Sylow-unique prime divisor

This article defines a property of a prime divisor of an integer, one that is important/useful in the use of Sylow theory to study groups

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History

This term is local to the wiki. To learn more about why this name was chosen for the term, and how it does not conflict with existing choice of terminology, refer the talk page

Definition

Symbol-free divisor

A prime divisor of a number is said to be Sylow-unique if for every group whose order is that number, there is a unique Sylow subgroup corresponding to that prime divisor.

Definition with symbols

A prime divisor ${\displaystyle p}$ of a number ${\displaystyle N}$ is said to be Sylow-unique if for any group ${\displaystyle G}$ of order ${\displaystyle N}$, there is a unique ${\displaystyle p}$-Sylow subgroup.

Relation with other properties

Stronger properties

• Sylow-direct prime divisor: A prime divisor such that the Sylow subgroup for that prime divisor is a direct factor of that group, for any group of the given order

Weaker properties

• Core-nontrivial prime divisor
• Closure-proper prime divisor

Testing for Sylow-uniqueness

We fix some notation. Let ${\displaystyle p}$ be the prime divisor, ${\displaystyle k}$ the exponent of ${\displaystyle p}$ in ${\displaystyle N}$, and ${\displaystyle m}$ the coprime part, viz ${\displaystyle m=N/p^{k}}$.

Divisibility and congruence tests

Let ${\displaystyle n_{p}}$ denote the number of ${\displaystyle p}$-Sylow subgroups in the given group ${\displaystyle G}$. We know that the following hold:

• ${\displaystyle n_{p}\equiv 1\mod p}$ (the congruence condition in Sylow's theorem)
• ${\displaystyle n_{p}}$ divides ${\displaystyle m}$ (the divisibility condition)

Note that both these conditions are purely in terms of ${\displaystyle N}$ and ${\displaystyle p}$ and do not depend on ${\displaystyle G}$. if the only solution to both these conditions is the solution ${\displaystyle n_{p}=1}$, then clearly, ${\displaystyle p}$ is Sylow-unique.

Note, however, that while a unique solution to the congruence and divisibility conditions guarantees Sylow-uniqueness, the converse is not true. This is because there may be solutions to the congruence and divisibility conditions that do not get realized for actual groups.

Presentations/talks on this

• Using Sylow theory in the classification of finite simple groups