A note on Mellin transform, Eisenstein Series and distribution dεit on PSL(2,Z[i]) PSL(2,C)

Abstract

Let f a smooth function with compact support defined on PSL(2,Z[i]) PSL(2,C), we prove a formula for the Mellin transform of f, then we can define the micro-local lift dεit to SL(2,C). We calculate (f,dεit) for f a cuspidal form and for f an incomplete Eisenstein series. We also establish asymptotic estimates when t tends to ∞. We conjecture that a new positive distribution dεitF, constructed with the Friedrichs' symmetrization technique, satisfies the same asymptotic estimates that dεit. This would imply the quantum ergodicity for Eisenstein series on PSL(2,Z[i]) PSL(2,C)