New results similar to Lagrange's four-square theorem

Abstract

In this paper we establish some new results similar to Lagrange's four-square theorem. For example, we prove that any integer n>1 can be written as w(5w+1)/2+x(5x+1)/2+y(5y+1)/2+z(5z+1)/2 with w,x,y,z∈ Z. Let a and b be integers with a>0, b>-a and (a,b)=1. When 2 ab, we show that any sufficiently large integer can be written as w(aw+b)2+x(ax+b)2+y(ay+b)2+z(az+b)2 with w,x,y,z nonnegative integers. When 2 a and 2 b, we prove that any sufficiently large integer can be written as w(aw+b)+x(ax+b)+y(ay+b)+z(az+b) with w,x,y,z nonnegative integers.

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