The quaternary Piatetski-Shapiro inequality with one prime of the form p=x2+y2+1

Abstract

In this paper we show that, for any fixed 1<c<967/805, every sufficiently large positive number N and a small constant >0, the diophantine inequality equation* |p1c+p2c+p3c+p4c-N|< equation* has a solution in prime numbers p1,\,p2,\,p3,\,p4, such that p1=x2 + y2 +1.