On special values of standard L-functions of Siegel cusp eigenforms of genus 3

Abstract

We explicitly compute the special values of the standard L-function L(s, F12, St) at the critical points s∈\-8, -6, -4, -2, 0, 1, 3, 5, 7, 9\, where F12 is the unique (up to a scalar) Siegel cusp form of degree 3 and weight 12, which was constructed by Miyawaki. These values are proportional to the product of the Petersson norms of symmetric square of Ramanujan's and the cusp form of weight 20 for SL2(Z) by a rational number and some power of π. We use the Rankin-Selberg method and apply the Holomorphic projection to compute these values. To our knowledge this is the first example of a standard L-function of Siegel cusp form of degree 3, when the special values can be computed explicitly.