The exceptional set for Diophantine approximation with mixed powers of prime variables
Abstract
Let lambda1, λ2, λ3, λ4 be non-zero real numbers, not all negative, with λ1/λ2 irrational and algebraic. Suppose that V is a well-spaced sequence and δ >0. In this paper, it is proved that for any >0, the number of v ∈ V with v ≤slant N for which |λ1 p12 + λ2 p23+ λ3 p34+ λ4 p45 - v| < v-δ has no solution in prime variables p1,p2,p3,p4 does not exceed O(N359378 + 2δ +). This result constitutes an improvement upon that of Q. W. Mu and Z. P. Gao [12].
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