Eisenstein classes and generating series of modular symbols in SLN

Abstract

We define a theta lift between the homology in degree N-1 of a locally symmetric space associated to SLN(R) and the space of modular forms of weight N, similar to the Kudla-Millson lift in the orthogonal setting. We show that the Fourier coefficients of this lift are Poincar\'e duals of modular symbols associated to maximal parabolic subgroups. The constant term is a canonical cohomology classes obtained by transgressing the Euler class of a torus bundle. When N=2, we show that the lift surjects on the space of weight 2 modular forms spanned by an Eisenstein series and the eigenforms with non-vanishing L-function.

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