Restricted sums of four squares

Abstract

We refine Lagrange's four-square theorem in new ways by imposing some restrictions involving powers of two (including 1). For example, we show that each n=1,2,3,… can be written as x2+y2+z2+w2 (x,y,z,w∈ N=\0,1,2,…\) with |x+y-z|∈\4k:\ k∈ N\ (or |2x-y|∈\4k:\ k∈ N\, or x+y-z∈\ 8k:\ k∈ N\\0\⊂eq\t3:\ t∈ Z\), and that we can write any positive integer as x2+y2+z2+w2 (x,y,z,w∈ Z) with x+y+2z (or x+2y+2z) a power of four. We also prove that any n∈ N can be written as x2+y2+z2+2w2 (x,y,z,w∈ Z) with x+y+z+w a square (or a cube). In addition, we pose some open conjectures for further research; for example, we conjecture that any integer n>1 can be written as a2+b2+3c+5d with a,b,c,d∈ N.