monoid with 12 elements1 anti-iso
107105a, b | ab=aa, bbaa=bbFinite non-commutative monoid with 12 elements2 iso
1112897a, b | aab=aaa, baaa=bFinite non-commutative monoid with 12 elements5 iso
1112910a, b | aab=aaa, bbbb=aIsomorphic to ℕ(12 = 9)2 iso
1115428a, b | aaa=aa, abbbb=bFinite non-commutative monoid with 12 elements
1115996a, b | aaa=ab, aabb=bbFinite non-commutative monoid with 12 elements2 iso
1116057a, b | aaa=bb, aabb=abFinite non-commutative monoid with 12 elements2 iso, 2 anti-iso
1116104a, b | aab=aa, abab=bbFinite non-commutative monoid with 12 elements
1116274a, b | aab=bb, aaaa=abFinite non-commutative monoid with 12 elements1 iso
1116275a, b | aab=bb, aaaa=baFinite non-commutative monoid with 12 elements
1116448a, b | aba=bb, aabb=aaFinite non-commutative monoid with 12 elements2 iso
1119773a, b | aba=b, bbbbb=aaFinite commutative monoid with 12 elements
1119917a, b | aaa=b, bbbb=abbIsomorphic to ℕ(12 = 7)2 iso
1120054a, b | aab=b, aaaa=bbaFinite non-commutative monoid with 12 elements
1120686a, b | bb=aa, aaaaab=aFinite commutative monoid with 12 elements15 iso
1120787a, b | ab=aa, baaaa=bbFinite non-commutative monoid with 12 elements7 iso
1121086a, b | bb=aa, aaaa=abaFinite non-commutative monoid with 12 elements4 iso
1121092a, b | bb=aa, aaab=abaFinite non-commutative monoid with 12 elements3 iso
1121112a, b | bb=aa, abab=abaFinite non-commutative monoid with 12 elements
1124147a, b | aa=a, abbbbbb=bFinite non-commutative monoid with 12 elements
1124991a, b | ab=a, baaaaa=bbFinite non-commutative monoid with 12 elements