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Sequences of differential operators: exponentials, hypercyclicity and equicontinuity

L. Bernal-González, J. A. Prado-Tendero (2001)

Annales Polonici Mathematici

An eigenvalue criterion for hypercyclicity due to the first author is improved. As a consequence, some new sufficient conditions for a sequence of infinite order linear differential operators to be hypercyclic on the space of holomorphic functions on certain domains of $ℂ^{N}$ are shown. Moreover, several necessary conditions are furnished. The equicontinuity of a family of operators as above is also studied, and it is characterized if the domain is $ℂ^{N}$ . The results obtained extend or improve earlier work...

Sobre la estabilización robusta para ciertos tipos de sistemas lineales.

J. M. Amillo, F. A. Mata (1989)

Collectanea Mathematica

In this paper we consider the problem of robust stabilization of systems with complex pole variations. We show that techniques from the complex function field can also be used to treat these cases. In particular the problem is reduced to one of interpolation theory on the disk.

Solving Complex Approximation Problems by Semiinfmite - Finite Optimization Techniques : A Study on Convergence.

G. Opfer (1982)

Numerische Mathematik

Some applications of the theorem on rational approximation in the mean

M. Skwarczyński (1976)

Annales Polonici Mathematici

Some properties of weighted hyperbolic polynomials.

Inoue, Tetsuo (1996)

International Journal of Mathematics and Mathematical Sciences

Some remarks on the space $R^{2} (E)$ .

Fernstroem, Claes (1983)

International Journal of Mathematics and Mathematical Sciences

Spectral approximation for Segal-Bargmann space Toeplitz operators

Albrecht Böttcher, Hartmut Wolf (1997)

Banach Center Publications

Let A stand for a Toeplitz operator with a continuous symbol on the Bergman space of the polydisk $^{N}$ or on the Segal-Bargmann space over $ℂ^{N}$ . Even in the case N = 1, the spectrum Λ(A) of A is available only in a few very special situations. One approach to gaining information about this spectrum is based on replacing A by a large “finite section”, that is, by the compression $A_{n}$ of A to the linear span of the monomials $z_{1}^{k_{1}} . . . z_{N}^{k_{N}} : 0 \leq k_{j} \leq n$ . Unfortunately, in general the spectrum of $A_{n}$ does not mimic the spectrum of A as...

Stochastic continuity and approximation

Leon Brown, Bertram Schreiber (1996)

Studia Mathematica

This work is concerned with the study of stochastic processes which are continuous in probability, over various parameter spaces, from the point of view of approximation and extension. A stochastic version of the classical theorem of Mergelyan on polynomial approximation is shown to be valid for subsets of the plane whose boundaries are sets of rational approximation. In a similar vein, one can obtain a version in the context of continuity in probability of the theorem of Arakelyan on the uniform...

Sur la réduction en fractions continues d'une fonction qui satisfait à une équation linéaire du premier ordre à coefficients rationnels

Laguerre (1880)

Bulletin de la Société Mathématique de France

Sur les Solutions extrémales d'un système incompatible d'équations

L MARUSCIAC (1973)

Aequationes mathematicae

Sur un problème de W. Rudin concernant les fonctions holomorphes et borneés

Eric Amar (1982)

Studia Mathematica

Symmetric inverse $α$ -areolar differences and $α$ -interpolation. (Symmetrische inverse $α$ -areoläre Differenzen und $α$ - Interpolation.)

Čanak, Miloš (1991)

Publications de l'Institut Mathématique. Nouvelle Série

Currently displaying 1 – 18 of 18