Search results for "holomorph"

showing 10 items of 111 documents

Infinite Dimensional Holomorphy

2019

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…

Pure mathematicsMathematics::Complex VariablesHomogeneous polynomialBanach spaceHolomorphic functionDifferentiable functionHartogs' theoremInfinite-dimensional holomorphyMathematics::Symplectic GeometryCauchy's integral formulaAnalytic functionMathematics
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Kodaira dimension of holomorphic singular foliations

2000

We introduce numerical invariants of holomorphic singular foliations under bimeromorphic transformations of surfaces. The basic invariant is a foliated version of the Kodaira dimension of compact complex manifolds.

Pure mathematicsMathematics::Dynamical SystemsMathematics::Algebraic GeometryMathematics::Complex VariablesGeneral MathematicsMathematical analysisHolomorphic functionKodaira dimensionMathematics::Differential GeometryInvariant (mathematics)Mathematics::Symplectic GeometryMathematicsBoletim da Sociedade Brasileira de Matem�tica
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Holomorphic Functions on Polydiscs

2019

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 …

Pure mathematicsMonomialsymbols.namesakeHomogeneous polynomialEntire functionHolomorphic functionTaylor seriessymbolsDifferentiable functionCauchy's integral formulaAnalytic functionMathematics
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Nonradial Hormander algebras of several variables and convolution operators

2001

A characterization of the closed principal ideals in nonradial Hormander algebras of holomorphic functions of several variables in terms of the behaviour of the generator is obtained. This result is applied to study the range of convolution operators and ultradifferential operators on spaces of quasianalytic functions of Beurling type. Contrary to what is known to happen in the case of non-quasianalytic functions, an ultradistribution on a space of quasianalytic functions is constructed such that the range of the operator does not contain the real analytic functions. Let u, v : R → R be continuous, non-negative and even functions which are increasing on the positive real numbers. We assume …

Pure mathematicsOperator (computer programming)Applied MathematicsGeneral MathematicsZero (complex analysis)Holomorphic functionEven and odd functionsConvolution powerQuotientMathematicsAnalytic functionConvolution
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Frobenius polynomials for Calabi–Yau equations

2008

We describe a variation of Dwork’ s unit-root method to determine the degree 4 Frobenius polynomial for members of a 1-modulus Calabi–Yau family over P1 in terms of the holomorphic period near a point of maximal unipotent monodromy. The method is illustrated on a couple of examples from the list [3]. For singular points, we find that the Frobenius polynomial splits in a product of two linear factors and a quadratic part 1− apT + p3T 2. We identify weight 4 modular forms which reproduce the ap as Fourier coefficients.

Pure mathematicsPolynomialAlgebra and Number TheoryModular formHolomorphic functionGeneral Physics and AstronomyUnipotentMathematics::Algebraic GeometryQuadratic equationMonodromyCalabi–Yau manifoldFourier seriesMathematical PhysicsMathematicsCommunications in Number Theory and Physics
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Hurwitz spaces of triple coverings of elliptic curves and moduli spaces of abelian threefolds

2002

We prove that the moduli spaces A_3(D) of polarized abelian threefolds with polarizations of types D=(1,1,2), (1,2,2), (1,1,3) or (1,3,3) are unirational. The result is based on the study of families of simple coverings of elliptic curves of degree 2 or 3 and on the study of the corresponding period mappings associated with holomorphic differentials with trace 0. In particular we prove the unirationality of the Hurwitz space H_{3,A}(Y) which parameterizes simply branched triple coverings of an elliptic curve Y with determinants of the Tschirnhausen modules isomorphic to A^{-1}.

Pure mathematicsTrace (linear algebra)Degree (graph theory)Hurwitz spaces Abelian threefolds Prym varieties moduli unirationalityApplied MathematicsHolomorphic functionSpace (mathematics)Moduli spaceElliptic curveMathematics - Algebraic GeometryMathematics::Algebraic GeometrySimple (abstract algebra)14K10 (Primary) 14H30 14D07 (Secondary)FOS: MathematicsAbelian groupAlgebraic Geometry (math.AG)Mathematics
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Analytic Bergman operators in the semiclassical limit

2018

Transposing the Berezin quantization into the setting of analytic microlocal analysis, we construct approximate semiclassical Bergman projections on weighted $L^2$ spaces with analytic weights, and show that their kernel functions admit an asymptotic expansion in the class of analytic symbols. As a corollary, we obtain new estimates for asymptotic expansions of the Bergman kernel on $\mathbb{C}^n$ and for high powers of ample holomorphic line bundles over compact complex manifolds.

Pure mathematicsadjoint operatorsMicrolocal analysis32A2501 natural sciences[MATH.MATH-MP]Mathematics [math]/Mathematical Physics [math-ph]Limit (mathematics)Bergman projectionComplex Variables (math.CV)[MATH]Mathematics [math]Mathematics::Symplectic GeometryMathematical PhysicsBergman kernelMathematicsasymptotic expansionweighted L2-estimates58J40[MATH.MATH-CV]Mathematics [math]/Complex Variables [math.CV]Mathematical Physics (math-ph)16. Peace & justiceFunctional Analysis (math.FA)Mathematics - Functional Analysisasymptoticstheoremkernelanalytic pseudodifferential operator010307 mathematical physicsAsymptotic expansion47B35classical limitAnalysis of PDEs (math.AP)Toeplitz operatorGeneral Mathematics70H15Holomorphic functionFOS: Physical sciencesSemiclassical physicsKähler manifold[MATH.MATH-FA]Mathematics [math]/Functional Analysis [math.FA]analytic symbolsMathematics - Analysis of PDEskahler-metrics0103 physical sciencesFOS: Mathematics[MATH.MATH-AP]Mathematics [math]/Analysis of PDEs [math.AP]0101 mathematicsMathematics - Complex VariablesMathematics::Complex Variables010102 general mathematics32W25space35A27Kähler manifoldmicrolocal analysisToeplitz operatorquantizationsemiclassical analysis
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A closed formula for the evaluation of foams

2020

International audience; We give a purely combinatorial formula for evaluating closed, decorated foams. Our evaluation gives an integral polynomial and is directly connected to an integral, equivariant version of colored Khovanov-Rozansky link homology categorifying the sl(N) link polynomial. We also provide connections to the equivariant cohomology rings of partial flag varieties.

Pure mathematicscoherent sheaveskhovanov-rozansky homology01 natural sciencesMathematics::Algebraic Topologylink homologiesMathematics::K-Theory and HomologyMathematics::Quantum Algebra[MATH.MATH-GT]Mathematics [math]/Geometric Topology [math.GT]0103 physical sciences[MATH]Mathematics [math]010306 general physicsMathematics::Symplectic GeometryMathematical PhysicsMathematicswebsmodel010308 nuclear & particles physicsmodulesmatrix factorizationscategoriesFoamsMathematics::Geometric TopologyTQFTknot floer homologyholomorphic disksGeometry and Topologyinvariantstangle
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Removable sets for intrinsic metric and for holomorphic functions

2019

We study the subsets of metric spaces that are negligible for the infimal length of connecting curves; such sets are called metrically removable. In particular, we show that every totally disconnected set with finite Hausdorff measure of codimension 1 is metrically removable, which answers a question raised by Hakobyan and Herron. The metrically removable sets are shown to be related to other classes of "thin" sets that appeared in the literature. They are also related to the removability problems for classes of holomorphic functions with restrictions on the derivative.

Pure mathematicsintrinsic metricsGeneral MathematicsHolomorphic function01 natural sciencesIntrinsic metricSet (abstract data type)Mathematics - Metric GeometryTotally disconnected spaceholomorphic functionsFOS: MathematicsHausdorff measure0101 mathematicsComplex Variables (math.CV)MathematicsPartial differential equationmatematiikkaMathematics - Complex Variables010102 general mathematicsMetric Geometry (math.MG)Codimensionmetriset avaruudet010101 applied mathematicsMetric space28A78 (Primary) 26A16 30C62 30H05 49Q15 51F99 (Secondary)Analysis
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Functions of One Variable

2019

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-tange…

Pure mathematicssymbols.namesakeSubharmonic functionBounded functionBanach spaceHolomorphic functionsymbolsAlmost everywhereTorusHardy–Littlewood maximal functionHardy spaceMathematics
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