Results 1 to 10 of about 3,097 (85)

Representing measures and infinite-dimensional holomorphy

Journal of Mathematical Analysis and Applications, 2007
The authors consider some applications of the Bishop--De Leeuw theorem about representing measures to the situation of certain algebras of analytic functions on unit balls of Banach spaces. In particular, the Hardy spaces \(H^2(\mu)\) are studied.
Lopushansky, Oleh, Zagorodnyuk, Andriy
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SPECTRAL THEORY, TENSOR PRODUCTS AND INFINITE DIMENSIONAL HOLOMORPHY [PDF]

Journal of the Korean Mathematical Society, 2004
This paper is an expository self-contained article on results concerning the construction of a vector-valued holomorphic functional calculus recently obtained by the author and by \textit{R. E. Harte} and \textit{C. Taylor} as coauthors in a series of three papers [Math. Proc. R. Ir. Acad. 101A, No. 2, 177--196 (2001; Zbl 1028.46076), ibid.
Sean Dineen
openaire   +3 more sources

Strongly mixing convolution operators on Fr\'echet spaces of holomorphic functions [PDF]

, 2014
A theorem of Godefroy and Shapiro states that non-trivial convolution operators on the space of entire functions on $\mathbb{C}^n$ are hypercyclic. Moreover, it was shown by Bonilla and Grosse-Erdmann that they have frequently hypercyclic functions of ...
Muro, Santiago, Pinasco, Damián, Savransky, Martín   +2 more
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Applications of Ultraproducts to Infinite Dimensional Holomorphy.

MATHEMATICA SCANDINAVICA, 1992
The purpose of this paper is to apply ultraproduct techniques to some problems in infinite dimensional holomorphy. The central problem we consider is the following: Given a continuous polynomial \(P\), or more generally, a holomorphic function, \(f\), defined on a Banach space \(X\), can we extend \(P\) or \(f\) to a larger space containing \(X ...
Lindström, Mikael, Ryan, R.A.
openaire   +3 more sources

Real and discrete holomorphy : Introduction to an algebraic approach [PDF]

, 2007
We consider spaces for which there is a notion of harmonicity for complex valued functions defined on them. For instance, this is the case of Riemannian manifolds on one hand, and (metric) graphs on the other hand.
Barré, Sylvain, Zeghib, Abdelghani
core   +7 more sources

Solving matrix models using holomorphy [PDF]

, 2003
We investigate the relationship between supersymmetric gauge theories with moduli spaces and matrix models. Particular attention is given to situations where the moduli space gets quantum corrected. These corrections are controlled by holomorphy.
D. Berenstein, D. Berenstein, D. Berenstein, D. Berenstein, David Berenstein, F. Cachazo, F. Cachazo, F. Cachazo, F. Cachazo, F. Cachazo, F. Cachazo, F. Ferrari, F. Ferrari, H. Fuji, H. Itoyama, I.K. Kostov, I.R. Klebanov, J. Polchinski, M.R. Douglas, M.R. Douglas, N. Dorey, N. Dorey, N. Dorey, N. Dorey, N. Seiberg, N. Seiberg, N. Seiberg, O. Aharony, P. Ginsparg, R. Dijkgraaf, R. Dijkgraaf, R. Dijkgraaf, R. Dijkgraaf, R. Dijkgraaf, R. Dijkgraaf, R. Gopakumar, R. Gopakumar, R.G. Leigh, S. Gukov, T. Mansson, T.J. Hollowood, V.A. Kazakov   +41 more
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Sparse Deterministic Approximation of Bayesian Inverse Problems [PDF]

, 2011
We present a parametric deterministic formulation of Bayesian inverse problems with input parameter from infinite dimensional, separable Banach spaces. In this formulation, the forward problems are parametric, deterministic elliptic partial differential ...
A M Stuart, Andreev R, C Schwab, Chkifa A Cohen A DeVore R Schwab C, Cohen A, Gittelson C J, Hoang V Ha, Hoermander L, Kaipio J, Liu J, Robert C P, Roberts G O, Spanos P D   +12 more
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Supersymmetric QCD: Exact Results and Strong Coupling [PDF]

, 2011
We revisit two longstanding puzzles in supersymmetric gauge theories. The first concerns the question of the holomorphy of the coupling, and related to this the possible definition of an exact (NSVZ) beta function.
A Kovner, A Parkes, A Ritz, AA Johansen, AB Pimenov, AI Vainshtein, Chang-Soon Park, D Amati, D Amati, D Diakonov, D Finnell, DB Creamer, DRT Jones, EJ Weinberg, Guido Festuccia, J Fuchs, J Wess, K-M Lee, Lawrence Pack, Lorenzo Ubaldi, M Dine, M Dine, MA Shifman, MA Shifman, Michael Dine, N Arkani-Hamed, N Arkani-Hamed, N Dorey, N Dorey, NM Davies, TC Kraan, TJ Hollowood, VA Novikov, VA Novikov, VA Novikov, Weitao Wu   +35 more
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Infinite dimensional holomorphic non-extendability and algebraic genericity [PDF]

, 2017
In this note, the linear structure of the family He(G) of holomorphic functions in a domain G of a complex Banach space that are not holomorphically continuable beyond the boundary of G is analyzed.
Bernal González, Luis, Calderón Moreno, María del Carmen, Seoane Sepúlveda, Juan Benigno   +2 more
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Lie group structures on groups of smooth and holomorphic maps on non-compact manifolds [PDF]

, 2007
We study Lie group structures on groups of the form C^\infty(M,K)}, where M is a non-compact smooth manifold and K is a, possibly infinite-dimensional, Lie group. First we prove that there is at most one Lie group structure with Lie algebra C^\infty(M,k)
Chr. Wockel, E.J. Beggs, Friedrich Wagemann, G. Hochschild, H. Glockner, H. Glockner, H. Glockner, H. Glockner, H. Grauert, I. Raeburn, J. Milnor, J. Milnor, Karl-Hermann Neeb, L. Fuchs, M. Schlichenmaier, P. Michor, P.A. Smith, P.W. Michor, R. Hamilton, R. Palais, S.J. Sidney   +20 more
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