Metaplectic tensor products for automorphic representations of GL(r)

Abstract

Let M=GLr1×·s× GLrk⊂eq GLr be a Levi subgroup of GLr, where r=r1+·s+rk, and M its metaplectic preimage in the metaplectic cover GLr of GLr. For automorphic representations π1,…,πk of GLr1(),…,GLrk(), we construct an automorphic representation π of M() which can be considered as the "tensor product" of the representations π1,…,πk. This is the global analogue of the metaplectic tensor product defined by P. Mezo in the sense that locally at each place v, πv is equivalent to the local metaplectic tensor product of π1v,…,πkv defined by Mezo. Then we show that if all of πi are cuspidal (resp. square-integrable modulo center), then the metaplectic tensor product is cuspidal (resp. square-integrable modulo center). We also show that (both locally and globally) the metaplectic tensor product behaves in the expected way under the action of a Weyl group element, and show the compatibility with parabolic inductions.