Left-associative elements of loop form subgroup: Difference between revisions

Statement

Suppose ${\displaystyle (L,*)}$ is an algebra loop. Then, the Left nucleus (?) of ${\displaystyle L}$, i.e., the set of left-associative elements of ${\displaystyle L}$, is nonempty and forms a subgroup of ${\displaystyle L}$. This subgroup is sometimes termed the left kernel of ${\displaystyle L}$ or the left-associative center of ${\displaystyle L}$.

Related facts

• Middle-associative elements of algebra loop form subgroup
• Right-associative elements of algebra loop form subgroup

Facts used

1. Left-associative elements of magma form submagma

Proof

Given: An algebra loop ${\displaystyle (L,*)}$ with identity element ${\displaystyle e}$. ${\displaystyle S}$ is the set of left-associative elements of ${\displaystyle L}$.

To prove: ${\displaystyle S}$ is a subgroup of ${\displaystyle L}$.

Proof: By fact (1), ${\displaystyle S}$ is closed under ${\displaystyle *}$. Also, ${\displaystyle e}$ is clearly in ${\displaystyle S}$. Since all elements of ${\displaystyle S}$ are left-associative, ${\displaystyle S}$ itself satisfies associativity, so ${\displaystyle S}$ is a submonoid of ${\displaystyle L}$.

We now show that if ${\displaystyle a\in S}$, and ${\displaystyle b}$ is the right inverse of ${\displaystyle a}$ in ${\displaystyle L}$, then ${\displaystyle b\in S}$. For any ${\displaystyle c,d\in S}$, we have:

${\displaystyle a*(b*(c*d))=(a*b)*(c*d)=e*(c*d)=c*d}$.

Similarly, we have:

${\displaystyle a*((b*c)*d)=(a*(b*c))*d=((a*b)*c)*d)=(e*c)*d=c*d}$.

Thus, we get:

${\displaystyle a*(b*(c*d))=a*((b*c)*d)=c*d}$.

Since the equation ${\displaystyle a*x=c*d}$ has a unique solution, we get that:

${\displaystyle b*(c*d)=(b*c)*d}$.

Thus, ${\displaystyle b}$ is left-associative.

Thus, the right inverse of every element in ${\displaystyle S}$ is in ${\displaystyle S}$. Thus, ${\displaystyle S}$ is a monoid in which every element has a right inverse. We now want to show that every element has a two-sided inverse.

Suppose ${\displaystyle a\in S}$ with right inverse ${\displaystyle b}$. ${\displaystyle b}$ has right inverse ${\displaystyle a'}$. Then, by associativity in ${\displaystyle S}$, ${\displaystyle a=a*e=a*(b*a')=(a*b)*a'=e*a'=a'}$. Thus, ${\displaystyle b}$ and ${\displaystyle a}$ are two-sided inverses of each other, completing the proof.