On almost-prime k-tuples

Abstract

Let τ denote the divisor function and H=\h1,...,hk\ be an admissible set. We prove that there are infinitely many n for which the product Πi=1k(n+hi) is square-free and Σi=1kτ(n+hi)≤ k, where k is asymptotic to 21262853 k2. It improves a previous result of M. Ram Murty and A. Vatwani, replacing 2126/2853 by 3/4. The main ingredients in our proof are the higher rank Selberg sieve and Irving-Wu-Xi estimate for the divisor function in arithmetic progressions to smooth moduli.