#450 ⟨a, b | bab=aa, bbb=1⟩

Properties

Presentation has sum-of-sides 8
Finite non-commutative monoid with 27 elements

Element profile

3 element center:
- 1, (ab)², (ab²)³
2 idempotent elements:
- 1, (ab²)³

Complete rewriting system

Format:	Pretty Plain
Word to reduce:
	Tips: Lowercase letters stand for generators. Spaces are ignored. Numbers repeat the previous letter, e.g. `b90`.
Reduction strategy:	Leftmost Rightmost
Path to normal form:	1 1

Reduction order:
- Left-to-right recursive path with deg(b) = 0; deg(a) = 1

b³ ⇒ 1
a² ⇒ bab
(ba)² ⇒ (ab)²
abab²a ⇒ (b²a)²b
ba(b²a)² ⇒ a(b²a)²b

# ab:bab=aa,bbb=1 b/a
bbb=1
aa=bab
baba=abab
ababba=bbabbab
babbabba=abbabbab

Right Cayley graph

Left Cayley graph

Others with same cardinality

6 unique, 66 total

Σ	#	Presentation	Description	Related
8	752	⟨a, b \| aaa=1, babb=a⟩	Finite non-Abelian group with 27 elements	58 iso, 1 anti-iso
9	1695	⟨a, b \| bab=aa, bbb=b⟩	Finite non-commutative monoid with 27 elements	1 iso
10	5300	⟨a, b \| aaa=aa, aba=bb⟩	Finite non-commutative monoid with 27 elements
11	15514	⟨a, b \| aaa=bb, aabaa=b⟩	Finite non-commutative monoid with 27 elements
11	18739	⟨a, b \| aaa=a, abbbbb=b⟩	Finite non-commutative monoid with 27 elements
11	20314	⟨a, b \| aba=b, bbbb=aaa⟩	Finite non-commutative monoid with 27 elements

Other isomorphic instances

The mapping is from the listed presentation's alphabet to the current rewriting system's alphabet.

27 total

Σ	#	Presentation	Mapping
8	747	⟨a, b \| aaa=1, abba=b⟩	φ(a) = b, φ(b) = abbab
9	1305	⟨a, b \| baa=abb, bbb=1⟩	φ(a) = abbab, φ(b) = b
9	1310	⟨a, b \| bab=aba, bbb=1⟩	φ(a) = abb, φ(b) = b
9	2435	⟨a, b \| aaa=1, ababa=b⟩	φ(a) = b, φ(b) = abba
9	2573	⟨a, b \| aaa=1, aabb=ba⟩	φ(a) = b, φ(b) = a
10	7503	⟨a, b \| aaa=1, aabbaa=b⟩	φ(a) = b, φ(b) = a
10	7513	⟨a, b \| aaa=1, abaaba=b⟩	φ(a) = b, φ(b) = abbabb
10	7769	⟨a, b \| aaa=1, aabaa=bb⟩	φ(a) = b, φ(b) = abbab
10	7772	⟨a, b \| aaa=1, aabab=ba⟩	φ(a) = b, φ(b) = abb
10	7775	⟨a, b \| aaa=1, aabba=ab⟩	φ(a) = b, φ(b) = abbab
10	8041	⟨a, b \| aaa=1, aaba=abb⟩	φ(a) = b, φ(b) = a
10	8058	⟨a, b \| aaa=1, abab=baa⟩	φ(a) = b, φ(b) = abba
10	8078	⟨a, b \| aaa=1, baab=aba⟩	φ(a) = b, φ(b) = ab
11	21661	⟨a, b \| aaa=1, aaaabba=b⟩	φ(a) = b, φ(b) = abbab
11	21687	⟨a, b \| aaa=1, aababaa=b⟩	φ(a) = b, φ(b) = abb
11	21711	⟨a, b \| aaa=1, abaaaba=b⟩	φ(a) = b, φ(b) = abbab
11	22202	⟨a, b \| aaa=1, aaaaba=bb⟩	φ(a) = b, φ(b) = a
11	22225	⟨a, b \| aaa=1, aabaab=ba⟩	φ(a) = b, φ(b) = ab
11	22228	⟨a, b \| aaa=1, aababa=ab⟩	φ(a) = b, φ(b) = abba
11	22744	⟨a, b \| aaa=1, aaabb=aba⟩	φ(a) = b, φ(b) = a
11	22754	⟨a, b \| aaa=1, aabaa=bab⟩	φ(a) = b, φ(b) = abba
11	22768	⟨a, b \| aaa=1, aabba=baa⟩	φ(a) = b, φ(b) = a
11	22784	⟨a, b \| aaa=1, abaab=baa⟩	φ(a) = b, φ(b) = abbabb
11	22826	⟨a, b \| aaa=1, baaab=aba⟩	φ(a) = b, φ(b) = a
11	23272	⟨a, b \| aaa=1, abaa=aabb⟩	φ(a) = b, φ(b) = abbab
11	23275	⟨a, b \| aaa=1, abab=aaba⟩	φ(a) = b, φ(b) = abb
11	23279	⟨a, b \| aaa=1, abba=aaab⟩	φ(a) = b, φ(b) = abbab

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