Feynman integrals and critical modular L-values
Abstract
Broadhurst conjectured that the Feynman integral associated to the polynomial corresponding to t=1 in the one-parameter family (1+x1+x2+x3)(1+x1-1+x2-1+x3-1)-t is expressible in terms of L(f,2), where f is a cusp form of weight 3 and level 15. Bloch, Kerr and Vanhove have recently proved that the conjecture holds up to a rational factor. In this paper, we prove that Broadhurst's conjecture is true. Similar identities involving Feynman integrals associated to other polynomials in the same family are also established.
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