The global wave front set of tempered oscillatory integrals with inhomogeneous phase functions

Abstract

We study certain families of oscillatory integrals I(a), parametrised by phase functions and amplitude functions a globally defined on Rd, which give rise to tempered distributions, avoiding the standard homogeneity requirement on the phase function. The singularities of I(a) are described both from the point of view of the lack of smoothness as well as with respect to the decay at infinity. In particular, the latter will depend on a version of the set of stationary points of , including elements lying at the boundary of the radial compactification of Rd. As applications, we consider some properties of the two-point function of a free, massive, scalar relativistic field and of classes of global Fourier integral operators on Rd, with the latter defined in terms of kernels of the form I(a).