A multidimensional version of the well-known van der Corput lemma is presented. A class of phase functions is described for which the corresponding oscillatory integrals satisfy a multidimensional decay estimate. The obtained estimates are uniform with respect to parameters on which the phases and amplitudes may depend
ABSTRACT. In this paper, we study decay estimates for a two-di-mensional scalar oscillatory integral...
In this thesis, we study the following multilinear oscillatory integral introduced by Christ, Li, Ta...
Abstract. What follows is a study of the asymptotic behavior of oscillatory integrals of the form Iξ...
A multidimensional version of the well-known van der Corput lemma is presented. A class of phase fun...
We establish a multidimensional decay of oscillatory integrals with degenerate stationary points, ga...
In this thesis, we study the following multilinear oscillatory integral introduced by Christ, Li, Ta...
AbstractWe give a non-archimedean analogue of the van der Corput Lemma on oscillating integrals, whe...
International audienceIn 1935 J.G. van der Corput introduced a sequence which has excellent uniform ...
AbstractThis paper is devoted to the study of time-dependent hyperbolic systems and the derivation o...
In this paper, we consider uniform estimates for oscillatory integrals with some phase f...
We develop an asymptotic expansion for oscillatory integrals with real analytic phases. We assume th...
We develop an asymptotic expansion for oscillatory integrals with real analytic phases. We assume th...
The exact solution of the Lindblad equation with a quadratic Hamiltonian and linear coupling operato...
This paper focuses on Kalman–Yakubovich–Popov lemma for multidimensional systems described by Roesse...
In this paper we give precise asymptotic expansions and estimates of the remainder R(λ) for oscillat...
ABSTRACT. In this paper, we study decay estimates for a two-di-mensional scalar oscillatory integral...
In this thesis, we study the following multilinear oscillatory integral introduced by Christ, Li, Ta...
Abstract. What follows is a study of the asymptotic behavior of oscillatory integrals of the form Iξ...
A multidimensional version of the well-known van der Corput lemma is presented. A class of phase fun...
We establish a multidimensional decay of oscillatory integrals with degenerate stationary points, ga...
In this thesis, we study the following multilinear oscillatory integral introduced by Christ, Li, Ta...
AbstractWe give a non-archimedean analogue of the van der Corput Lemma on oscillating integrals, whe...
International audienceIn 1935 J.G. van der Corput introduced a sequence which has excellent uniform ...
AbstractThis paper is devoted to the study of time-dependent hyperbolic systems and the derivation o...
In this paper, we consider uniform estimates for oscillatory integrals with some phase f...
We develop an asymptotic expansion for oscillatory integrals with real analytic phases. We assume th...
We develop an asymptotic expansion for oscillatory integrals with real analytic phases. We assume th...
The exact solution of the Lindblad equation with a quadratic Hamiltonian and linear coupling operato...
This paper focuses on Kalman–Yakubovich–Popov lemma for multidimensional systems described by Roesse...
In this paper we give precise asymptotic expansions and estimates of the remainder R(λ) for oscillat...
ABSTRACT. In this paper, we study decay estimates for a two-di-mensional scalar oscillatory integral...
In this thesis, we study the following multilinear oscillatory integral introduced by Christ, Li, Ta...
Abstract. What follows is a study of the asymptotic behavior of oscillatory integrals of the form Iξ...
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