Representations of squares by certain diagonal quadratic forms in odd number of variables

Abstract

In this paper, we consider the following diagonal quadratic forms equation* a1x12 + a2x22 + ·s + ax2, equation* where 5 is an odd integer and ai 1 are integers. By using the extended Shimura correspondence, we obtain explicit formulas for the number of representations of |D|n2 by the above type of quadratic forms, where D is either a square-free integer or a fundamental discriminant such that (-1)(-1)/2D > 0. We demonstrate our method with many examples, in particular, we obtain all the formulas (when =5) obtained in the work of Cooper-Lam-Ye (Acta. Arith. 2013) and all the representation formulas for n2 obtained by them in (Integers, 2013) when n is even. The works of Cooper et. al make use of certain theta function identities combined with a method of Hurwitz to derive these formulas. It is to be noted that our method works in general with arbitrary coefficients ai. As a consequence to some of our formulas, we obtain certain identities among the representation numbers and also some congruences involving Fourier coefficients of certain newforms of weights 6, 8 and the divisor functions.

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