High frequency behavior of the Leray transform: model hypersurfaces and projective duality

Abstract

The Leray transform L is studied on a family Mγ of unbounded hypersurfaces in two complex dimensions. For a large class of measures, we obtain necessary and sufficient conditions for the L2-boundedness of L, along with an exact spectral description of L*L. This yields both the norm and high-frequency norm of L, the latter giving an affirmative answer to an unbounded analogue of an open conjecture relating the essential norm of L to a projective invariant on a bounded hypersurface. L is also shown to play a central role in bridging the function theoretic and projective geometric notions of duality. Our work leads to the construction of projectively invariant Hardy spaces on the Mγ, along with the realization of their duals as invariant Hardy spaces on the dual hypersurfaces.