In this paper we give examples of polynomial phase functions for which the factorization condition of Seeger, Sogge and Stein (Ann. Math. 134 (1991)) fails. The corresponding Fourier integral operators turn out to be still continuous in L-p. We also give examples of the failure of the factorization condition for translation invariant operators. In this setting the frequency space must be at least 5-dimensional, which shows that the examples are optimal. We briefly discuss the stationary phase method for the corresponding operators.In this paper we give examples of polynomial phase functions for which the factorization condition of Seeger, Sogge and Stein (Ann. Math. 134 (1991)) fails. The corresponding Fourier integral operators turn out to...
AbstractThis paper extends the methods of special factorization to treat a class of factorization pr...
It is proved that there does not exist any non zero function in with if its Fourier transform is sup...
An effective means to approximate an analytic, nonperiodic function on a bounded interval is by usin...
In this paper we give examples of polynomial phase functions for which the factorization condition o...
We will show that the factorization condition for the Fourier integral operators I-rho(mu)(X, Y; Lam...
Abstract We will show that the factorization condition for the Fourier integral operators I X Y ...
We will show that the factorization condition for the Fourier integral operators I X Y leads to a...
We consider regularity properties of Fourier integral operators in various function spaces. The most...
In this note we give sufficient conditions for the L-p boundedness of periodic Fourier integral oper...
Note:The main result of this thesis is a necessary and sufficient condition for an operator polynomi...
Abstract. We examine the local and semi-global solvability of partial dif-ferential operators which ...
Let {P n(x)} n=0∞ be a sequence of polynomials of degree n. We define two sequences of differential ...
We study the action of Fourier Integral Operators (FIOs) of H¨ormander’s type on FL^p(R^d)_comp, 1 ≤...
Functions that are smooth but non-periodic on a certain interval have only slowly converging Fourier...
We study the boundedness of bilinear Fourier integral operators on products of Lebesgue spaces. Thes...
AbstractThis paper extends the methods of special factorization to treat a class of factorization pr...
It is proved that there does not exist any non zero function in with if its Fourier transform is sup...
An effective means to approximate an analytic, nonperiodic function on a bounded interval is by usin...
In this paper we give examples of polynomial phase functions for which the factorization condition o...
We will show that the factorization condition for the Fourier integral operators I-rho(mu)(X, Y; Lam...
Abstract We will show that the factorization condition for the Fourier integral operators I X Y ...
We will show that the factorization condition for the Fourier integral operators I X Y leads to a...
We consider regularity properties of Fourier integral operators in various function spaces. The most...
In this note we give sufficient conditions for the L-p boundedness of periodic Fourier integral oper...
Note:The main result of this thesis is a necessary and sufficient condition for an operator polynomi...
Abstract. We examine the local and semi-global solvability of partial dif-ferential operators which ...
Let {P n(x)} n=0∞ be a sequence of polynomials of degree n. We define two sequences of differential ...
We study the action of Fourier Integral Operators (FIOs) of H¨ormander’s type on FL^p(R^d)_comp, 1 ≤...
Functions that are smooth but non-periodic on a certain interval have only slowly converging Fourier...
We study the boundedness of bilinear Fourier integral operators on products of Lebesgue spaces. Thes...
AbstractThis paper extends the methods of special factorization to treat a class of factorization pr...
It is proved that there does not exist any non zero function in with if its Fourier transform is sup...
An effective means to approximate an analytic, nonperiodic function on a bounded interval is by usin...