The generalized linear period

Abstract

Let F be a non-archimedean local field of characteristic zero. We study the linear period problem for the pair (G,Hp,p+1)=(GL2p+1(F), GLp(F)× GLp+1(F)) and we prove that any bi-(Hp,p+1,μ)-invariant generalized function on G is invariant under the matrix transpose when μ is a good character. We also show that any P Hp,p+1-invariant linear functional on an Hp,p+1-distinguished irreducible smooth representation of G is also Hp,p+1-invariant when F is nonarchimedean, where P is a standard mirabolic subgroup of G with last row vector (0,·s,0,1).