The Strichartz conjecture for the Poisson transform on homogeneous line bundles over Noncompact Complex Grassmann manifolds

Abstract

Let \(X=G/K\) be a noncompact complex Grassmann manifold of rank \(r\). Let \(τl\) be a character of \(K\), \(G×P\) and \(G×K\) the homogeneous line bundles associated with the representations \(σλ,l=τl a-iλ 1\) of \(P=MAN\) and \(τl\) of \(K\). We give an image characterization for the Poisson transform \(Pλ,l\) of \\\(L2\)-sections of the unitary principal series representations of \(G\) parametrized by \(σλ,l\). More precisely for real and regular parameter \(λ\) in \(a\) we prove that \(Pλ,l\) is an isomorphism from \(L2(K×M)\) onto the space of joint eigensections \(F\) of the algebra of \(G\)-invariant differential operators on \(G×K\) that satisfy the following growth condition eqnarray* R>11Rr∫B(R) F(g)2\, dg<∞. eqnarray* This generalizes a conjecture by Strichartz which corresponds to \(τl\) trivial.