On the Existence of Integers with at Most 3 Prime Factors Between Every Pair of Consecutive Squares

Abstract

We prove an explicit analogue of Legendre's conjecture for almost primes. Namely, for every integer n ≥ 1, the interval (n2,(n+1)2) contains an integer having at most 3 prime factors, counted with multiplicity. This improves the previous best result of Dudek and Johnston, who showed that every such interval contains an integer with at most 4 prime factors. The proof is divided into two ranges. For n2 ≤ 1031, we use prior computational results on primes in short intervals between consecutive squares, together with explicit bounds on maximal prime gaps. For n2 > 1031, we give a sieve-theoretic argument with explicit constants, adapting Richert's logarithmic weights to intervals between consecutive squares and employing an explicit linear sieve of Bordignon, Johnston, and Starichkova.