A Diophantine inequality with five squares of Piatetski-Shapiro primes

Abstract

Let [\,·\,] denote the floor function. Assume that λ1, λ2, λ3, λ4, λ5 are nonzero real numbers, not all of the same sign, that λ1/λ2 is irrational, and that η is a real number. Let 7172<γ<1 and θ>0. We prove that there exist infinitely many quintuples of primes p1,\, p2,\, p3,\, p4,\, p5 satisfying the Diophantine inequality equation* |λ1p21 + λ2p22 + λ3p23+ λ4p24 + λ5p25+η|<( pj)71-72γ29+θ\,, equation* where pi=[ni1/γ], i=1,\,2,\,3,\,4,\,5. We also prove analogous theorems by raising the last variable in the inequality to the third and fourth powers.