The Hodge Laplacian operator on 1-forms on H and 1-form Ea1

Abstract

As is well known, we can average the eigenfunction ys of the hyperbolic Laplacian on the hyperbolic plane by a lattice in SL(2,R) to obtain an automorphic form, the non-holomorphic Eisenstein series Ea (z,s). In this note, we choose a particular eigenfunction ys dx of the Hodge-Laplace operator for 1-forms on the hyperbolic plane. Then, we average by to define a 1-form Ea1 ( (z,v), s ). We see that Ea1 admits a Fourier expansion and calculates the corresponding coefficients. Also, we evaluate the integral ∫γ Ea1 for when γ is a lifting of horocycles and closed geodesics in the unit tangent bundle. Finally, we will obtain an analog to the Rankin-Selberg method for Ea1.