Quadratic forms, K-groups and L-values of elliptic curves
Abstract
Let f be a positive definite integral quadratic form in d variables. In the present paper, we establish a direct link between the genus representation number of f and the order of higher even K-groups of the ring of integers of real quadratic fields, provided f is diagonal and d 1 4, by applying the Siegel mass formula. When d=3, we derive an explicit formula of rf(n) in terms of the class number of the corresponding imaginary quadratic field and the central algebraic values of L-functions of quadratic twists of elliptic curves, by exploring a theorem of Waldspurger. Moreover, by the 2-divisibility results on the algebraic L-values of quadratic twist of elliptic curves, we obtain a lower bound for the 2-adic valuation of rf(n) for some odd integer n. The numerical results show our lower bound is optimal for certain cases. We also apply our main result to the quadratic form f=x12+·s+x2d to determine the order of the higher K-groups numerically.
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