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- Harmonic_Maass_form abstract "In mathematics, a weak Maass form is a smooth function f on the upper half plane, transforming like a modular form under the action of the modular group, being an eigenfunction of the corresponding hyperbolic Laplace operator, and having at most linear exponential growth at the cusps.If the eigenvalue of f under the Laplacian is zero, then f is called a harmonic weak Maass form, or briefly a harmonic Maass form.A weak Maass form which has actually moderate growth at the cusps is a classical Maass wave form.The Fourier expansions of harmonic Maass forms often encode interesting combinatorial, arithmetic, or geometric generating functions. Regularized theta lifts of harmonic Maass forms can be used to construct Arakelov Green functions for special divisors on orthogonal Shimura varieties.".
- Harmonic_Maass_form wikiPageExternalLink inhoud.htm.
- Harmonic_Maass_form wikiPageID "49619144".
- Harmonic_Maass_form wikiPageLength "9731".
- Harmonic_Maass_form wikiPageOutDegree "33".
- Harmonic_Maass_form wikiPageRevisionID "707890498".
- Harmonic_Maass_form wikiPageWikiLink Annals_of_Mathematics.
- Harmonic_Maass_form wikiPageWikiLink Category:Automorphic_forms.
- Harmonic_Maass_form wikiPageWikiLink Category:Modular_forms.
- Harmonic_Maass_form wikiPageWikiLink Complex_number.
- Harmonic_Maass_form wikiPageWikiLink Crelles_Journal.
- Harmonic_Maass_form wikiPageWikiLink Don_Zagier.
- Harmonic_Maass_form wikiPageWikiLink Duke_Mathematical_Journal.
- Harmonic_Maass_form wikiPageWikiLink Eigenfunction.
- Harmonic_Maass_form wikiPageWikiLink Eisenstein_series.
- Harmonic_Maass_form wikiPageWikiLink Elliptic_curve.
- Harmonic_Maass_form wikiPageWikiLink Felix_Klein.
- Harmonic_Maass_form wikiPageWikiLink Hans_Petersson.
- Harmonic_Maass_form wikiPageWikiLink Henri_Poincaré.
- Harmonic_Maass_form wikiPageWikiLink Hodge_dual.
- Harmonic_Maass_form wikiPageWikiLink Incomplete_gamma_function.
- Harmonic_Maass_form wikiPageWikiLink International_Mathematics_Research_Notices.
- Harmonic_Maass_form wikiPageWikiLink Laplace_operator.
- Harmonic_Maass_form wikiPageWikiLink Line_bundle.
- Harmonic_Maass_form wikiPageWikiLink Maass_wave_form.
- Harmonic_Maass_form wikiPageWikiLink Martin_Eichler.
- Harmonic_Maass_form wikiPageWikiLink Mathematics.
- Harmonic_Maass_form wikiPageWikiLink Mathematische_Annalen.
- Harmonic_Maass_form wikiPageWikiLink Mock_modular_form.
- Harmonic_Maass_form wikiPageWikiLink Modular_form.
- Harmonic_Maass_form wikiPageWikiLink Modular_group.
- Harmonic_Maass_form wikiPageWikiLink Nick_Katz.
- Harmonic_Maass_form wikiPageWikiLink Sander_P._Zwegers.
- Harmonic_Maass_form wikiPageWikiLink Shimura_variety.
- Harmonic_Maass_form wikiPageWikiLink Suren_Arakelov.
- Harmonic_Maass_form wikiPageWikiLink Upper_half-plane.
- Harmonic_Maass_form wikiPageWikiLink Weierstrass_functions.
- Harmonic_Maass_form wikiPageWikiLink Whittaker_function.
- Harmonic_Maass_form wikiPageWikiLinkText "Harmonic Maass form".
- Harmonic_Maass_form wikiPageWikiLinkText "harmonic weak Maass form".
- Harmonic_Maass_form wikiPageWikiLinkText "weak Maass form".
- Harmonic_Maass_form wikiPageUsesTemplate Template:=.
- Harmonic_Maass_form wikiPageUsesTemplate Template:Citation.
- Harmonic_Maass_form wikiPageUsesTemplate Template:Harv.
- Harmonic_Maass_form wikiPageUsesTemplate Template:Math.
- Harmonic_Maass_form wikiPageUsesTemplate Template:Mvar.
- Harmonic_Maass_form subject Category:Automorphic_forms.
- Harmonic_Maass_form subject Category:Modular_forms.
- Harmonic_Maass_form hypernym Function.
- Harmonic_Maass_form type Disease.
- Harmonic_Maass_form comment "In mathematics, a weak Maass form is a smooth function f on the upper half plane, transforming like a modular form under the action of the modular group, being an eigenfunction of the corresponding hyperbolic Laplace operator, and having at most linear exponential growth at the cusps.If the eigenvalue of f under the Laplacian is zero, then f is called a harmonic weak Maass form, or briefly a harmonic Maass form.A weak Maass form which has actually moderate growth at the cusps is a classical Maass wave form.The Fourier expansions of harmonic Maass forms often encode interesting combinatorial, arithmetic, or geometric generating functions. ".
- Harmonic_Maass_form label "Harmonic Maass form".
- Harmonic_Maass_form wasDerivedFrom Harmonic_Maass_form?oldid=707890498.
- Harmonic_Maass_form isPrimaryTopicOf Harmonic_Maass_form.