Restricted Burnside group

Definition

The restricted Burnside group ${\displaystyle RB(d,n)}$, sometimes denoted ${\displaystyle R(n,d)}$, is defined as the quotient group by the finite residual of the Burnside group ${\displaystyle B(d,n)}$. In other words, it is the quotient of ${\displaystyle B(n,d)}$ by the intersection of all normal subgroups of finite index in it.

Note that this group is a finite group if and only if the restricted Burnside problem for the pair ${\displaystyle (d,n)}$ has the answer Yes.

Facts

• Kostrikin's theorem on restricted Burnside problem: For any prime number ${\displaystyle p}$, the group ${\displaystyle RB(d,p)}$ is finite for every value of ${\displaystyle d}$.
• The condition that this group be finite is weaker than the condition that the Burnside group ${\displaystyle B(d,n)}$ be finite, i.e., there are many cases where ${\displaystyle B(d,n)}$ is known to be infinite and ${\displaystyle RB(d,n)}$ is known to be finite. This includes all odd primes greater than 665.
• In those cases where ${\displaystyle B(d,n)}$ is finite, ${\displaystyle RB(d,n)}$ is isomorphic to ${\displaystyle B(d,n)}$.