#14361 ⟨
a
,
b
|
aaaa
=
a
,
babab
=
a
⟩
Up:
Monoids with two generators and two relations
Prev:
#14360
⟨
a
,
b
|
aaaa
=
a
,
baabb
=
b
⟩
Next:
#14362
⟨
a
,
b
|
aaaa
=
a
,
babab
=
b
⟩
Properties
Presentation has sum-of-sides 11
Infinite non-cancellative commutative monoid
Commutative Gröbner basis: ⟨
a
,
b
|
a
4
=
a
,
a
b
3
=
a
3
⟩
Not cancellative, because multiplication by
ab
is not injective:
b
3
≠
a
2
ab
⋅
b
3
=
a
3
b
ab
⋅
a
2
=
a
3
b
Cancellative quotient is isomorphic to ℤ
9
Grothendieck group is isomorphic to ℤ
9
Group of units is isomorphic to ℤ
1
3 Archimedian components:
1,
a
,
b
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 shortlex with
a
<
b
ba
⇒
ab
a
4
⇒
a
a
b
3
⇒
a
3
# ab:aaaa=a,babab=a ab ba=ab aaaa=a abbb=aaa
Staircase diagram
Right Cayley graph (truncated)
