# On a quadratic Waring's problem with congruence conditions

**Authors:** Daejun Kim

arXiv: 1901.05142 · 2019-10-18

## TL;DR

This paper investigates a variant of Waring's problem for quadratic forms with congruence conditions, establishing exponential growth bounds and exact values for small dimensions.

## Contribution

It introduces the function g_Δ(n) for quadratic forms with congruence conditions and proves its growth rate is at most exponential in √n, matching known bounds for classical Waring's problem.

## Key findings

- g_Δ(n) grows at most exponentially with √n
- Exact values of g_Δ(n) are determined for n ≤ 4
- The growth rate matches bounds for classical quadratic Waring's problem

## Abstract

For each positive integer $n$, let $g_\Delta(n)$ be the smallest positive integer $g$ such that every complete quadratic polynomial in $n$ variables which can be represented by a sum of odd squares is represented by a sum of at most $g$ odd squares. In this paper, we analyze $g_\Delta(n)$ by studying representations of integral quadratic forms by sums of squares with certain congruence condition. We prove that the growth of $g_\Delta(n)$ is at most an exponential of $\sqrt{n}$, which is the same as the best known upper bound on the $g$-invariants of the original quadratic Waring's problem. We also determine the exact value of $g_\Delta(n)$ for each positive integer less than or equal to $4$.

## Full text

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## References

18 references — full list in the complete paper: https://tomesphere.com/paper/1901.05142/full.md

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Source: https://tomesphere.com/paper/1901.05142