Your search keyword '"Pablo Sevilla-Peris"' showing total 58 results

1. Homomorphisms between Algebras of Holomorphic Functions

Author

Verónica Dimant, Domingo García, Manuel Maestre, and Pablo Sevilla-Peris

Subjects

Mathematics, QA1-939

Abstract

For two complex Banach spaces X and Y, in this paper, we study the generalized spectrum ℳb(X,Y) of all nonzero algebra homomorphisms from ℋb(X), the algebra of all bounded type entire functions on X, into ℋb(Y). We endow ℳb(X,Y) with a structure of Riemann domain over ℒ(X*,Y*) whenever X is symmetrically regular. The size of the fibers is also studied. Following the philosophy of (Aron et al., 1991), this is a step to study the set ℳb,∞(X,BY) of all nonzero algebra homomorphisms from ℋb(X) into ℋ∞(BY) of bounded holomorphic functions on the open unit ball of Y and ℳ∞(BX,BY) of all nonzero algebra homomorphisms from ℋ∞(BX) into ℋ∞(BY).

Published

2014

2. A Note on the Symmetry of Sequence Spaces

Author

Martín Mazzitelli, Pablo Sevilla-Peris, and Daniel Carando

Subjects

Mathematics - Functional Analysis, Sequence, Pure mathematics, Decreasing rearrangement, General Mathematics, FOS: Mathematics, Symmetric sequence space, Symmetry (geometry), MATEMATICA APLICADA, Marcinkiewicz sequence space, Symmetric linear functional, Functional Analysis (math.FA), Mathematics

Abstract

[EN] We give a self-contained treatment of symmetric Banach sequence spaces and some of their natural properties. We are particularly interested in the symmetry of the norm and the existence of symmetric linear functionals. Many of the presented results are known or commonly accepted, but are not found in the literature., D. Carando and M. Mazzitelli were supported by CONICET-PIP 11220130100329CO, ANPCyT PICT 2015-2299 and PICT 2018-4104. P. Sevilla-Peris was supported by MICINN and FEDER project MTM2017-83262-C2-1-P

Published

2021

3. Monomial convergence on ℓr

Author

Pablo Sevilla-Peris, Santiago Muro, Daniel Galicer, and Martín Mansilla

Subjects

Unit sphere, Numerical Analysis, Sequence, Monomial, Applied Mathematics, Entire function, Holomorphic function, Space (mathematics), Bounded type, Sequence space, Combinatorics, Banach sequence space, Bounded function, Monomial convergence, Homogeneous polynomial, MATEMATICA APLICADA, Analysis, Mathematics

Abstract

[EN] We develop a novel decomposition of the monomials in order to study the set of monomial convergence for spaces of holomorphic functions over l(r) for 1 < r, This work was partially supported by projects CONICET PIP 11220130100329CO, ANPCyT PICT 20152224, ANPCyT PICT 2015-2299, ANPCyT PICT 2015-3085, ANPCyT PICT 2018-04250, UBACyT 20020130100474BA, UBACyT 20020130300052BA, UBACyT 20020130300057BA. Mansilla was supported by a CONICET doctoral fellowship. Sevilla-Peris was supported by MINECO/FEDER Project MTM2017-83262-C2-1-P and grant PRX17/00040 of the Spanish Government.

Published

2021

4. Hausdorff–Young-type inequalities for vector-valued Dirichlet series

Author

Pablo Sevilla-Peris, Felipe Marceca, and Daniel Carando

Subjects

Mathematics::Functional Analysis, Pure mathematics, Inequality, Applied Mathematics, General Mathematics, media_common.quotation_subject, 010102 general mathematics, purl.org/becyt/ford/1.1 [https], Hausdorff space, HAUSDORFF-YOUNG INEQUALITIES, Type (model theory), 01 natural sciences, BANACH SPACES, purl.org/becyt/ford/1 [https], symbols.namesake, symbols, DIRICHLET SERIES, 0101 mathematics, MATEMATICA APLICADA, Dirichlet series, Mathematics, media_common

Abstract

[EN] We study Hausdorff-Young-type inequalities for vector-valued Dirichlet series which allow us to compare the norm of a Dirichlet series in the Hardy space H-p(X) with the q-norm of its coefficients. In order to obtain inequalities completely analogous to the scalar case, a Banach space must satisfy the restrictive notion of Fourier type/cotype. We show that variants of these inequalities hold for the much broader range of spaces enjoying type/cotype. We also consider Hausdorff-Young-type inequalities for functions defined on the infinite torus T-infinity or the boolean cube {- 1, 1}(infinity). As a fundamental tool we show that type and cotype are equivalent to a hypercontractive homogeneous polynomial type and cotype, a result of independent interest., The third author was supported by MICINN and FEDER Project MTM2017-83262-C2-1-P and MECD grant PRX17/00040.

Published

2020

5. Frechet spaces of general Dirichlet series

Author

Pablo Sevilla-Peris, Ingo Schoolmann, Andreas Defant, and Tomás Fernández Vidal

Subjects

Limit of a function, Lambda, 01 natural sciences, Dirichlet distribution, Combinatorics, symbols.namesake, Fréchet space, 0101 mathematics, General Dirichlet series, Fourier series, Dirichlet series, Mathematics, Almost periodic functions, Algebra and Number Theory, Hardy spaces, Applied Mathematics, 010102 general mathematics, Abscissas of convergence, 010101 applied mathematics, Computational Mathematics, Bounded function, symbols, Geometry and Topology, Frechet spaces, MATEMATICA APLICADA, Analysis

Abstract

[EN] Inspired by a recent article on Frechet spaces of ordinary Dirichlet series Sigma a(n)n(-s) due to J. Bonet, we study topological and geometrical properties of certain scales of Frechet spaces of general Dirichlet spaces Sigma a(n)e(-lambda ns) focus on the Frechet space of lambda-Dirichlet series Sigma a(n)e(-lambda ns) which have limit functions bounded on all half planes strictly smaller than the right half plane [Re > 0]. We develop an abstract setting of pre-Frechet spaces of lambda-Dirichlet series generated by certain admissible normed spaces of lambda-Dirichlet series and the abscissas of convergence they generate, which allows also to define Frechet spaces of lambda-Dirichlet series for which a(n)e(-lambda n/k) for each k equals the Fourier coefficients of a function on an appropriate lambda-Dirichlet group., Andreas Defant: Partially supported by MINECO and FEDER project MTM2017-83262-C2-1-P. Tomás Fernández Vidal: Supported by PICT 2015-2299. Pablo Sevilla-Peris:Supported by MINECO and FEDER project MTM2017-83262-C2-1-P

Published

2021

6. Composition operators on spaces of double Dirichlet series

Author

Domingo García, Frédéric Bayart, Manuel Maestre, Pablo Sevilla-Peris, Jaime Castillo-Medina, Laboratoire de Mathématiques Blaise Pascal (LMBP), and Université Clermont Auvergne [2017-2020] (UCA [2017-2020])-Centre National de la Recherche Scientifique (CNRS)

Subjects

General Mathematics, 010102 general mathematics, Holomorphic function, Characterization (mathematics), Composition (combinatorics), Space (mathematics), [MATH.MATH-FA]Mathematics [math]/Functional Analysis [math.FA], 01 natural sciences, Functional Analysis (math.FA), Mathematics - Functional Analysis, 010101 applied mathematics, Combinatorics, symbols.namesake, Superposition operator, Bounded function, FOS: Mathematics, symbols, Composition operator, 0101 mathematics, Algebra over a field, MATEMATICA APLICADA, Dirichlet series, ComputingMilieux_MISCELLANEOUS, Double Dirichlet series, Mathematics

Abstract

We study composition operators on spaces of double Dirichlet series, focusing our interest on the characterization of the composition operators of the space of bounded double Dirichlet series $${\mathcal {H}}^\infty ({\mathbb {C}}_+^2)$$ . We also show how the composition operators of this space of Dirichlet series are related to the composition operators of the corresponding spaces of holomorphic functions. Finally, we give a characterization of the superposition operators in $${\mathcal {H}}^\infty ({\mathbb {C}}_+)$$ and in the spaces $${\mathcal {H}}^p$$ .

Published

2021

7. Mean ergodic composition operators on spaces of holomorphic functions on a Banach space

Author

Pablo Sevilla-Peris, David Jornet, and Daniel Santacreu

Subjects

Unit sphere, Pure mathematics, Banach space, Holomorphic function, 01 natural sciences, Bounded type, Holomorphic function on Banach space, Mean ergodic, symbols.namesake, FOS: Mathematics, Ergodic theory, 0101 mathematics, Mathematics::Symplectic Geometry, Mathematics, Mathematics::Complex Variables, Applied Mathematics, 010102 general mathematics, Hilbert space, Composition (combinatorics), Functional Analysis (math.FA), Mathematics - Functional Analysis, 010101 applied mathematics, Bounded function, Power bounded, symbols, Composition operator, MATEMATICA APLICADA, Analysis

Abstract

[EN] We study mean ergodic composition operators on infinite dimensional spaces of holomorphic functions of different types when defined on the unit ball of a Banach or a Hilbert space: that of all holomorphic functions, that of holomorphic functions of bounded type and that of bounded holomorphic functions. Several examples in the different settings are given., We are very grateful to Jose Bonet for valuable suggestions about this work and to Pablo Galindo for pointing out an example of a Banach space which satisfies Corollary5.7. We also thank the referee for her/his careful reading and useful suggestions. The research of the first author was partially supported by the project MTM2016-76647-P. The research of the second author was partially supported by the project GV Prometeo 2017/102. The research of the third author was supported by the project MTM2017-83262-C2-1-P.

Published

2021

8. Decoupling inequalities with exponential constants

Author

Daniel Carando, Felipe Marceca, and Pablo Sevilla-Peris

Subjects

Mathematics - Functional Analysis, 46B09, 60B11, 46B07, 60E15, General Mathematics, Probability (math.PR), FOS: Mathematics, Mathematics - Probability, Functional Analysis (math.FA)

Abstract

Decoupling inequalities disentangle complex dependence structures of random objects so that they can be analyzed by means of standard tools from the theory of independent random variables. We study decoupling inequalities for vector-valued homogeneous polynomials evaluated at random variables. We focus on providing geometric conditions ensuring decoupling inequalities with good constants depending only exponentially on the degree of the polynomial. Assuming the Banach space has finite cotype we achieve this for classical decoupling inequalities that compare the polynomials with their associated multilinear operators. Under stronger geometric assumptions on the involved Banach spaces, we also obtain decoupling inequalities between random polynomials and fully independent random sums of their coefficients. Finally, we present decoupling inequalities where in the multilinear operator just two independent copies of the random vector are involved (one repeated $m-1$ times).

Published

2020

9. Function Spaces and Operators Between Them

Author

José Bonet, David Jornet, Pablo Sevilla-Peris, José Bonet, David Jornet, and Pablo Sevilla-Peris

Subjects

Functional analysis

Abstract

The aim of this work is to present, in a unified and reasonably self-contained way, certain aspects of functional analysis which are needed to treat function spaces whose topology is not derived from a single norm, their topological duals and operators between those spaces. We treat spaces of continuous, analytic and smooth functions as well as sequence spaces. Operators of differentiation, integration, composition, multiplication and partial differential operators between those spaces are studied. A brief introduction to Laurent Schwartz's theory of distributions and to Lars Hörmander's approach to linear partial differential operators is presented.The novelty of our approach lies mainly on two facts. First of all, we show all these topics together in an accessible way, stressing the connection between them. Second, we keep it always at a level that is accessible to beginners and young researchers. Moreover, parts of the book might be of interest for researchers in functional analysis and operator theory. Our aim is not to build and describe a whole, complete theory, but to serve as an introduction to some aspects that we believe are interesting. We wish to guide any reader that wishes to enter in some of these topics in their first steps. Our hope is that they learn interesting aspects of functional analysis and become interested to broaden their knowledge about function and sequence spaces and operators between them.The text is addressed to students at a master level, or even undergraduate at the last semesters, since only knowledge on real and complex analysis is assumed. We have intended to be as self-contained as possible, and wherever an external citation is needed, we try to be as precise as we can. Our aim is to be an introduction to topics in, or connected with, different aspects of functional analysis. Many of them are in some sense classical, but we tried to show a unified direct approach; some others are new. This is why parts of these lectures might be of some interest even for researchers in related areas of functional analysis or operator theory. There is a full chapter about transitive and mean ergodic operators on locally convex spaces. This material is new in book form. It is a novel approach and can be of interest for researchers in the area.

Published

2023

10. A Montel-type theorem for Hardy spaces of holomorphic functions

Author

Tomás Fernández Vidal, Daniel Galicer, and Pablo Sevilla-Peris

Subjects

Mathematics - Functional Analysis, Mathematics::Functional Analysis, Mathematics::Complex Variables, Mathematics - Complex Variables, General Mathematics, FOS: Mathematics, Mathematics::Classical Analysis and ODEs, Complex Variables (math.CV), Mathematics::Spectral Theory, Functional Analysis (math.FA)

Abstract

We give a version of the Montel theorem for Hardy spaces of holomorphic functions on an infinite dimensional space. As a by-product, we provide a Montel-type theorem for the Hardy space of Dirichlet series. This approach also gives an elementary proof of Montel theorem for the classical one-variable Hardy spaces.

Published

2020

11. Hardy space of translated Dirichlet series

Author

Pablo Sevilla-Peris, Tomás Fernández Vidal, Martin Mereb, and Daniel Galicer

Subjects

Composition operator, General Mathematics, Hardy space, 01 natural sciences, Dirichlet distribution, Schauder basis, Combinatorics, symbols.namesake, Superposition operator, 0103 physical sciences, FOS: Mathematics, Dirichlet series, 0101 mathematics, Connection (algebraic framework), Mathematics, Polynomial (hyperelastic model), Mathematics::Functional Analysis, Frechet space, 010102 general mathematics, Functional Analysis (math.FA), Mathematics - Functional Analysis, Number theory, symbols, 010307 mathematical physics, MATEMATICA APLICADA

Abstract

[EN] We study the Hardy space of translated Dirichlet series H+. It consists on those Dirichlet series Sigma a(n)n(-s) such that for some (equivalently, every) 1 0. We prove that this set, endowed with the topology induced by the seminorms {parallel to center dot parallel to(2,k)}(k is an element of N) (where parallel to Sigma a(n)n(-s) parallel to(2,k) is defined as parallel to Sigma a(n)n(-(s+ 1/k))parallel to(H2)), is a Frechet space which is Schwartz and non nuclear. Moreover, the Dirichlet monomials {n(-s)}(n is an element of N) are an unconditional Schauder basis of H+. We also explore the connection of this new space with spaces of holomorphic functions on infinite-dimensional spaces. In the spirit of Gordon and Hedenmalm's work, we completely characterize the composition operator on the Hardy space of translated Dirichlet series. Moreover, we study the superposition operators on H+ and show that every polynomial defines an operator of this kind. We present certain sufficient conditions on the coefficients of an entire function to define a superposition operator. Relying on number theory techniques we exhibit some examples which do not provide superposition operators. We finally look at the action of the differentiation and integration operators on these spaces., We would like to warmly thank Jose Bonet, Andreas Defant and Manuel Maestre for enlightening remarks and comments and fruitful discussions that improved the paper. We would also like to thank the referees for their careful reading and helpful comments. The research of T. Fernandez Vidal was supported by PICT 2015-2299. The research of D. Galicer was partially supported by CONICET-PIP 11220130100329CO and 2018-04250. The research of M. Mereb was partially supported by CONICET-PIP 11220130100073CO and PICT 2018-03511. The research of P. Sevilla-Peris was supported by MICINN and FEDER Project MTM2017-83262-C2-1-P and MECD Grant PRX17/00040.

Published

2020

12. Mean ergodic composition operators in spaces of homogeneous polynomials

Author

David Jornet, Pablo Sevilla-Peris, and Daniel Santacreu

Subjects

Pure mathematics, Composition operator, Applied Mathematics, Uniform convergence, 010102 general mathematics, Banach space, Cesaro bounded, Network topology, 01 natural sciences, Mean ergodic, Functional Analysis (math.FA), Mathematics - Functional Analysis, 010101 applied mathematics, Compact space, Space of homogeneous polynomials on a Banach space, Homogeneous, Bounded function, Power bounded, FOS: Mathematics, Ergodic theory, 0101 mathematics, MATEMATICA APLICADA, Analysis, Mathematics

Abstract

[EN] We study some dynamical properties of composition operators defined on the space P(^m X) of m-homogeneous polynomials on a Banach space X when P(^m X) is endowed with two different topologies: the one of uniform convergence on compact sets and the one defined by the usual norm. The situation is quite different for both topologies: while in the case of uniform convergence on compact sets every power bounded composition operator is uniformly mean ergodic, for the topology of the norm there is no relation between the latter properties. Several examples are given., We are indebted to Prof. Jose Bonet and Prof. Daniel Carando for helpful suggestions about this work. The research of the first author was partially supported by the project MTM2016-76647-P. The research of the second author was partially supported by the project GV Prometeo 2017/102. The research of the third author was partially supported by the project MTM2017-83262-C2-1-P

Published

2020

13. Corrigendum to 'Cluster values for algebras of analytic functions' [Adv. Math. 329 (2018) 157–173]

Author

Daniel Carando, Santiago Muro, Daniel Galicer, and Pablo Sevilla-Peris

Subjects

SPECTRUM, Pure mathematics, Matemáticas, General Mathematics, CORONA THEOREM, 010102 general mathematics, Corona theorem, FIBER, Mistake, 01 natural sciences, Matemática Pura, BALL ALGEBRA, ANALYTIC FUNCTIONS OF BOUNDED TYPE, 0103 physical sciences, 010307 mathematical physics, Ball (mathematics), 0101 mathematics, Publication process, CIENCIAS NATURALES Y EXACTAS, CLUSTER VALUE PROBLEM, Mathematics, Analytic function

Abstract

While the article was in publication process, we found a mistake in a key tool for the proof one of the main results. As a consequence, our result on the ball Au(BX) algebra remains open. For the algebra Hb(X) we obtain a weaker statement, which still extends previous work in the subject. In this note we enumerate those results which should be omitted or modified. Fil: Carando, Daniel Germán. Consejo Nacional de Investigaciones Científicas y Técnicas. Oficina de Coordinación Administrativa Ciudad Universitaria. Instituto de Investigaciones Matemáticas "Luis A. Santaló". Universidad de Buenos Aires. Facultad de Ciencias Exactas y Naturales. Instituto de Investigaciones Matemáticas "Luis A. Santaló"; Argentina. Universidad de Buenos Aires. Facultad de Ciencias Exactas y Naturales. Departamento de Matemática; Argentina Fil: Galicer, Daniel Eric. Universidad de Buenos Aires. Facultad de Ciencias Exactas y Naturales. Departamento de Matemática; Argentina. Consejo Nacional de Investigaciones Científicas y Técnicas. Oficina de Coordinación Administrativa Ciudad Universitaria. Instituto de Investigaciones Matemáticas "Luis A. Santaló". Universidad de Buenos Aires. Facultad de Ciencias Exactas y Naturales. Instituto de Investigaciones Matemáticas "Luis A. Santaló"; Argentina Fil: Muro, Luis Santiago Miguel. Universidad de Buenos Aires. Facultad de Ciencias Exactas y Naturales. Departamento de Matemática; Argentina. Consejo Nacional de Investigaciones Científicas y Técnicas; Argentina Fil: Sevilla Peris, Pablo. Universidad Politécnica de Valencia; España

Published

2018

14. Functions of One Variable

Author

Pablo Sevilla-Peris, Manuel Maestre, Andreas Defant, and Domingo García

Subjects

Pure mathematics, symbols.namesake, Subharmonic function, Bounded function, Banach space, Holomorphic function, symbols, Almost everywhere, Torus, Hardy–Littlewood maximal function, Hardy space, Mathematics

Abstract

A classical result of Fatou gives that every bounded holomorphic function on the disc has radial limits for almost every point in the torus, and the limit function belongs to the Hardy space H_\infty of the torus. This property is no longer true when we consider vector-valued functions. The Banach spaces X for which this property is satisfied are said to have the analytic Radon-Nikodym property (ARNP). Some important equivalent reformulations of ARNP are studied in this chapter. Among others, X has ARNP if and only if each X-valued H_p- function f on the disc has radial limits almost everywhere on the torus (and not only H_\infty-functions). Even more, in this case each such f has non-tangential limits within any Stolz region. The basic tools are subharmonic functions and certain maximal inequalities. Finally, it is shown that if X has the ARNP, then every L_p of functions taking values in X with a finite measure also has ARNP.

Published

2019

15. Hardy–Littlewood Inequality

Author

Domingo García, Manuel Maestre, Andreas Defant, and Pablo Sevilla-Peris

Subjects

Pure mathematics, Hardy–Littlewood inequality, Mathematics

Published

2019

16. Vector-Valued Hardy Spaces

Author

Manuel Maestre, Domingo García, Pablo Sevilla-Peris, and Andreas Defant

Subjects

Mathematics::Functional Analysis, Pure mathematics, Mathematics::Complex Variables, Image (category theory), Poisson kernel, Banach space, Holomorphic function, Mathematics::Spectral Theory, Hardy space, Space (mathematics), symbols.namesake, symbols, Uniform boundedness, Dirichlet series, Mathematics

Abstract

Given a Banach space X, we consider Hardy spaces of X-valued functions on the infinite polytorus, Hardy spaces of X-valued Dirichlet series (defined as the image of the previous ones by the Bohr transform), and Hardy spaces of X-valued holomorphic functions on l_2 ∩ B_{c0}. The chapter is dedicated to study the interplay between these spaces. It is shown that the space of functions on the polytorus always forms a subspace of the one of holomorphic functions, and these two are isometrically isomorphic if and only if X has ARNP. Then the question arises of what do we find in the side of Dirichlet series when we look at the image of the Hardy space of holomorphic functions. This is also answered, showing that this consists of Dirichlet series for which all horizontal translations (those whose coefficients are (a_n/n^e)) are in \mathcal{H}_p with uniformly bounded norms. Also, a version of the brothers Riesz theorem for vector-valued functions is given.

Published

2019

17. Selected Topics on Banach Space Theory

Author

Andreas Defant, Domingo García, Pablo Sevilla-Peris, and Manuel Maestre

Subjects

Mathematics::Functional Analysis, Pure mathematics, Sequence, Basis (linear algebra), Uniform boundedness principle, Banach space, Mathematics::General Topology, Hahn–Banach theorem, Closed graph theorem, Mathematics, Schauder basis

Abstract

Basic topics on Banach space theory needed for the text are reviewed. Hahn-Banach theorem, Baire’s theorem, uniform boundedness principle, closed graph theorem, weak topologies, Banach-Alaoglu theorem, unconditional basis, Banach sequence spaces, summing operators, factorable operators, cotype, Kahane inequality.

Published

2019

18. Infinite Dimensional Holomorphy

Author

Manuel Maestre, Andreas Defant, Pablo Sevilla-Peris, and Domingo García

Subjects

Pure mathematics, Mathematics::Complex Variables, Homogeneous polynomial, Banach space, Holomorphic function, Differentiable function, Hartogs' theorem, Infinite-dimensional holomorphy, Mathematics::Symplectic Geometry, Cauchy's integral formula, Analytic function, Mathematics

Abstract

We give an introduction to vector-valued holomorphic functions in Banach spaces, defined through Frechet differentiability. Every function defined on a Reinhardt domain of a finite-dimensional Banach space is analytic, i.e. can be represented by a monomial series expansion, where the family of coefficients is given through a Cauchy integral formula. Every separate holomorphic (holomorphic on each variable) function is holomorphic. This is Hartogs’ theorem, which is proved using Leja’s polynomial lemma. For infinite-dimensional spaces, homogeneous polynomials are defined as the diagonal of multilinear mappings. A function is holomorphic if and only if it is Gâteaux holomorphic and continuous, if and only if it has representation as a series of homogeneous polynomials (known as Taylor expansion). A function is weak holomorphic if the composition with every functional is holomorphic. A function is holomorphic if and only if it is weak holomorphic. Analytic functions are holomorphic.

Published

2019

19. Holomorphic Functions on Polydiscs

Author

Pablo Sevilla-Peris, Manuel Maestre, Domingo García, and Andreas Defant

Subjects

Pure mathematics, Monomial, symbols.namesake, Homogeneous polynomial, Entire function, Holomorphic function, Taylor series, symbols, Differentiable function, Cauchy's integral formula, Analytic function, Mathematics

Abstract

This is a short introduction to the theory of holomorphic functions in finitely and infinitely many variables. We begin with functions in finitely many variables, giving the definition of holomorphic function. Every such function has a monomial series expansion, where the coefficients are given by a Cauchy integral formula. Then we move to infinitely many variables, considering functions defined on B_{c0}, the open unit ball of the space of null sequences. Holomorphic functions are defined by means of Frechet differentiability. We have versions of Weierstrass and Montel theorems in this setting. Every holomorphic function on B_{c0} defines a family of coefficients through a Cauchy integral formula and a (formal) monomial series expansion. Every bounded analytic (represented by a convergent power series) function is holomorphic. Hilbert’s criterion, that gives conditions on a family of scalars so that it is attached to a bounded holomorphic function on B_{c0}. Homogeneous polynomials are those entire functions having non-zero coefficients only for multi-indices of a given order. We show how these are related to multilinear forms on c0 through the polarization formulas.

Published

2019

20. Hardy Spaces of Dirichlet Series

Author

Domingo García, Pablo Sevilla-Peris, Andreas Defant, and Manuel Maestre

Subjects

Pure mathematics, symbols.namesake, symbols, Cayley transform, Hardy space, Dirichlet series, Mathematics

Published

2019

21. Dirichlet series from the infinite dimensional point of view

Author

Andreas Defant, Domingo García, Manuel Maestre, and Pablo Sevilla-Peris

Subjects

Pure mathematics, General Mathematics, Banach space, Holomorphic function, Space (mathematics), 01 natural sciences, symbols.namesake, 0103 physical sciences, Right half-plane, holomorphic function, Ball (mathematics), 0101 mathematics, Dirichlet series, Mathematics, 30B50, 010102 general mathematics, Bohr model, Bohr transform, Bounded function, symbols, 010307 mathematical physics, MATEMATICA APLICADA, 46G20

Abstract

[EN] A classical result of Harald Bohr linked the study of convergent and bounded Dirichlet series on the right half plane with bounded holomorphic functions on the open unit ball of the space c(0) f complex null sequences. Our aim here is to show that many questions in Dirichlet series have very natural solutions when, following Bohr's idea, we translate these to the infinite dimensional setting. Some are new proofs and other new results obtained by using that point of view., The authors were supported by MINECO and FEDER Project MTM2017-83262-C2-1-P. The second and third authors were also supported by Project Prometeo/2017/102 of the Generalitat Valenciana.

Published

2018

22. Dirichlet Series and Holomorphic Functions in High Dimensions

Author

Andreas Defant, Domingo García, Manuel Maestre, Pablo Sevilla-Peris, Andreas Defant, Domingo García, Manuel Maestre, and Pablo Sevilla-Peris

Subjects

Dirichlet series, Holomorphic functions, Functional analysis

Abstract

Over 100 years ago Harald Bohr identified a deep problem about the convergence of Dirichlet series, and introduced an ingenious idea relating Dirichlet series and holomorphic functions in high dimensions. Elaborating on this work, almost twnety years later Bohnenblust and Hille solved the problem posed by Bohr. In recent years there has been a substantial revival of interest in the research area opened up by these early contributions. This involves the intertwining of the classical work with modern functional analysis, harmonic analysis, infinite dimensional holomorphy and probability theory as well as analytic number theory. New challenging research problems have crystallized and been solved in recent decades. The goal of this book is to describe in detail some of the key elements of this new research area to a wide audience. The approach is based on three pillars: Dirichlet series, infinite dimensional holomorphy and harmonic analysis.

Published

2019

23. Isomorphic copies of ℓ1form-homogeneous non-analytic Bohnenblust-Hille polynomials

Author

Juan B. Seoane-Sepúlveda, J. Alberto Conejero, and Pablo Sevilla-Peris

Subjects

Pure mathematics, General Mathematics, 010102 general mathematics, 01 natural sciences, Toeplitz matrix, Set (abstract data type), symbols.namesake, Homogeneous, 0103 physical sciences, symbols, Point (geometry), 010307 mathematical physics, 0101 mathematics, Element (category theory), Dirichlet series, Mathematics

Abstract

We employ a classical result by Toeplitz (1913) and the seminal work by Bohnenblust and Hille on Dirichlet series (1931) to show that the set of continuous m-homogeneous non-analytic polynomials on c0 contains an isomorphic copy of l1. Moreover, we can have this copy of l1 in such a way that every non-zero element of it fails to be analytic at precisely the same point.

Published

2016

24. Cluster values for algebras of analytic functions

Author

Pablo Sevilla-Peris, Santiago Muro, Daniel Carando, and Daniel Galicer

Subjects

Pure mathematics, Cluster value problem, Approximation property, Matemáticas, General Mathematics, Corona theorem, Holomorphic function, Banach space, FIBER, 01 natural sciences, Analytic functions of bounded type, Matemática Pura, purl.org/becyt/ford/1 [https], symbols.namesake, BALL ALGEBRA, ANALYTIC FUNCTIONS OF BOUNDED TYPE, Spectrum, FOS: Mathematics, Ball algebra, Ball (mathematics), Corona Theorem, Fiber, 0101 mathematics, Complex Variables (math.CV), Computer Science::Distributed, Parallel, and Cluster Computing, Mathematics, SPECTRUM, Mathematics - Complex Variables, 010102 general mathematics, CORONA THEOREM, Hilbert space, purl.org/becyt/ford/1.1 [https], Physics::History of Physics, Functional Analysis (math.FA), 010101 applied mathematics, Mathematics - Functional Analysis, Bounded function, symbols, MATEMATICA APLICADA, 46J15, 46E50, 30H05, CIENCIAS NATURALES Y EXACTAS, Analytic function, CLUSTER VALUE PROBLEM

Abstract

[EN] The Cluster Value Theorem is known for being a weak version of the classical Corona Theorem. Given a Banach space X, we study the Cluster Value Problem for the ball algebra A(u)(B-X), the Banach algebra of all uniformly continuous holomorphic functions on the unit ball B-X; and also for the Frechet algebra H-b(X) of holomorphic functions of bounded type on X (more generally, for H-b(U), the algebra of holomorphic functions of bounded type on a given balanced open subset U subset of X). We show that Cluster Value Theorems hold for all of these algebras whenever the dual of X has the bounded approximation property. These results are an important advance in this problem, since the validity of these theorems was known only for trivial cases (where the spectrum is formed only by evaluation functionals) and for the infinite dimensional Hilbert space. As a consequence, we obtain weak analytic Nullstellensatz theorems and several structural results for the spectrum of these algebras. (C) 2017 Elsevier Inc. All rights reserved., This work was partially supported by projects CONICET PIP 11220130100329CO, ANPCyT PICT 2015-2299, ANPCyT PICT-2015-3085, ANPCyT PICT-2015-2224, UBACyT 20020130300057BA, UBACyT 20020130300052BA, UBACyT 20020130100474BA and MINECO and FEDER Project MTM2014-57838-C2-2-P.

Published

2018

25. A note on abscissas of Dirichlet series

Author

Antonio Pérez, Pablo Sevilla-Peris, Andreas Defant, Ministerio de Economía y Competitividad (España), and European Commission

Subjects

Hardy space, 01 natural sciences, symbols.namesake, Mathematics::Group Theory, Convergence (routing), FOS: Mathematics, Applied mathematics, 0101 mathematics, Dirichlet series, Mathematics, Algebra and Number Theory, Mathematics::Operator Algebras, Mathematics::Complex Variables, Applied Mathematics, 010102 general mathematics, Abscissa, Abscissas of convergence, Mathematics::Spectral Theory, Computer Science::Numerical Analysis, Functional Analysis (math.FA), 010101 applied mathematics, Mathematics - Functional Analysis, Computational Mathematics, symbols, Geometry and Topology, MATEMATICA APLICADA, Analysis

Abstract

[EN] We present an abstract approach to the abscissas of convergence of vector-valued Dirichlet series. As a consequence we deduce that the abscissas for Hardy spaces of Dirichlet series are all equal. We also introduce and study weak versions of the abscissas for scalar-valued Dirichlet series., A. Defant: Partially supported by MINECO and FEDER MTM2017-83262-C2-1-P. A. Pérez: Supported by La Caixa Foundation, MINECO and FEDER MTM2014-57838-C2-1-P and Fundación Séneca - Región de Murcia (CARM 19368/PI/14). P. Sevilla-Peris: Supported by MINECO and FEDER MTM2017-83262-C2-1-P.

Published

2018

26. The Bohnenblust-Hille inequality combined with an inequality of Helson

Author

Daniel Carando, Andreas Defant, and Pablo Sevilla-Peris

Subjects

Pure mathematics, Polynomial, HELSON INEQUALITY, Inequality, Degree (graph theory), Matemáticas, Applied Mathematics, General Mathematics, media_common.quotation_subject, Helson inequality, Polynomials, Matemática Pura, Functional Analysis (math.FA), Mathematics - Functional Analysis, POLYNOMIALS, BOHNENBLUST–HILLE INEQUALITY, FOS: Mathematics, Bohnenblust-Hille inequality, MATEMATICA APLICADA, CIENCIAS NATURALES Y EXACTAS, Mathematics, media_common

Abstract

We give a variant of the Bohenblust-Hille inequality which, for certain families of polynomials, leads to constants with polynomial growth in the degree., The third author was supported by MICINN MTM2011-22417 and UPV-SP20120700.

Published

2015

27. Estimates for vector valued Dirichlet polynomials

Author

Ursula Schwarting, Andreas Defant, and Pablo Sevilla-Peris

Subjects

Discrete mathematics, Mathematics::Functional Analysis, General Mathematics, Mathematics::Analysis of PDEs, Banach space, Absolute convergence, Dirichlet distribution, Bohr model, Dirichlet series in Banach space, symbols.namesake, Norm (mathematics), Bohr's strips of convergence, symbols, Bohr-Bohnenblust-Hille Theorem in Banach spaces, MATEMATICA APLICADA, Dirichlet series, Mathematics

Abstract

[EN] We estimate the -norm of finite Dirichlet polynomials with coefficients in a Banach space. Our estimates quantify several recent results on Bohr's strips of uniform but non absolute convergence of Dirichlet series in Banach spaces., A. Defant and P. Sevilla-Peris were supported by MICINN Project MTM2011-22417.

Published

2014

28. Summation of coefficients of polynomials on Lp spaces

Author

Verónica Dimant and Pablo Sevilla-Peris

Subjects

Matemáticas, General Mathematics, Mathematics::Classical Analysis and ODEs, Bilinear interpolation, 010103 numerical & computational mathematics, 01 natural sciences, Matemática Pura, purl.org/becyt/ford/1 [https], 47H60, multilinear mappings, FOS: Mathematics, Homogeneous polynomials, 0101 mathematics, Mathematics, Discrete mathematics, Mathematics::Functional Analysis, 010102 general mathematics, sequence spaces, Hardy-Littlewood inequalities, purl.org/becyt/ford/1.1 [https], Hardy-littlewood inequalities, Sequence spaces, Functional Analysis (math.FA), Mathematics - Functional Analysis, Hardy-LLittlewood inequalities, 46G25, MATEMATICA APLICADA, Hardy–Littlewood inequality, Multilinear mappings, CIENCIAS NATURALES Y EXACTAS

Abstract

[EN] We investigate the summability of the coefficients of m-homogeneous polynomials and m-linear mappings defined on l(p) spaces. In our research we obtain results on the summability of the coefficients of m-linear mappings defined on l(p1) X...X l(pm). The first results in this respect go back to Littlewood [17] and Bohnenblust and HiIle [6] for bilinear and m-linear forms on c(0), and Hardy and Littlewood [15] and Praciano-Pereira [20] for bilinear and m-linear forms on arbitrary l(p) spaces. Our results recover and in some case complete these old results through a general approach on vector valued m-linear mappings., The first author was partially supported by CONICET PIP 0624 and ANPCyT PICT 1456. The second author was supported by MICINN Project MTM2014-57838-C2-2-P and partially by grant GVA-BEST/2013/113 and project UPV-SP20120700.

Published

2016

29. Some polynomial versions of cotype and applications

Author

Andreas Defant, Pablo Sevilla-Peris, and Daniel Carando

Subjects

Power series, Polynomial, Matemáticas, Banach space, 01 natural sciences, Matemática Pura, purl.org/becyt/ford/1 [https], symbols.namesake, 0103 physical sciences, Convergence (routing), FOS: Mathematics, Mathematics::Metric Geometry, 0101 mathematics, Dirichlet series, Mathematics, Mathematics::Functional Analysis, 010102 general mathematics, Search engine indexing, purl.org/becyt/ford/1.1 [https], Functional Analysis (math.FA), Mathematics - Functional Analysis, Algebra, Cotype, Banach spaces, Fourier transform, Vector-valued Dirichlet series, symbols, Monomial convergence, 010307 mathematical physics, MATEMATICA APLICADA, Analysis, CIENCIAS NATURALES Y EXACTAS

Abstract

[EN] We introduce non-linear versions of the classical cotype of Banach spaces. We show that spaces with l.u.st. and cotype, and spaces having Fourier cotype enjoy our non-linear cotype. We apply these concepts to get results on convergence of vector-valued power series in infinite many variables and on l(1)-multipliers of vector-valued Dirichlet series. Finally we introduce cotype with respect to indexing sets, an idea that includes our previous definitions. (C) 2015 Elsevier Inc. All rights reserved., The first author was partially supported by CONICET-PIP 11220130100329CO, UBACyT 20020130100474BA and ANPCyT PICT 2011-1456. The third author was also supported by UPV-SP20120700. All three authors were supported by project MTM2014-57838-C2-2-P.

Published

2016

30. A new multilinear insight on Littlewood's 4/3-inequality

Author

Pablo Sevilla-Peris and Andreas Defant

Subjects

Discrete mathematics, Monomial, Multilinear map, Summing operators, Approximation property, Local Banach space theory, Absolute convergence, Compact operator, Physics::History of Physics, Bohr model, symbols.namesake, Linear extension, Multilinear theory, symbols, Dirichlet series, Analysis, Mathematics

Abstract

We unify Littlewood's classical 4/3-inequality (a forerunner of Grothendieck's inequality) together with its m -linear extension due to Bohnenblust and Hille (which originally settled Bohr's absolute convergence problem for Dirichlet series) with a scale of inequalties of Bennett and Carl in l p -spaces (which are of fundamental importance in the theory of eigenvalue distribution of power compact operators). As an application we give estimates for the monomial coefficients of homogeneous l p -valued polynomials on c 0 .

Published

2009

31. Ideals of Multilinear Forms – a Limit Order Approach

Author

Daniel Carando, Verónica Dimant, and Pablo Sevilla-Peris

Subjects

Discrete mathematics, Pure mathematics, Multilinear map, Ideal (set theory), Mathematics::Commutative Algebra, General Mathematics, Diagonal, Operator theory, Potential theory, Theoretical Computer Science, Multilinear form, Hull, Limit (mathematics), Analysis, Mathematics

Abstract

A general theory of limit orders for ideals of multilinear forms is developed. We relate the limit order of an ideal to those of its maximal hull and its adjoint ideal. We study the limit orders of the ideals of dominated and multiple summing multilinear forms. Finally, estimates of the diagonal of a (non-necessarily diagonal) multilinear form are presented, in terms of the limit order of the ideals to which it belongs.

Published

2007

32. Asymptotic estimates on the von Neumann inequality for homogeneous polynomials

Author

Santiago Muro, Daniel Galicer, and Pablo Sevilla-Peris

Subjects

Pure mathematics, Inequality, 47A13, 47A60, 28A78, 60G99, 46G25, 05B05, General Mathematics, media_common.quotation_subject, 01 natural sciences, symbols.namesake, FOS: Mathematics, Pict (programming language), 0101 mathematics, Operator Algebras (math.OA), Mathematics, computer.programming_language, media_common, Applied Mathematics, 010102 general mathematics, Mathematics - Operator Algebras, Functional Analysis (math.FA), 010101 applied mathematics, Mathematics - Functional Analysis, Homogeneous, ComputingMethodologies_DOCUMENTANDTEXTPROCESSING, symbols, MATEMATICA APLICADA, computer, Von Neumann architecture

Abstract

By the von Neumann inequality for homogeneous polynomials there exists a positive constant $C_{k,q}(n)$ such that for every $k$-homogeneous polynomial $p$ in $n$ variables and every $n$-tuple of commuting operators $(T_1, \dots, T_n)$ with $\sum_{i=1}^{n} \Vert T_{i} \Vert^{q} \leq 1$ we have \[ \|p(T_1, \dots, T_n)\|_{\mathcal L(\mathcal H)} \leq C_{k,q}(n) \; \sup\{ |p(z_1, \dots, z_n)| : \textstyle \sum_{i=1}^{n} \vert z_{i} \vert^{q} \leq 1 \}\,. \] For fixed $k$ and $q$, we study the asymptotic growth of the smallest constant $C_{k,q}(n)$ as $n$ (the number of variables/operators) tends to infinity. For $q = \infty$, we obtain the correct asymptotic behavior of this constant (answering a question posed by Dixon in the seventies). For $2 \leq q < \infty$ we improve some lower bounds given by Mantero and Tonge, and prove the asymptotic behavior up to a logarithmic factor. To achieve this we provide estimates of the norm of homogeneous unimodular Steiner polynomials, i.e. polynomials such that the multi-indices corresponding to the nonzero coefficients form partial Steiner systems., 14 pages, Accepted in Journal f\"ur die reine und angewandte Mathematik (Crelle's Journal)

Published

2015

33. Constructing approximate diffusion processes with uncertain data

Author

Juan Carlos Cortés, Pablo Sevilla-Peris, and Lucas Jódar

Subjects

Numerical Analysis, Continuous-time stochastic process, General Computer Science, Uncertain data, Stochastic process, Applied Mathematics, Mathematical analysis, Stochastic calculus, Discrete-time stochastic process, Standard deviation, Theoretical Computer Science, Modeling and Simulation, Local time, Applied mathematics, Stochastic optimization, Mathematics

Abstract

In this paper discrete approximate processes of mixed diffusion problems under spatial uncertainty are constructed using random difference schemes. Conditions for the existence of a series stochastic solution process are given using a stochastic separation of variable method. Expectation and standard deviation of the approximate stochastic processes are computed for an illustrative example.

Published

2006

34. Composition Operators on Weighted Spaces of Holomorphic Functions on JB *-triples

Author

José Antonio Vallejo, Michael Mackey, and Pablo Sevilla-Peris

Subjects

Pure mathematics, Open unit, Banach space, Holomorphic function, FOS: Physical sciences, Statistical and Nonlinear Physics, Mathematical Physics (math-ph), Functional Analysis (math.FA), Mathematics - Functional Analysis, 17C65, 46L05, 81R10, Homogeneous, FOS: Mathematics, Ball (mathematics), Mathematical Physics, Mathematics

Abstract

We characterise continuity of composition operators on weighted spaces of holomorphic functions $H_{v}(B_{X})$, where $B_{X}$ is the open unit ball of a Banach space which is homogeneous, that is, a $JB^{\ast}-$triple., Paper already published. Placed here for archiving purposes

Published

2006

35. Limit Orders and Multilinear Forms on $\ell_p$ Spaces

Author

Daniel Carando, Pablo Sevilla-Peris, and Verónica Dimant

Subjects

Discrete mathematics, Multilinear map, General Mathematics, Limit (mathematics), Mathematics

Abstract

The third author was supported by the MCYT and FEDER Project BFM2002-01423 and grant GV-GRUPOS04/45

Published

2006

36. A new direct method for solving the Black–Scholes equation

Author

Juan Carlos Cortés, Lucas Jódar, R. Sala, and Pablo Sevilla-Peris

Subjects

Mellin transform, Diffusion equation, Applied Mathematics, Direct method, Mathematical analysis, Black–Scholes model, Black–Scholes equation, Applied mathematics, Diffusion (business), Mathematics, Variable (mathematics), Equation solving

Abstract

Using the Mellin transform a new method for solving the Black–Scholes equation is proposed. Our approach does not require either variable transformations or solving diffusion equations.

Published

2005

37. Exact and numerical solution of Black–Scholes matrix equation

Author

Lucas Jódar, R. Sala, Pablo Sevilla-Peris, and Juan Carlos Cortés

Subjects

Computational Mathematics, Mellin transform, Exact solutions in general relativity, Applied Mathematics, Numerical analysis, Mathematical analysis, Order of accuracy, Black–Scholes model, Stiff equation, Mathematics, Numerical stability, Equation solving

Abstract

In this paper a new method for solving Black-Scholes equation is proposed. The approach is based on the Mellin transform. A numerical procedure for the approximation of the solution is given.

Published

2005

38. Invertibility in tensor products of Q-algebras

Author

Seán Dineen and Pablo Sevilla-Peris

Subjects

Algebra, Tensor contraction, Tensor product, Tensor product of algebras, General Mathematics, Tensor (intrinsic definition), Tensor product of Hilbert spaces, Ricci decomposition, Symmetric tensor, Tensor product of modules, Mathematics

Published

2002

39. Bohr's absolute convergence problem for Hp-Dirichlet series in banach spaces

Author

Andreas Defant, Pablo Sevilla-Peris, and Daniel Carando

Subjects

Numerical Analysis, Pure mathematics, Mathematical sciences, Vector-valued H-p spaces, Matemáticas, Applied Mathematics, Banach space, purl.org/becyt/ford/1.1 [https], Absolute convergence, Bohr model, BANACH SPACES, Matemática Pura, purl.org/becyt/ford/1 [https], symbols.namesake, Banach spaces, Vector-valued Dirichlet series, VECTOR-VALUED DIRICHLET SERIES, symbols, Scientific publishing, MATEMATICA APLICADA, Analysis, Dirichlet series, CIENCIAS NATURALES Y EXACTAS, Mathematics

Abstract

[EN] The Bohr–Bohnenblust–Hille theorem states that the width of the strip in the complex plane on which an ordinary Dirichlet series P n ann −s converges uniformly but not absolutely is less than or equal to 1 2 , and this estimate is optimal. Equivalently, the supremum of the absolute convergence abscissas of all Dirichlet series in the Hardy space H∞ equals 1 2 . By a surprising fact of Bayart the same result holds true if H∞ is replaced by any Hardy space Hp, 1 ≤ p < ∞, of Dirichlet series. For Dirichlet series with coefficients in a Banach space X the maximal width of Bohr’s strips depend on the geometry of X; Defant, García, Maestre and Pérez-García proved that such maximal width equals 1 − 1/Cot X, where Cot X denotes the maximal cotype of X. Equivalently, the supremum over the absolute convergence abscissas of all Dirichlet series in the vector-valued Hardy space H∞(X) equals 1 − 1/Cot X. In this article we show that this result remains true if H∞(X) is replaced by the larger class Hp(X), 1 ≤ p < ∞, Carando was partially supported by CONICET PIP 0624, PICT 2011-1456 and UBACyT 1-746. Defant and Sevilla-Peris were supported by MICINN project MTM2011-22417. Sevilla-Peris was partially supported by UPV-SP20120700.

Published

2014

40. Multipliers of Dirichlet series and monomial series expansions of holomorphic functions in infinitely many variables

Author

Leonhard Frerick, Andreas Defant, Pablo Sevilla-Peris, Frédéric Bayart, and Manuel Maestre

Subjects

Mathematics::Complex Variables, General Mathematics, 010102 general mathematics, Prime number, Holomorphic function, Hardy space, Absolute convergence, 01 natural sciences, Functional Analysis (math.FA), 010101 applied mathematics, Combinatorics, Mathematics - Functional Analysis, symbols.namesake, Multiplicative sequence, Subsequence, FOS: Mathematics, symbols, Ball (mathematics), 0101 mathematics, MATEMATICA APLICADA, Dirichlet series, Mathematics

Abstract

Let $\mathcal{H}_\infty$ be the set of all ordinary Dirichlet series $D=\sum_n a_n n^{-s}$ representing bounded holomorphic functions on the right half plane. A multiplicative sequence $(b_n)$ of complex numbers is said to be an $\ell_1$-multiplier for $\mathcal{H}_\infty$ whenever $\sum_n |a_n b_n| < \infty$ for every $D \in \mathcal{H}_\infty$. We study the problem of describing such sequences $(b_n)$ in terms of the asymptotic decay of the subsequence $(b_{p_j})$, where $p_j$ denotes the $j$th prime number. Given a multiplicative sequence $b=(b_n)$ we prove (among other results): $b$ is an $\ell_1$-multiplier for $\mathcal{H}_\infty$ provided $|b_{p_j}| < 1$ for all $j$ and $\overline{\lim}_n \frac{1}{\log n} \sum_{j=1}^n b_{p_j}^{*2} < 1$, and conversely, if $b$ is an $\ell_1$-multiplier for $\mathcal{H}_\infty$, then $|b_{p_j}| < 1$ for all $j$ and $\overline{\lim}_n \frac{1}{\log n} \sum_{j=1}^n b_{p_j}^{*2} \leq 1$ (here $b^*$ stands for the decreasing rearrangement of $b$). Following an ingenious idea of Harald Bohr it turns out that this problem is intimately related with the question of characterizing those sequences $z$ in the infinite dimensional polydisk $\mathbb{D}^\infty$ (the open unit ball of $\ell_\infty$) for which every bounded and holomorphic function $f$ on $\mathbb{D}^\infty$ has an absolutely convergent monomial series expansion $\sum_{\alpha} \frac{\partial_\alpha f(0)}{\alpha!} z^\alpha$. Moreover, we study analogous problems in Hardy spaces of Dirichlet series and Hardy spaces of functions on the infinite dimensional polytorus $\mathbb{T}^\infty$., Comment: arXiv admin note: substantial text overlap with arXiv:1207.2248

Published

2014

41. Extendibility of bilinear forms on banach sequence spaces

Author

Daniel Carando and Pablo Sevilla-Peris

Subjects

Multilinear map, Pure mathematics, Matemáticas, General Mathematics, Mathematics::Classical Analysis and ODEs, L(P), Bilinear form, Superspace, Polynomials, Hahn-Banach extensions, Matemática Pura, Extension, FOS: Mathematics, Banach sequence spaces, Mathematics, Subspaces, Mathematics::Functional Analysis, Sequence, Extension (predicate logic), Mappings, Functional Analysis (math.FA), Mathematics - Functional Analysis, Nonlinear Sciences::Exactly Solvable and Integrable Systems, Bilinear forms, Multilinear forms, MATEMATICA APLICADA, CIENCIAS NATURALES Y EXACTAS

Abstract

[EN] We study Hahn-Banach extensions of multilinear forms defined on Banach sequence spaces. We characterize c(0) in terms of extension of bilinear forms, and describe the Banach sequence spaces in which every bilinear form admits extensions to any superspace., The second author was supported by MICINN Project MTM2011-22417.

Published

2014

42. The Bohnenblust Hille cycle of ideas from a modern point of view

Author

Pablo Sevilla-Peris and Andreas Defant

Subjects

Inequality, polynomials, 30B50, General Mathematics, media_common.quotation_subject, Bohr’s problem, Polynomials, Style (sociolinguistics), 46E50, symbols.namesake, symbols, Calculus, Bohnenblust-Hille inequality, Bohr's problem, Point (geometry), Convergence (relationship), 46G25, Dirichlet series, MATEMATICA APLICADA, media_common, Mathematics, Bohnenblust–Hille inequality

Abstract

[EN] In 1931 H.F.Bohnenblust and E.Hille published a very important paper in which not only did they solve a long standing problem on convergence of Dirichlet series, but also gave a general version of a celebrated inequality of Littlewood. Although it is full of extremely valuable mathematical ideas, the paper has been overlooked for a long time and even today we feel that it does not get the credit it deserves. This may be caused by the not always accessible style that makes that the ideas are sometimes hidden. It is our intention to try to study the paper from a modern point of view and to bring to light the valuable aspects we believe it has., Both authors were supported by MICINN Project MTM2011-22417. The second author was also partially supported by project UPV-SP201207000.

Published

2014

43. Almost sure-sign convergence of Hardy-type Dirichlet series

Author

Daniel Carando, Pablo Sevilla-Peris, and Andreas Defant

Subjects

Matemáticas, General Mathematics, Banach space, Type (model theory), 01 natural sciences, Matemática Pura, Combinatorics, purl.org/becyt/ford/1 [https], symbols.namesake, 0103 physical sciences, Convergence (routing), FOS: Mathematics, 0101 mathematics, Dirichlet series, Mathematics, Functional analysis, Hardy spaces, Mathematics::Complex Variables, 010102 general mathematics, purl.org/becyt/ford/1.1 [https], Hardy space, Functional Analysis (math.FA), Mathematics - Functional Analysis, symbols, 010307 mathematical physics, Random series, MATEMATICA APLICADA, Complex plane, Analysis, CIENCIAS NATURALES Y EXACTAS, Sign (mathematics), 30B50, 30H10, 46G20

Abstract

[EN] Hartman proved in 1939 that the width of the largest possible strip in the complex plane on which a Dirichlet series is uniformly a.s.- sign convergent (i.e., converges uniformly for almost all sequences of signs epsilon (n) = +/- 1) but does not convergent absolutely, equals 1/2. We study this result from a more modern point of view within the framework of so-called Hardytype Dirichlet series with values in a Banach space., Supported by CONICET-PIP 11220130100329CO, PICT 2015-2299 and UBACyT 20020130100474BA. Supported by MICINN MTM2017-83262-C2-1-P. Supported by MICINN MTM2017-83262-C2-1-P and UPV-SP20120700.

Published

2014

44. The Dirichlet-Bohr radius

Author

Pablo Sevilla-Peris, Domingo A. Garcí, Andreas Defant, Daniel Carando, and Manuel Maestre

Subjects

Matemáticas, Holomorphic function, Dirichlet distribution, Matemática Pura, symbols.namesake, Holomorphic functions, FOS: Mathematics, Pict (programming language), Number Theory (math.NT), Dirichlet series, 11M41, 30B50, 11M36, Mathematics, Mathematical physics, computer.programming_language, Bohr radius, Algebra and Number Theory, Mathematics - Number Theory, Functional Analysis (math.FA), Mathematics - Functional Analysis, symbols, MATEMATICA APLICADA, computer, CIENCIAS NATURALES Y EXACTAS

Abstract

[EN] Denote by Ω(n) the number of prime divisors of n ∈ N (counted with multiplicities). For x ∈ N define the Dirichlet-Bohr radius P L(x) to be the best r > 0 such that for every finite Dirichlet polynomial n≤x ann −s we have X n≤x |an|r Ω(n) ≤ sup t∈R X n≤x ann −it . We prove that the asymptotically correct order of L(x) is (log x) 1/4x −1/8 . Following Bohr’s vision our proof links the estimation of L(x) with classical Bohr radii for holomorphic functions in several variables. Moreover, we suggest a general setting which allows to translate various results on Bohr radii in a systematic way into results on Dirichlet-Bohr radii, and vice versa, The first author was supported by CONICET-PIP 0624, UBACyT 20020130100474BA and ANPCyT PICT 2011-1456. The third, fourth and fifth authors were supported by MINECO MTM2014-57838-C2-2-P, and the third and fourth also by Prometeo 11/2013/013. The fifth author was also partially supported by UPV-SP20120700.

Published

2014

45. Diagonal extendible multilinear operators between l(p)-spaces

Author

Román Villafañe, Verónica Dimant, Pablo Sevilla-Peris, and Daniel Carando

Subjects

Discrete mathematics, Mathematics::Functional Analysis, Multilinear map, Algebra and Number Theory, Matemáticas, Applied Mathematics, Diagonal, Sequence spaces, Matemática Pura, Functional Analysis (math.FA), Mathematics - Functional Analysis, Algebra, 47H60, 46B45, 46G25, Computational Mathematics, Operator (computer programming), Extension of multilinear operators, FOS: Mathematics, Mathematics::Metric Geometry, Geometry and Topology, Multilinear mappings, MATEMATICA APLICADA, CIENCIAS NATURALES Y EXACTAS, Analysis, Mathematics

Abstract

[EN] We study extendibility of diagonal multilinear operators from l(p) to l(p) spaces. We determine the values of and for which every diagonal -linear operator is extendible, and those for which the only extendible ones are integral. We address the same question for multilinear forms on l(p)., D. Carando, V. Dimant and R. Villafane were partially supported by CONICET PIP 0624 and UBACyT 20020100100746. P. Sevilla-Peris was supported by MICINN Project MTM2011-22417. R. Villafane has a doctoral fellowship from CONICET.

Published

2014

46. Convergence of monomial expansions in banach spaces

Author

Pablo Sevilla-Peris and Andreas Defant

Subjects

Pure mathematics, Monomial, General Mathematics, Mathematical analysis, Convergence (routing), Banach space, MATEMATICA APLICADA, Series, Mathematics

Abstract

[EN] If E is a Banach sequence space, then each holomorphic function defines a formal power series ¿ ¿ c ¿(f) z ¿. The problem of when such an expansion converges absolutely and actually represents the function goes back to the very beginning of the theory of holomorphic functions on infinite-dimensional spaces. Several very deep results have been given for scalar-valued functions by Ryan, Lempert and Defant, Maestre and Prengel. We go on with this study, looking at monomial expansions of vector-valued holomorphic functions on Banach spaces. Some situations are very different from the scalar-valued case. © 2011 Published by Oxford University Press. All rights reserved., Both authors were supported by the MEC Project MTM2008-03211. The second cited author was partially supported by grants PR2007-0384 (MEC) and UPV-PAID-00-07.

Published

2012

47. Bohr's strips for Dirichlet series in Banach spaces

Author

Domingo García, Manuel Maestre, Pablo Sevilla-Peris, and Andreas Defant

Subjects

Discrete mathematics, 46B09, Dirichlet conditions, General Mathematics, Power series, 32A05, Dirichlet eta function, Polynomials, Bohr model, Combinatorics, Banach spaces, symbols.namesake, Dirichlet kernel, Number theory, Dirichlet's principle, symbols, 46B07, Dirichlet series, MATEMATICA APLICADA, General Dirichlet series, 46G20, Mathematics

Abstract

[EN] Each Dirichlet series D=∑∞n=1an1nsD=∑n=1∞an1ns, with variable s∈Cs∈C and coefficients an∈Can∈C, has a so called Bohr strip, the largest strip in CC on which DD converges absolutely but not uniformly. The classical Bohr-Bohnenblust-Hille theorem states that the width of the largest possible Bohr strip equals 1/21/2. Recently, this deep work of Bohr, Bohnenblust and Hille from the beginning of the last century was revisited by various authors. New methods from different fields of modern analysis (e.g. probability theory, number theory, functional and Fourier analysis) allow to improve the Bohr-Bohnenblust-Hille cycle of ideas, and to extend it to new settings, in particular to Dirichlet series which coefficients in Banach spaces. We survey on various aspects of these new developments., The authors were supported in part by MICINN and FEDER Project MTM2008-03211. The third author was also supported by Prometeo 2008/101

Published

2011

48. Convergence of Dirichlet polynomials in Banach spaces

Author

Pablo Sevilla-Peris and Andreas Defant

Subjects

Pure mathematics, Dirichlet polynomials, Applied Mathematics, General Mathematics, Mathematical analysis, Banach space, Dirichlet L-function, Dirichlet's energy, Dirichlet eta function, Class number formula, symbols.namesake, Dirichlet kernel, Banach spaces, Dirichlet's principle, symbols, Vector valued, Dirichlet series, MATEMATICA APLICADA, Mathematics

Abstract

[EN] Recent results on Dirichlet series Sigma(n) a(n) 1/n(s), s is an element of C, with coefficients a(n) in an infinite dimensional Banach space X show that the maximal width of uniform but not absolute convergence coincides for Dirichlet series and for m-homogeneous Dirichlet polynomials. But a classical non-trivial fact fue to Bohnenblust and Hille shows that if X is one dimensional, this maximal width heavily depends on the degree m of the Dirichlet polynomials. We carefully analyze this phenomenon, in particular in the setting of l(p)-spaces., Both authors were supported by the MEC Project MTM2008-03211 The second author was partially supported by grants PR2007 0384 (MEC) and UPV PAID 00-07

Published

2011

49. Multilinear holder-type inequalities on lorentz sequence spaces

Author

Verónica Dimant, Pablo Sevilla-Peris, and Daniel Carando

Subjects

Multilinear map, Inequality, General Mathematics, media_common.quotation_subject, Linear operators, Library science, Multilinear mapping, Sequence spaces, Holder inequality, Algebra, Pict (programming language), MATEMATICA APLICADA, computer, media_common, computer.programming_language, Mathematics

Abstract

[EN] We establish Holder-type inequalities for Lorentz sequence spaces and their duals. In order to achieve these and some related inequalities, we study diagonal multilinear forms in general sequence spaces, and obtain estimates for their norms. We also consider norms of multilinear forms in different Banach multilinear ideals., We would like to thank Silvia Lassalle and Andreas Defant for helpful conversations and suggestions that improved the final shape of the paper. We would also like to thank the referee for her/his valuable suggestions. Most of the work in this axticle was performed while the third-named author was visiting the Departments of Mathematics at Universidad de Buenos Aires and Universidad de San Andres during the summer/winter of 2006. He wishes to thank all the people in and outside both Departments that made that such a delightful time. The first-named author was partially supported by ANPCyT PICT 05 17-33042, UBACyT Grant X038 and ANPCyT PICT 06 00587. The second-named author was partially supported by ANPCyT PICT 05 17-33042. The third-named author was supported by the MEC Project MTM2008-03211 and paxtially by grants GV-AEST06/092 and UPV-PAID-00-06.

Published

2009

50. Spectra of weighted algebras of holomorphic functions

Author

Pablo Sevilla-Peris and Daniel Carando

Subjects

Pure mathematics, Polynomial, Mathematics::Functional Analysis, Mathematics - Complex Variables, General Mathematics, Spectrum (functional analysis), Holomorphic function, Structure (category theory), Banach space, Type (model theory), 46G25, 46A45, Functional Analysis (math.FA), Mathematics - Functional Analysis, FOS: Mathematics, Homomorphism, Complex Variables (math.CV), MATEMATICA APLICADA, Weighted space, Mathematics

Abstract

[EN] We consider weighted algebras of holomorphic functions on a Banach space. We determine conditions on a family of weights that assure that the corresponding weighted space is an algebra or has polynomial Schauder decompositions. We study the spectra of weighted algebras and endow them with an analytic structure. We also deal with composition operators and algebra homomorphisms, in particular to investigate how their induced mappings act on the analytic structure of the spectrum. Moreover, a Banach¿Stone type question is addressed., The rst author was supported by PIP 5272, UBACyT X108, PICT 05-33042 and PICT 06-00587. yThe second author was supported by the MECD Project MTM2005-08210

Published

2008