# Establishing Conditions on the Degree of Regularity of Linear   Homogeneous Equations

**Authors:** Nathan Johns

arXiv: 1701.08252 · 2017-01-31

## TL;DR

This paper investigates the degree of regularity of linear homogeneous equations, proving that many such equations in n variables have degree n-1 and establishing conditions for this property.

## Contribution

It provides new proofs and conditions for when linear homogeneous equations in n variables have degree of regularity n-1, advancing understanding of Rado's conjecture.

## Key findings

- Many families of equations have degree of regularity n-1
- Conditions are established for when equations have degree n-1
- The work advances understanding of the structure of regular equations

## Abstract

In 1933, Rado conjectured that for any positive integer n, there is always a linear homogeneous equation with degree of regularity n. In proving this conjecture, Alexeev and Tsimerman, and independently Golowich, found that some equations in n variables have degree of regularity n-1 for any value of n. Their work left many questions as to how and which other properties of equations are closely tied to the degree of regularity, and if there is a simpler or more effective way of thinking about it. In this paper, we answer some of these questions, prove that various families of linear homogeneous equations in n variables have degree of regularity n-1, and establish some conditions under which this property holds.

## Full text

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## References

6 references — full list in the complete paper: https://tomesphere.com/paper/1701.08252/full.md

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Source: https://tomesphere.com/paper/1701.08252