Prime solutions to polynomial equations in many variables and differing degrees
Abstract
Let be a system of polynomials with integer coefficients in which the degrees need not all be the same. We provide sufficient conditions for which the system of equations satisfies a general local to global type statement, and has a solution where each coordinate is prime. In fact we obtain the asymptotic formula for number of such solutions, counted with a logarithmic weight, under these conditions. We prove the statement via the Hardy-Littlewood circle method. This is a generalization of the work of B. Cook and \'{A}. Magyar, where they obtained the result when the polynomials of all have the same degree. Hitherto, results of this type for systems of polynomial equations involving different degrees have been restricted to the diagonal case.
Cite
@article{arxiv.1703.03332,
title = {Prime solutions to polynomial equations in many variables and differing degrees},
author = {Shuntaro Yamagishi},
journal= {arXiv preprint arXiv:1703.03332},
year = {2017}
}
Comments
66 pages