Representations of positive integers by three almost-prime squares

Abstract

Let Pr denote an integer with at most r prime factors, counted with multiplicity. It is known that every sufficiently large integer N satisfying N 3 24 and 5 N, can be written in the form N= x12+x22+x32 where x1,x2,x3 are integers. In this paper, we prove that the above representation in the following two different forms (i) x1x2x3 is a P67-number; (ii) each xi is a P27-number. This result improves on the previous result of WaibelWa, in which P72 was obtained in place of P67. The proofs combine the higher-dimensional sieve, a Richert-type weighted sieve method introduced by Cai Cai with a Bombieri-Vinogradov type result given by WaibelWa. Applying the same method in a one dimensional sieve setting, we also show that every sufficiently large N not of the form 4k(8l+7) can be written in the form \[ N = x2 + y2 + (2a z)2, \] where x,y,a,z are non-negative integers and z is a P18-number. This improves upon a result of Banerjee Ban who obtained P118 in place of P18.