Index satisfies transfer inequality: Difference between revisions

Statement

In terms of index

Suppose ${\displaystyle G}$ is a group and ${\displaystyle H,K}$ are subgroups of ${\displaystyle G}$. Then:

${\displaystyle [K:H\cap K]\leq [G:H]}$.

In terms of conditional probability

This formulation is valid for finite groups. It says that if ${\displaystyle G}$ is a group and ${\displaystyle H,K}$ are subgroups, then:

${\displaystyle {\frac {|H\cap K|}{|K|}}\geq {\frac {|H|}{|G|}}}$

In other words, what it says is that, for a uniform distribution on a finite group, knowing that a particular element is in the subgroup ${\displaystyle K}$ either increases or keeps the same the probability that the element is in the subgroup ${\displaystyle H}$.

Related facts

Applications

The formulation in terms of conditional probability is particularly useful to prove results on the fractions of tuples satisfying a groupy relation. See, for instance:

• Fraction of tuples satisfying groupy relation in subgroup is at least as much as in whole group
• Fraction of ordered pairs commuting in subgroup is at least as much as in whole group

Facts used

1. Product formula: if ${\displaystyle H,K\leq G}$ are subgroups, there is a natural bijection between the left cosets of ${\displaystyle H\cap K}$ in ${\displaystyle K}$ and the left cosets of ${\displaystyle H}$ in ${\displaystyle HK}$.

Proof

Given: A group ${\displaystyle G}$ with subgroups ${\displaystyle H,K}$.

To prove: ${\displaystyle [K:H\cap K]\leq [G:H]}$.

Proof: By fact (1), the number of left cosets of ${\displaystyle H}$ in ${\displaystyle HK}$ equals the number of left cosets of ${\displaystyle H\cap K}$ in ${\displaystyle K}$. Thus, the number of left cosets of ${\displaystyle H}$ in ${\displaystyle G}$ is at least as much as the number of left cosets of ${\displaystyle H\cap K}$ in ${\displaystyle k}$, yielding the desired inequality.