On the $k$-free values of the polynomial $xy^k+C$

Kostadinka Lapkova

arXiv:1506.08044·math.NT·October 21, 2015

On the $k$-free values of the polynomial $xy^k+C$

Kostadinka Lapkova

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TL;DR

This paper establishes asymptotic formulas for the distribution of $k$-free values of the polynomial $xy^k+C$ over integers and primes, utilizing advanced determinant methods to extend previous results.

Contribution

It provides new asymptotic formulas for $k$-free values of the polynomial $xy^k+C$ over integers and primes, employing a generalized determinant method.

Findings

01

Asymptotic formula for $k$-free values of $f(x,y)$ over integers.

02

Asymptotic formula for $k$-free values of $f(p,q)$ over primes.

03

Application of Reuss's generalized determinant method.

Abstract

Consider the polynomial $f (x, y) = x y^{k} + C$ for $k \geq 2$ and any nonzero integer constant $C$ . We derive an asymptotic formula for the $k$ -free values of $f (x, y)$ when $x, y \leq H$ . We also prove a similar result for the $k$ -free values of $f (p, q)$ when $p, q \leq H$ are primes. The strongest tool we use is a recent generalization of the determinant method due to Reuss.

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Taxonomy

TopicsAnalytic Number Theory Research · Algebraic Geometry and Number Theory · Advanced Mathematical Identities