Variants of the Selberg sieve, and almost prime k-tuples
Abstract
Let k≥ 2 and P (n) = (A1 n + B1 ) ·s (Ak n + Bk) where all the Ai, Bi are integers. Suppose that P (n) has no fixed prime divisors. For each choice of k it is known that there exists an integer k such that P (n) has at most k prime factors infinitely often. We used a new weighted sieve set-up combined with a device called an -trick to improve the possible values of k for k≥ 7. As a by-product of our approach, we improve the conditional possible values of k for k≥ 4, assuming the generalized Elliott--Halberstam conjecture.
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