#57 ⟨a, b | aa=a, bb=a⟩

Properties

Presentation has sum-of-sides 6
Isomorphic to ℕ_{(4 = 2)}
Finite commutative monoid with 4 elements
Commutative Gröbner basis: ⟨a, b | b⁴=b², a=b²⟩
Not cancellative, because multiplication by b³ is not injective:
- b² ≠ 1
- b³ ⋅ b² = b³
- b³ ⋅ 1 = b³
- Cancellative quotient is isomorphic to ℤ₂
Grothendieck group is isomorphic to ℤ₂
Group of units is isomorphic to ℤ₁
2 Archimedian components:
- 1, b

Element profile

2 idempotent elements:
- 1, b²

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

b⁴ ⇒ b²
a ⇒ b²

# ab:aa=a,bb=a b/a
bbbb=bb
a=bb

Staircase diagram

Cayley table

Idempotents are shown in bold.

	1	b	b²	b³
1	1	b	b²	b³
b	b	b²	b³	b²
b²	b²	b³	b²	b³
b³	b³	b²	b³	b²

Right Cayley graph

Idempotents are shown in bold.

Others with same cardinality

8 unique, 1570 total

Σ	#	Presentation	Description	Related
5	7	⟨a, b \| aa=b, bb=1⟩	Isomorphic to ℤ₄	1419 iso
6	61	⟨a, b \| aa=b, bb=a⟩	Isomorphic to ℕ_{(4 = 1)}	72 iso
7	158	⟨a, b \| ab=aa, ba=b⟩	Finite non-commutative monoid with 4 elements	8 iso, 6 anti-iso
7	159	⟨a, b \| ab=aa, bb=a⟩	Isomorphic to ℕ_{(4 = 3)}	16 iso
7	242	⟨a, b \| aa=a, abb=b⟩	Finite non-commutative monoid with 4 elements	14 iso
7	280	⟨a, b \| ab=a, bb=aa⟩	Finite commutative monoid with 4 elements	17 iso
9	2881	⟨a, b \| aa=a, abbba=b⟩	Finite commutative monoid with 4 elements	8 iso
10	5033	⟨a, b \| aaa=aa, abba=b⟩	Finite commutative monoid with 4 elements	2 iso

Other isomorphic instances

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

37 total

Σ	#	Presentation	Mapping
7	250	⟨a, b \| aa=b, aab=b⟩	φ(a) = b, φ(b) = bb
7	252	⟨a, b \| aa=b, aba=b⟩	φ(a) = b, φ(b) = bb
7	276	⟨a, b \| aa=a, bb=aa⟩	φ(a) = bb, φ(b) = b
7	278	⟨a, b \| aa=b, bb=aa⟩	φ(a) = b, φ(b) = bb
8	631	⟨a, b \| ab=aa, aaa=b⟩	φ(a) = b, φ(b) = bbb
8	633	⟨a, b \| ab=aa, aab=b⟩	φ(a) = b, φ(b) = bbb
8	635	⟨a, b \| ab=aa, aba=b⟩	φ(a) = b, φ(b) = bbb
8	637	⟨a, b \| ab=aa, abb=b⟩	φ(a) = b, φ(b) = bbb
8	901	⟨a, b \| aa=b, aaaa=b⟩	φ(a) = b, φ(b) = bb
8	954	⟨a, b \| aa=a, aaa=bb⟩	φ(a) = bb, φ(b) = b
8	975	⟨a, b \| aa=b, aab=aa⟩	φ(a) = b, φ(b) = bb
8	979	⟨a, b \| aa=b, aba=aa⟩	φ(a) = b, φ(b) = bb
9	1611	⟨a, b \| aab=aa, aba=b⟩	φ(a) = b, φ(b) = bb
9	3002	⟨a, b \| aa=a, aaaa=bb⟩	φ(a) = bb, φ(b) = b
9	3036	⟨a, b \| aa=b, aaaa=aa⟩	φ(a) = b, φ(b) = bb
10	5101	⟨a, b \| aab=aa, aabb=b⟩	φ(a) = b, φ(b) = bb
10	5105	⟨a, b \| aab=aa, abab=b⟩	φ(a) = b, φ(b) = bb
10	5107	⟨a, b \| aab=aa, abba=b⟩	φ(a) = b, φ(b) = bb
10	5233	⟨a, b \| aba=aa, abba=b⟩	φ(a) = b, φ(b) = bb
10	6562	⟨a, b \| aaa=b, aaaa=aa⟩	φ(a) = b, φ(b) = bbb
10	6613	⟨a, b \| aab=a, aabb=bb⟩	φ(a) = bbb, φ(b) = b
10	6621	⟨a, b \| aab=a, abab=bb⟩	φ(a) = bbb, φ(b) = b
10	6625	⟨a, b \| aab=a, abba=bb⟩	φ(a) = bbb, φ(b) = b
10	6666	⟨a, b \| aab=b, aaab=aa⟩	φ(a) = b, φ(b) = bbb
10	6765	⟨a, b \| aba=b, aaab=aa⟩	φ(a) = b, φ(b) = bbb
10	6769	⟨a, b \| aba=b, aaba=aa⟩	φ(a) = b, φ(b) = bbb
10	8842	⟨a, b \| aa=a, aaaaa=bb⟩	φ(a) = bb, φ(b) = b
11	15560	⟨a, b \| aab=aa, aabbb=b⟩	φ(a) = b, φ(b) = bb
11	15568	⟨a, b \| aab=aa, ababb=b⟩	φ(a) = b, φ(b) = bb
11	15572	⟨a, b \| aab=aa, abbab=b⟩	φ(a) = b, φ(b) = bb
11	15574	⟨a, b \| aab=aa, abbba=b⟩	φ(a) = b, φ(b) = bb
11	15826	⟨a, b \| aba=aa, abbba=b⟩	φ(a) = b, φ(b) = bb
11	19508	⟨a, b \| aab=b, aaaab=aa⟩	φ(a) = b, φ(b) = bb
11	19707	⟨a, b \| aba=b, aaaab=aa⟩	φ(a) = b, φ(b) = bb
11	19711	⟨a, b \| aba=b, aaaba=aa⟩	φ(a) = b, φ(b) = bb
11	19719	⟨a, b \| aba=b, aabaa=aa⟩	φ(a) = b, φ(b) = bb
11	24590	⟨a, b \| aa=a, aaaaaa=bb⟩	φ(a) = bb, φ(b) = b

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