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  • 51.
    Hedenmalm, Håkan
    et al.
    KTH, School of Engineering Sciences (SCI), Mathematics (Dept.), Mathematics (Div.).
    Aleman, Alexandru
    Department of Mathematics, Lund University.
    Richter, Stefan
    Department of Mathematics, University of Tennessee, Knoxville, USA.
    Recent progress and open problems in the Bergman space2005In: Quadrature domains and their applications: the Harold S. Shapiro anniversary volume / [ed] Peter Ebenfelt, Basel: Birkhäuser Verlag, 2005, p. 27-59Chapter in book (Refereed)
  • 52.
    Hedenmalm, Håkan
    et al.
    KTH, Superseded Departments, Mathematics.
    Benyamini, Yoav
    Ben Natan, Yaacov
    Weit, Yitzhak
    Wiener's tauberian theorem for spherical functions on the automorphism group of the unit disk1996In: Arkiv för matematik, ISSN 0004-2080, E-ISSN 1871-2487, Vol. 34, p. 199-224Article in journal (Refereed)
  • 53.
    Hedenmalm, Håkan
    et al.
    KTH, Superseded Departments, Mathematics.
    Benyamini, Yoav
    Ben Natan, Yaacov
    Weit, Yitzhak
    Wiener's tauberian theorem in L^1(G//K) and harmonic functions in the unit disk1995In: Bulletin of the American Mathematical Society, ISSN 0273-0979, E-ISSN 1088-9485, Vol. 32, p. 43-49Article in journal (Refereed)
  • 54.
    Hedenmalm, Håkan
    et al.
    KTH, Superseded Departments, Mathematics.
    Borichev, Alexander
    Approximation in a class of Banach algebras of quasianalytically smooth analytic functions1993In: Journal of Functional Analysis, ISSN 0022-1236, E-ISSN 1096-0783, Vol. 115, p. 359-390Article in journal (Refereed)
  • 55.
    Hedenmalm, Håkan
    et al.
    KTH, Superseded Departments, Mathematics.
    Borichev, Alexander
    Completeness of translates in weighted spaces on the half-line1995In: Acta Mathematica, ISSN 0001-5962, E-ISSN 1871-2509, Vol. 174, p. 1-84Article in journal (Refereed)
  • 56.
    Hedenmalm, Håkan
    et al.
    KTH, Superseded Departments, Mathematics.
    Borichev, Alexander
    Harmonic functions of maximal growth: invertibility and cyclicity in the Bergman spaces1997In: Journal of The American Mathematical Society, ISSN 0894-0347, E-ISSN 1088-6834, Vol. 10, p. 761-796Article in journal (Refereed)
  • 57.
    Hedenmalm, Håkan
    et al.
    KTH, School of Engineering Sciences (SCI), Mathematics (Dept.), Mathematics (Div.).
    Borichev, AlexanderLaboratoire d'Analyse, Universite de Provence, Marseille.Zhu, KeheDepartment of Mathematics, SUNY Albany, Albany, NY.
    Bergman spaces and related topics in complex analysis. A conference in honor of Boris Korenblum's 80th birthday.2006Conference proceedings (editor) (Refereed)
  • 58.
    Hedenmalm, Håkan
    et al.
    KTH, Superseded Departments, Mathematics.
    Ehrsson, H.
    Andersson, A.
    Elfsson, B.
    Determination of the acid dissociation constant for cis-diamineaquachloroplatinum(II)-ion. A hydrolysis product of cisplatin1994In: Journal of Pharmaceutical Sciences, ISSN 0022-3549, E-ISSN 1520-6017, Vol. 83, p. 859-862Article in journal (Refereed)
  • 59. Hedenmalm, Håkan
    et al.
    Jakobsson, S.
    Shimorin, Serguei
    KTH, Superseded Departments, Mathematics.
    A biharmonic maximum principle for hyperbolic surfaces2002In: Journal für die Reine und Angewandte Mathematik, ISSN 0075-4102, E-ISSN 1435-5345, Vol. 550, p. 25-75Article in journal (Refereed)
  • 60.
    Hedenmalm, Håkan
    et al.
    KTH, Superseded Departments, Mathematics.
    Jakobsson, Stefan
    Shimorin, Sergei
    A maximum principle a la Hadamard for biharmonic operators with applications to the Bergman spaces1999In: Comptes rendus de l'Académie des sciences. Série 1, Mathématique, ISSN 0764-4442, E-ISSN 1778-3577, Vol. 328, p. 973-978Article in journal (Refereed)
  • 61.
    Hedenmalm, Håkan
    et al.
    KTH, School of Engineering Sciences (SCI), Mathematics (Dept.), Mathematics (Div.).
    Kayumov, Ilgiz
    On the Makarov law of the iterated logarithm2007In: Proceedings of the American Mathematical Society, ISSN 0002-9939, E-ISSN 1088-6826, Vol. 135, no 7, p. 2235-2248Article in journal (Refereed)
    Abstract [en]

    We obtain considerable improvement of Makarov's estimate of the boundary behavior of a general conformal mapping from the unit disk to a simply connected domain in the complex plane. We apply the result to improve Makarov's comparison of harmonic measure with Hausdorff measure on simply connected domains.

  • 62.
    Hedenmalm, Håkan
    et al.
    KTH, Superseded Departments, Mathematics.
    Korenblum, Boris
    Zhu, Kehe
    Beurling-type invariant subspaces of the Bergman spaces1996In: Journal of the London Mathematical Society, ISSN 0024-6107, E-ISSN 1469-7750, Vol. 53, p. 601-614Article in journal (Refereed)
  • 63.
    Hedenmalm, Håkan
    et al.
    KTH, Superseded Departments, Mathematics.
    Lindqvist, Peter
    Seip, Kristian
    A Hilbert space of Dirichlet series and systems of dilated functions in L^2(0,1)1997In: Duke mathematical journal, ISSN 0012-7094, E-ISSN 1547-7398, Vol. 86, p. 1-37Article in journal (Refereed)
  • 64.
    Hedenmalm, Håkan
    et al.
    KTH, Superseded Departments, Mathematics.
    Lindqvist, Peter
    Seip, Kristian
    Addendum to "A Hilbert space of Dirichlet series and systems of dilated functions in L^2(0,1)1999In: Duke mathematical journal, ISSN 0012-7094, E-ISSN 1547-7398, Vol. 99, p. 175-178Article in journal (Refereed)
  • 65.
    Hedenmalm, Håkan
    et al.
    KTH, School of Engineering Sciences (SCI), Mathematics (Dept.), Mathematics (Div.).
    Makarov, Nikolai
    Coulomb gas ensembles and Laplacian growth2013In: Proceedings of the London Mathematical Society, ISSN 0024-6115, E-ISSN 1460-244X, Vol. 106, no 4, p. 859-907Article in journal (Refereed)
    Abstract [en]

    We consider weight functions Q : C -> R that are locally in a suitable Sobolev space and impose a logarithmic growth condition from below. We use Q as a confining potential in the model of one-component plasma (2-dimensional Coulomb gas) and study the configuration of the electron cloud as the number n of electrons tends to infinity, while the confining potential is rescaled: we use mQ in place of Q and let m tend to infinity as well. We show that if m and n tend to infinity in a proportional fashion, with n/m -> t, where 0 < t <+infinity is fixed, then the electrons accumulate on a compact set S-t, which we call the droplet. The set S-t can be obtained as the coincidence set of an obstacle problem, if we remove a small set (the shallow points). Moreover, on the droplet S-t, the density of electrons is asymptotically delta Q. The growth of the droplets S-t as t increases is known as the Laplacian growth. It is well known that Laplacian growth is unstable. To analyse this feature, we introduce the notion of a local droplet, which involves removing part of the obstacle away from the set S-t. The local droplets are no longer uniquely determined by the time parameter t, but at least they may be partially ordered. We show that the growth of the local droplets may be terminated in a maximal local droplet or by the droplets' growing to infinity in some direction ('fingering').

  • 66.
    Hedenmalm, Håkan
    et al.
    KTH, School of Engineering Sciences (SCI), Mathematics (Dept.), Mathematics (Div.).
    Montes-Rodriguez, Alfonso
    Universidad de Sevilla.
    Heisenberg uniqueness pairs and the Klein-Gordon equation2011In: Annals of Mathematics, ISSN 0003-486X, E-ISSN 1939-8980, Vol. 173, no 3, p. 1507-1527Article in journal (Refereed)
    Abstract [en]

    A Heisenberg uniqueness pair (HUP) is a pair (Γ,Λ), where Γ is a curve in the plane and Λ is a set in the plane, with the following property: any finite Borel measure μ in the plane supported on Γ, which is absolutely continuous with respect to arc length, and whose Fourier transform μˆ vanishes on Λ, must automatically be the zero measure. We prove that when Γ is the hyperbola x1x2=1 %, and Λ is the lattice-cross Λ=(αZ×{0})∪({0}×βZ), where α,β are positive reals, then (Γ,Λ) is an HUP if and only if αβ≤1; in this situation, the Fourier transform μˆ of the measure solves the one-dimensional Klein-Gordon equation. Phrased differently, we show that eπiαnt,eπiβn/t,n∈Z, span a weak-star dense subspace in L∞(R) if and only if αβ≤1. In order to prove this theorem, some elements of linear fractional theory and ergodic theory are needed, such as the Birkhoff Ergodic Theorem. An idea parallel to the one exploited by Makarov and Poltoratski (in the context of model subspaces) is also needed. As a consequence, we solve a problem on the density of algebras generated by two inner functions raised by Matheson and Stessin.

  • 67.
    Hedenmalm, Håkan
    et al.
    KTH, School of Engineering Sciences (SCI), Mathematics (Dept.), Mathematics (Div.).
    Nieminen, Pekka J.
    The Gaussian free field and Hadamard's variational formula2014In: Probability theory and related fields, ISSN 0178-8051, E-ISSN 1432-2064, Vol. 159, no 1-2, p. 61-73Article in journal (Refereed)
    Abstract [en]

    We relate the Gaussian free field on a planar domain to the variational formula of Hadamard which explains the change of the Green function under a perturbation of the domain. This is accomplished by means of a natural integral operator-called the Hadamard operator-associated with a given flow of growing domains.

  • 68.
    Hedenmalm, Håkan
    et al.
    KTH, School of Engineering Sciences (SCI), Mathematics (Dept.), Mathematics (Div.).
    Olofsson, A.
    Hele-Shaw on weakly hyperbolic surfaces2005In: Indiana University Mathematics Journal, ISSN 0022-2518, E-ISSN 1943-5258, Vol. 54, no 4, p. 1161-1180Article in journal (Refereed)
    Abstract [en]

    We consider the Hele-Shaw flow that arises from injection of two-dimensional fluid into a point of a curved surface. The resulting fluid domains are more or less determined implicitly by a mean value property for harmonic functions. We improve on the results of Hedenmalm and Shimorin [8] and obtain essentially the same conclusions while imposing a weaker curvature condition on the surface. Incidentally, the curvature condition is the same as the one that appears in Hedenmalm and Perdomo's paper [7], where the problem of finding smooth area minimizing surfaces for a given curvature form under a natural normalizing condition was considered. Probably there are deep reasons behind this coincidence.

  • 69.
    Hedenmalm, Håkan
    et al.
    KTH, Superseded Departments, Mathematics.
    Perdomo, Y. G.
    Mean value surfaces with prescribed curvature form2004In: Journal des Mathématiques Pures et Appliquées, ISSN 0021-7824, E-ISSN 1776-3371, Vol. 83, no 9, p. 1075-1107Article in journal (Refereed)
    Abstract [en]

    The Gaussian curvature of a two-dimensional Riemannian manifold is uniquely determined by the choice of the metric. The formulas for computing the curvature in terms of components of the metric, in isothermal coordinates, involve the Laplacian operator and therefore, the problem of finding a Riemannian metric for a given curvature form may be viewed as a potential theory problem. This problem has, generally speaking, a multitude of solutions. To specify the solution uniquely, we ask that the metric have the mean value property for harmonic functions with respect to some given point. This means that we assume that the surface is simply connected and that it has a smooth boundary. In terms of the so-called metric potential, we are looking for a unique smooth solution to a nonlinear fourth order elliptic partial differential equation with second order Cauchy data given on the boundary. We find a simple condition on the curvature form which ensures that there exists a smooth mean value surface solution. It reads: the curvature form plus half the curvature form for the hyperbolic plane (with the same coordinates) should be less than or equal to 0. The same analysis leads to results on the question of whether the canonical divisors in weighted Bergman spaces over the unit disk have extraneous zeros. Numerical work suggests that the above condition on the curvature form is essentially sharp. Our problem is in spirit analogous to the classical Minkowski problem, where the sphere supplies the chart coordinates via the Gauss map.

  • 70. Hedenmalm, Håkan
    et al.
    Saksman, E.
    Carleson's convergence theorem for Dirichlet series2003In: Pacific Journal of Mathematics, ISSN 0030-8730, E-ISSN 1945-5844, Vol. 208, no 1, p. 85-109Article in journal (Refereed)
    Abstract [en]

    A Hilbert space of Dirichlet series is obtained by considering the Dirichlet series f(s) = Sigma(n=1)(infinity) a(n)n(-s) that satisfy Sigma(n=0)(infinity) \a(n)\(2) < +&INFIN;. These series converge in the half plane Re s > 1/2 and define a functions that are locally L-2 on the boundary Re s > 1/2. An analog of Carleson's celebrated convergence theorem is obtained: Each such Dirichlet series converges almost everywhere on the critical line Re s = 1/2. To each Dirichlet series of the above type corresponds a trigonometric series Sigma(n=1)(infinity) a(n)chi(n), where chi is a multiplicative character from the positive integers to the unit circle. The space of characters is naturally identified with the infinite-dimensional torus T-infinity, where each dimension comes from a a prime number. The second analog of Carleson's theorem reads: The above trigonometric series converges for almost all characters chi.

  • 71.
    Hedenmalm, Håkan
    et al.
    KTH, Superseded Departments, Mathematics.
    Shields, Allen
    Invariant subspaces in Banach spaces of analytic functions1990In: The Michigan mathematical journal, ISSN 0026-2285, E-ISSN 1945-2365, Vol. 37, p. 91-104Article in journal (Refereed)
  • 72. Hedenmalm, Håkan
    et al.
    Shimorin, Serguei
    KTH, Superseded Departments, Mathematics.
    Hele-Shaw flow on hyperbolic surfaces2002In: Journal des Mathématiques Pures et Appliquées, ISSN 0021-7824, E-ISSN 1776-3371, Vol. 81, no 3, p. 187-222Article in journal (Refereed)
    Abstract [en]

    Consider a complete simply connected hyperbolic surface. The classical Hadamard theorem asserts that at each point of the surface, the exponential mapping from the tangent plane to the surface defines a global diffeomorphism. This can be interpreted as a statement relating the metric flow on the tangent plane with that of the surface. We find an analogue of Hadamard's theorem with metric flow replaced by Hele-Shaw flow, which models the injection of (two-dimensional) fluid into the surface. The Hele-Shaw flow domains are characterized implicitly by a mean value property on harmonic functions.

  • 73.
    Hedenmalm, Håkan
    et al.
    KTH, School of Engineering Sciences (SCI), Mathematics (Dept.), Mathematics (Div.).
    Shimorin, Serguei
    KTH, School of Engineering Sciences (SCI), Mathematics (Dept.), Mathematics (Div.).
    On the universal integral means spectrum of conformal mappings near the origin2007In: Proceedings of the American Mathematical Society, ISSN 0002-9939, E-ISSN 1088-6826, Vol. 135, no 7, p. 2249-2255Article in journal (Refereed)
    Abstract [en]

    We improve the local estimate near the origin of the integral means spectrum for conformal mappings obtained in our paper from 2005. We also study some algebraic aspects of higher order forms associated with the given conformal mapping.

  • 74.
    Hedenmalm, Håkan
    et al.
    KTH, School of Engineering Sciences (SCI), Mathematics (Dept.), Mathematics (Div.).
    Shimorin, Serguei
    KTH, School of Engineering Sciences (SCI), Mathematics (Dept.), Mathematics (Div.).
    Weighted Bergman spaces and the integral means spectrum of conformal mappings2005In: Duke mathematical journal, ISSN 0012-7094, E-ISSN 1547-7398, Vol. 127, no 2, p. 341-393Article in journal (Refereed)
    Abstract [en]

    The classical theory of conformal mappings involves best possible pointwise estimates of the derivative, thus supplying a measure of the extremal expansion/contraction possible for a conformal mapping. It is natural to consider also the integral means of \phi'\(t) along circles \z\ = r, where phi is the conformal mapping in question and t is a real parameter (0 < r < 1 if phi is defined in the unit disk, while 1 < r < +infinity if phi is defined in the exterior disk). The extremal growth rate as r --> 1 of the integral means which follows from the classical pointwise estimates is by far too fast. Better estimates were found by Clunie, Makarov, Pommerenke, Bertilsson, Shimorin, and others. Here we introduce a new method-based on area-type estimates-which discards as little as possible of the information supplied by the area methods. The result is a considerable improvement in the estimates of the integral means spectrum known tip to this point.

  • 75.
    Hedenmalm, Håkan
    et al.
    KTH, School of Engineering Sciences (SCI), Mathematics (Dept.), Mathematics (Div.).
    Shimorin, Serguei
    KTH, School of Engineering Sciences (SCI), Mathematics (Dept.), Mathematics (Div.).
    Sola, Alan
    KTH, School of Engineering Sciences (SCI), Mathematics (Dept.), Mathematics (Div.).
    Norm expansion along a zero variety2008In: Journal of Functional Analysis, ISSN 0022-1236, E-ISSN 1096-0783, Vol. 254, p. 1601-1625Article in journal (Refereed)
    Abstract [en]

    The reproducing kernel function of a weighted Bergman space over domains in C-d is known explicitly in only a small number of instances. Here, we introduce a process of orthogonal norm expansion along a subvariety of (complex) codimension 1, which also leads to a series expansion of the reproducing kernel in terms of reproducing kernels defined on the subvariety. The problem of finding the reproducing kernel is thus reduced to the same kind of problem when one of the two entries is on the subvariety. A complete expansion of the reproducing kernel may be achieved in this manner. We carry this out in dimension d = 2 for certain classes of weighted Bergman spaces over the bidisk (with the diagonal z(1) = z(2) as subvariety) and the ball (with z(2) = 0 as subvariety), as well as for a weighted Bargmann-Fock space over C-2 (with the diagonal z(1) = z(2) as subvariety).

  • 76.
    Hedenmalm, Håkan
    et al.
    KTH, School of Engineering Sciences (SCI), Mathematics (Dept.), Mathematics (Div.).
    Shirokov, N. A.
    Keldysh-Lavrentiev counterexample and means of powers of a conformal mapping. 1. construction of a mapping2012In: Journal of Mathematical Sciences, ISSN 1072-3374, E-ISSN 1573-8795, Vol. 182, no 5, p. 724-726Article in journal (Refereed)
    Abstract [en]

    We construct a region with infinitely many cusps on its boundary such that it is possible to estimate the derivative of a conformal mapping of the units disk onto this region from below. We use some ideas taken from the construction of a famous Keldysh-Lavrentiev example. Bibliography: 2 titles.

  • 77.
    Hedenmalm, Håkan
    et al.
    KTH, School of Engineering Sciences (SCI), Mathematics (Dept.), Mathematics (Div.).
    Shirokov, Nikolai
    St-Petersburg State University.
    The Keldysh-Lavrientev counterexample and means of powers of the derivative of conformal mappings: 1. Construction of the mappings2011In: Zapiski nauchnykh seminarov POMI, ISSN 0373-2703, Vol. 389, p. 252-256Article in journal (Refereed)
  • 78.
    Hedenmalm, Håkan
    et al.
    KTH, School of Engineering Sciences (SCI), Mathematics (Dept.), Mathematics (Div.).
    Sola, Alan
    KTH, School of Engineering Sciences (SCI), Mathematics (Dept.), Mathematics (Div.).
    Spectral notions for conformal maps: a survey2008In: Computational methods in Function Theory, ISSN 1617-9447, E-ISSN 2195-3724, Vol. 8, no 2, p. 447-474Article in journal (Refereed)
    Abstract [en]

    The universal means spectrum of conformal mappingshas been studied extensively in recent years. In some situations,sharp results are available, in others, only upper and lower estimateshave been obtained so far. We review some of the classicalresults before discussing the recent work of Hedenmalm andShimorin on estimates of the universal means spectrum near theorigin. It is our ambition to explain how their method works andwhat its limitations are. We then move on to the recent studyof the universal means spectrum of bounded functions near thepoint two conducted by Baranov and Hedenmalm. A number ofopen problems related to these topics are pointed out together withsome auxilliary results which are interesting in their own right.

  • 79.
    Hedenmalm, Håkan
    et al.
    KTH, School of Engineering Sciences (SCI), Mathematics (Dept.), Mathematics (Div.). St Petersburg State Univ, Dept Math & Mech, 28 Univ Ski Pr, St Petersburg 198504, Russia..
    Stolyarov, D. M.
    Michigan State Univ, Dept Math, E Lansing, MI 48824 USA.;St Petersburg State Univ, PL Chebyshev Res Lab, St Petersburg, Russia.;Russian Acad Sci PDMI RAS, St Petersburg Dept Steklov Math Inst, Moscow, Russia..
    Vasyunin, V. I.
    St Petersburg State Univ, Dept Math & Mech, 28 Univ Ski Pr, St Petersburg 198504, Russia.;Russian Acad Sci PDMI RAS, St Petersburg Dept Steklov Math Inst, Moscow, Russia..
    Zatitskiy, P. B.
    St Petersburg State Univ, PL Chebyshev Res Lab, St Petersburg, Russia.;Russian Acad Sci PDMI RAS, St Petersburg Dept Steklov Math Inst, Moscow, Russia.;PSL Res Univ, Ecole Normale Super, CNRS, Dept Math & Applicat, Paris, France..
    Sharpening Holder's inequality2018In: Journal of Functional Analysis, ISSN 0022-1236, E-ISSN 1096-0783, Vol. 275, no 5, p. 1280-1319Article in journal (Refereed)
    Abstract [en]

    We strengthen Holder's inequality. The new family of sharp inequalities we obtain might be thought of as an analog of the Pythagorean theorem for the L-p-spaces. Our treatment of the subject matter is based on Bellman functions of four variables.

  • 80.
    Hedenmalm, Håkan
    et al.
    KTH, School of Engineering Sciences (SCI), Mathematics (Dept.), Mathematics (Div.).
    Wennman, Aron
    KTH, School of Engineering Sciences (SCI), Mathematics (Dept.), Mathematics (Div.).
    A critical topology for L^p Carleman classes with 0<p<12018In: Mathematische Annalen, ISSN 0025-5831, E-ISSN 1432-1807, Vol. 371, no 3-4, p. 1803-1844Article in journal (Refereed)
    Abstract [en]

    In this paper, we explore a sharp phase transition phenomenon which occurs for (Formula presented.)-Carleman classes with exponents (Formula presented.). These classes are defined as for the standard Carleman classes, only the (Formula presented.)-bounds are replaced by corresponding (Formula presented.)-bounds. We study the quasinorms (Formula presented.)for some weight sequence (Formula presented.) of positive real numbers, and consider as the corresponding (Formula presented.)-Carleman space the completion of a given collection of smooth test functions. To mirror the classical definition, we add the feature of dilatation invariance as well, and consider a larger soft-topology space, the (Formula presented.)-Carleman class. A particular degenerate instance is when (Formula presented.) for (Formula presented.) and (Formula presented.) for (Formula presented.). This would give the (Formula presented.)-Sobolev spaces, which were analyzed by Peetre, following an initial insight by Douady. Peetre found that these (Formula presented.)-Sobolev spaces are highly degenerate for (Formula presented.). Indeed, the canonical map (Formula presented.) fails to be injective, and there is even an isomorphism (Formula presented.)corresponding to the canonical map (Formula presented.) acting on the test functions. This means that e.g. the function and its derivative lose contact with each other (they “disconnect”). Here, we analyze this degeneracy for the more general (Formula presented.)-Carleman classes defined by a weight sequence (Formula presented.). If (Formula presented.) has some regularity properties, and if the given collection of test functions is what we call (Formula presented.)-tame, then we find that there is a sharp boundary, defined in terms of the weight (Formula presented.): on the one side, we get Douady–Peetre’s phenomenon of “disconnexion”, while on the other, the completion of the test functions consists of (Formula presented.)-smooth functions and the canonical map (Formula presented.) is correspondingly well-behaved in the completion. We also look at the more standard second phase transition, between non-quasianalyticity and quasianalyticity, in the (Formula presented.) setting, with (Formula presented.).

  • 81.
    Hedenmalm, Håkan
    et al.
    KTH, Superseded Departments, Mathematics.
    Zhu, Kehe
    On the failure of optimal factorization in certain weighted Bergman spaces1992In: Complex Variables, Theory & Application, ISSN 0278-1077, E-ISSN 1563-5066, Vol. 19, p. 165-176Article in journal (Refereed)
  • 82.
    Wennman, Aron
    et al.
    KTH, School of Engineering Sciences (SCI), Mathematics (Dept.), Mathematics (Div.).
    Hedenmalm, Håkan
    KTH, School of Engineering Sciences (SCI), Mathematics (Dept.), Mathematics (Div.).
    Off-spectral analysis of Bergman kernelsManuscript (preprint) (Other academic)
  • 83.
    Wennman, Aron
    et al.
    KTH, School of Engineering Sciences (SCI), Mathematics (Dept.), Mathematics (Div.).
    Hedenmalm, Håkan
    KTH, School of Engineering Sciences (SCI), Mathematics (Dept.), Mathematics (Div.).
    Planar orthogonal polynomials and boundary universality in the random normal matrix modelManuscript (preprint) (Other academic)
12 51 - 83 of 83
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