Relating elliptic curve point-counting and solutions of quadratic forms with congruence conditions
Abstract
In this paper, we analyze the theta series associated to the quadratic form Q(x) := x12 + x22 + x32 + x42 with congruence conditions on xi modulo 2, 3, 4, and 6. By employing special operators on modular, non-holomorphic Eisenstein series of weight 2, we construct a basis for the Eisenstein space for levels 2k (with k 7), 3 (with 3), and p, where p>3 is an odd prime. Using the relation between the trace of Frobenius on an elliptic curve and the Fourier coefficients of the cusp-form part of the theta series corresponding to Q, we establish a relation between the number of integer solutions to the equation Q(x) = p and the number of Fp-rational points on the associated elliptic curve under certain congruence conditions on p.
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