Sums of four rational squares with certain restrictions

Abstract

In this paper we mainly study sums of four rational squares with certain restrictions. Let Q0 be the set of nonnegative rational numbers. We establish the following four-square theorem for rational numbers: For any a,b,c,d∈ Q0, each r∈ Q0 can be written as x2+y2+z2+w2 with x,y,z,w∈ Q0 such that ax+by+cz+dw is a rational square (or a rational cube). This paper also contains many conjectures; for example, for any positive integers a and b with (a,b)=1, we conjecture that each r∈ Q0 can be written as aw4+bx4+y2+z2 with w,x,y,z∈ Q.