SG-Lagrangian submanifolds and their parametrization

Abstract

We continue our study of tempered oscillatory integrals I(a), here investigating the link with a suitable symplectic structure at infinity, which we describe in detail. We prove adapted versions of the classical theorems, which show that tempered distributions of the type I(a) are indeed linked to suitable Lagrangians extending to infinity, that is, extending up to the boundary and in particular the corners of a compactification of T*Rd to Bd×Bd. In particular, we show that such Lagrangians can always be parametrized by non-homogeneous, regular phase functions, globally defined on some Rd×Rs. We also state how two such phase functions parametrizing the same Lagrangian may be considered equivalent up to infinity.