Exceptional theta correspondence F4×PGL2 for level one automorphic representations

Abstract

Let F4 be the unique (up to isomorphism) connected semisimple algebraic group over Q of type F4, with compact real points and split over Qp for all primes p. A conjectural computation by the author in arxiv:2407.05859 predicts the existence of a family of level one automorphic representations of F4, which are expected to be functorial lifts of cuspidal representations of PGL2 associated with Hecke eigenforms. In this paper, we study the exceptional theta correspondence for F4×PGL2, and establish the existence of such a family of automorphic representations for F4. Motivated by the work of Pollack, our main tool is a notion of "exceptional theta series" on PGL2, arising from certain automorphic representations of F4. These theta series are holomorphic modular forms on SL2(Z), with explicit Fourier expansions, and span the entire space of level one cusp forms.