A Diophantine inequality involving different powers of primes of the form [nc]
Abstract
Let [\, x\,] denote the integer part of a real number x. Assume that λ1,λ2,λ3 are nonzero real numbers, not all of the same sign, that λ1/λ2 is irrational, and that η is real. Let 219220<γ<1 and θ>0. We establish that, there exist infinitely many triples of primes p1,\, p2,\, p3 satisfying the inequality equation* |λ1p1 + λ2p2 + λ3p43+η|<( \p1, p2, p43\)219-220γ208+θ equation* and such that pi=[ni1/γ], i=1,\,2,\,3.
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