AbstractWe give a non-archimedean analogue of the van der Corput Lemma on oscillating integrals, where the condition of sufficient smoothness for the phase in the real case is replaced by the condition that the phase is a convergent power series. This result allows us, in analogy to the real situation, to study singular Fourier transforms on suitably curved (p-adic analytic) manifolds. As an application we give a restriction theorem for Fourier transforms of Lq functions to suitably curved analytic manifolds over non-archimedean local fields, similar to a real restriction result by E.M. Stein. Several analogues of the van der Corput Lemma were already known when the phase is a polynomial
A multidimensional version of the well-known van der Corput lemma is presented. A class of phase fun...
An abstract theory of Fourier series in locally convex topological vector spaces is developed. An an...
The purpose of this note is to showcase a certain line of research that connects harmonic analysis, ...
AbstractWe give a non-archimedean analogue of the van der Corput Lemma on oscillating integrals, whe...
We prove sharp endpoint results for the Fourier restriction operator associated to nondegenerate cur...
Oscillatory integrals appear naturally in a variety of problems related to harmonic analysis, and ha...
We say that a restriction theorem holds for a curve (gamma) (t) in (//R)('n) if for all f(epsilon) (...
We develop an asymptotic expansion for oscillatory integrals with real analytic phases. We assume th...
Fourier restriction theorems, whose study had been initiated by E. M. Stein, usually describe a fami...
Streamlined proof avoiding to use the existence of smooth transfer and local relative trace formulas...
We develop an asymptotic expansion for oscillatory integrals with real analytic phases. We assume th...
Submitted to Applied and Computational Harmonic AnalysisIn this paper we extend analytic signal to t...
Abstract. E. M. Stein’s restriction problem for Fourier transforms is a deep and only partially solv...
AbstractFor a small disk D centered at the origin in R2, a smooth real-valued function S(x,y) on D, ...
This thesis is concerned with the restriction theory of the Fourier transform. We prove two restrict...
A multidimensional version of the well-known van der Corput lemma is presented. A class of phase fun...
An abstract theory of Fourier series in locally convex topological vector spaces is developed. An an...
The purpose of this note is to showcase a certain line of research that connects harmonic analysis, ...
AbstractWe give a non-archimedean analogue of the van der Corput Lemma on oscillating integrals, whe...
We prove sharp endpoint results for the Fourier restriction operator associated to nondegenerate cur...
Oscillatory integrals appear naturally in a variety of problems related to harmonic analysis, and ha...
We say that a restriction theorem holds for a curve (gamma) (t) in (//R)('n) if for all f(epsilon) (...
We develop an asymptotic expansion for oscillatory integrals with real analytic phases. We assume th...
Fourier restriction theorems, whose study had been initiated by E. M. Stein, usually describe a fami...
Streamlined proof avoiding to use the existence of smooth transfer and local relative trace formulas...
We develop an asymptotic expansion for oscillatory integrals with real analytic phases. We assume th...
Submitted to Applied and Computational Harmonic AnalysisIn this paper we extend analytic signal to t...
Abstract. E. M. Stein’s restriction problem for Fourier transforms is a deep and only partially solv...
AbstractFor a small disk D centered at the origin in R2, a smooth real-valued function S(x,y) on D, ...
This thesis is concerned with the restriction theory of the Fourier transform. We prove two restrict...
A multidimensional version of the well-known van der Corput lemma is presented. A class of phase fun...
An abstract theory of Fourier series in locally convex topological vector spaces is developed. An an...
The purpose of this note is to showcase a certain line of research that connects harmonic analysis, ...