# A combinatorial proof of the supper symmetric property of hook length

**Authors:** Masanori Ando

arXiv: 1904.00543 · 2019-04-09

## TL;DR

This paper provides a combinatorial proof demonstrating the super symmetric property of hook lengths in Young diagrams, showing uniform distribution of different hook types.

## Contribution

It introduces a combinatorial proof for the super symmetric property of hook lengths, a novel approach in understanding Young diagram structures.

## Key findings

- Hook lengths of different types appear uniformly in Young diagrams.
- A combinatorial proof confirms the super symmetric property.
- Uniform distribution of hook types is established.

## Abstract

There are $k$ kinds of length $k$ hooks with different arm length. Actually, this $k$ kinds appear uniformly in Young diagrams of size $n$. The property ``appear uniformly'' is called super symmetric. We give a combinatorial proof of the supper symmetric property of hook length.

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Source: https://tomesphere.com/paper/1904.00543