Analog of theta-lifting for a curve over dual numbers over a finite field
Abstract
We continue the study of automorphic functions associated with a curve C over the ring k[ε]/(ε2), where k is a finite field, begun in arXiv:2303.16259. Namely, we study an example of theta-lifting in this framework and show that it can be understood in terms of the orbit decomposition of the space of automorphic functions S(SL2(F) SL2(AC)) introduced in loc.cit. We prove that all strongly cuspidal functions in S(SL2(F) SL2(AC)) can be constructed using theta-lifting for an appropriate double covering C C.
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