# Counting the solutions of $\lambda_1 x_1^{k_1}+\cdots +\lambda_t   x_t^{k_t}\equiv c\bmod{n}$

**Authors:** Songsong Li, Yi Ouyang

arXiv: 1705.07584 · 2017-05-23

## TL;DR

This paper derives formulas and algorithms to count solutions of polynomial congruences involving sums of powers modulo integers, with applications to quadratic and linear cases over primes and prime powers.

## Contribution

It provides new explicit formulas and an algorithm for counting solutions of polynomial congruences, extending previous results to more general cases and specific polynomial forms.

## Key findings

- Complete solution for linear polynomial solutions over primes.
- Explicit counting formulas for quadratic cases when t=2.
- General results for polynomial solutions with specific p-adic valuation conditions.

## Abstract

Given a polynomial $Q(x_1,\cdots, x_t)=\lambda_1 x_1^{k_1}+\cdots +\lambda_t x_t^{k_t}$, for every $c\in \mathbb{Z}$ and $n\geq 2$, we study the number of solutions $N_J(Q;c,n)$ of the congruence equation $Q(x_1,\cdots, x_t)\equiv c\bmod{n}$ in $(\mathbb{Z}/n\mathbb{Z})^t$ such that $x_i\in (\mathbb{Z}/n\mathbb{Z})^\times$ for $i\in J\subseteq I= \{1,\cdots, t\}$. We deduce formulas and an algorithm to study $N_J(Q; c,p^a)$ for $p$ any prime number and $a\geq 1$ any integer. As consequences of our main results, we completely solve: the counting problem of $Q(x_i)=\sum\limits_{i\in I}\lambda_i x_i$ for any prime $p$ and any subset $J$ of $I$; the counting problem of $Q(x_i)=\sum\limits_{i\in I}\lambda_i x^2_i$ in the case $t=2$ for any $p$ and $J$, and the case $t$ general for any $p$ and $J$ satisfying $\min\{v_p(\lambda_i)\mid i\in I\}=\min\{v_p(\lambda_i)\mid i\in J\}$; the counting problem of $Q(x_i)=\sum\limits_{i\in I}\lambda_i x^k_i$ in the case $t=2$ for any $p\nmid k$ and any $J$, and in the case $t$ general for any $p\nmid k$ and $J$ satisfying $\min\{v_p(\lambda_i)\mid i\in I\}=\min\{v_p(\lambda_i)\mid i\in J\}$.

## Full text

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## References

11 references — full list in the complete paper: https://tomesphere.com/paper/1705.07584/full.md

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Source: https://tomesphere.com/paper/1705.07584