Marco Cappiello

Microlocal analysis of quasianalytic Gelfand-Shilov type ultradistributions

We introduce a global wave front set suitable for the analysis of tempered ultradistributions of quasi-analytic Gelfand–Shilov type. We study the transformation properties of the wave front set and use them to give microlocal existence results for pullbacks and products. We further study quasi-analytic microlocality for classes of localization and ultradifferential operators, and prove microellipticity for differential operators with polynomial coefficients.

Sub-exponential decay and uniform holomorphic extensions for semilinear pseudodifferential equations

The goal of the present paper is to derive a simultaneous description of the decay and the regularity properties for elliptic equations in ℝ n with coefficients admitting irregular decay at infinity of the type O(|x|−σ), σ > 0, filling the gap between the case of Cordes globally elliptic operators and the case of regular/Fuchs behavior at infinity. Representative examples in ℝ n are the equations where 0 < σ <2, ⟨x⟩ = (1 + |x|2)1/2, ω(x) a bounded smooth function, f given and F[u] a polynomial in u, and similar Schrödinger equations at the endpoint of the spectrum. Other relevant examples are given by linear and nonlinear ordinary differential equations with irregular type of singularity for x → ∞, admitting solutions y(x) with holomorphic extension in a strip and sub-exponential decay of type |y(x)| ≤Ce −ϵ|x| r ; 0 < r < 1. Sobolev estimates for the linear case are proved in the frame of a suitable pseudodifferential calculus; decay and uniform holomorphic extensions are then obtained in terms of Gelfand–Shilov spaces by an inductive technique. The same technique allows to extend the results to the semilinear case.

Decay estimates for solutions of nonlocal semilinear equations

We investigate the decay for

On the Inverse to the Harmonic Oscillator

|x|\rightarrow \infty

Radial symmetric elements and the Bargmann transform

of weak Sobolev type solutions of semilinear nonlocal equations

The Cauchy problem for finitely degenerate hyperbolic equations with polynomial coefficients

Pu=F(u)

Conormal distributions in the Shubin calculus of pseudodifferential operators

. We consider the case when

Pointwise decay and smoothness for semilinear elliptic equations and travelling waves

P=p(D)

SOME REMARKS ON THE RADIUS OF SPATIAL ANALYTICITY FOR THE EULER EQUATIONS

is an elliptic Fourier multiplier with polyhomogeneous symbol

Exponential estimates and holomorphic extensions for semilinear elliptic pseudodifferential equations

p(\xi)