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Paley-Wiener theorems for the Mellin transformation

Zofia Szmydt — 1990

Annales Polonici Mathematici

Characterization of regular tempered distributions

Zofia Szmydt — 1983

Annales Polonici Mathematici

On homogeneous rotation invariant distributions and the Laplace operator

Zofia Szmydt — 1979

Annales Polonici Mathematici

Topological imbedding of Laplace distributions in Laplace hyperfunctions

Zofia Szmydt; Bogdan Ziemian — 1998

CONTENTS Foreword..............................................................................................................................5 Introduction..........................................................................................................................6 1. Preliminaries....................................................................................................................7 1.1. Terminology and notation.............................................................................................7...

An invariance method for constructing fundamental solutions for $P (□_{m} n)$

Zofia Szmydt; Bogdan Ziemian — 1985

Annales Polonici Mathematici

Fundamental solution $E_{n}$ of the operator $\partial^{2} / \partial t^{2} - Δ_{n}$ for n>3

Zofia Szmydt; Bogdan Ziemian — 1979

Annales Polonici Mathematici

Fundamental solution for operators preserving a quadratic form

Zofia Szmydt; Bogdan Ziemian — 1983

Annales Polonici Mathematici

Between the Paley-Wiener theorem and the Bochner tube theorem

Zofia Szmydt; Bogdan Ziemian — 1995

Annales Polonici Mathematici

We present the classical Paley-Wiener-Schwartz theorem [1] on the Laplace transform of a compactly supported distribution in a new framework which arises naturally in the study of the Mellin transformation. In particular, sufficient conditions for a function to be the Mellin (Laplace) transform of a compactly supported distribution are given in the form resembling the Bochner tube theorem [2].

Characterization of Mellin distributions supported by certain noncompact sets

Zofia Szmydt; Bogdan Ziemian — 1992

Studia Mathematica

A class of distributions supported by certain noncompact regular sets K are identified with continuous linear functionals on $C_{0}^{\infty} (K)$ . The proof is based on a parameter version of the Seeley extension theorem.

Bogdan Ziemian (1953-1997)

Bogdan Bojarski; Stanisław Łojasiewicz; Grzegorz Łysik; Zofia Szmydt — 2000

Annales Polonici Mathematici

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Currently displaying 1 – 10 of 10

Paley-Wiener theorems for the Mellin transformation

Characterization of regular tempered distributions

On homogeneous rotation invariant distributions and the Laplace operator

Topological imbedding of Laplace distributions in Laplace hyperfunctions

An invariance method for constructing fundamental solutions for $P (□_{m} n)$

Fundamental solution $E_{n}$ of the operator $\partial^{2} / \partial t^{2} - Δ_{n}$ for n>3

Fundamental solution for operators preserving a quadratic form

Between the Paley-Wiener theorem and the Bochner tube theorem

Characterization of Mellin distributions supported by certain noncompact sets

Bogdan Ziemian (1953-1997)