On a Diophantine inequality involving a prime and an almost-prime
Abstract
We prove that there are infinitely many solutions of |λ0+λ1p+λ2Pr|<p-τ, where r=3, τ=1118, and λ0 is an arbitrary real number and λ1,λ2∈ with λ2≠0 and 0>λ1λ2 not in Q. This improves a result by Harman. Moreover, we show that one can require the prime p to be of the form nc for some positive integer n, i.e. p is a Piatetski-Shapiro prime, with r=13 and τ=(c), a constant explicitly determined by c supported in (1, 1+1149].
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