Titlebook: Colloquium De Giorgi 2009; Umberto Zannier Conference proceedings 2012 Scuola Normale Superiore Pisa 2012

寬敞

Classical analysis and nilpotent Lie groups,groups and for a class of Riemannian manifolds closely related to a nilpotent Lie group structure. There are also some infinite dimensional analogs but I won’t go into that here. The analytic ideas are not so different from the classical Fourier transform and Fourier inversion theories in one real variable.

符合規(guī)定

Colloquium De Giorgi 2009978-88-7642-387-1Series ISSN 2239-1460 Series E-ISSN 2532-1668

ANIM

Erratum to: Blockverbindungen und Sperren,gebra .(.) and the Fourier-Stieltjes algebra .(.), which reflect the representation theory of the group. The question of whether these determine the group has been considered by many authors. Here we show that when 1 < . < ∞, the Figà-Talamanca-Herz algebras ..(.) determine the group ., at least if . is a connected Lie group.

formula

Oration

,Isomorphisms of the Figà-Talamanca-Herz algebras ,,(,) for connected Lie groups ,,gebra .(.) and the Fourier-Stieltjes algebra .(.), which reflect the representation theory of the group. The question of whether these determine the group has been considered by many authors. Here we show that when 1 < . < ∞, the Figà-Talamanca-Herz algebras ..(.) determine the group ., at least if

Atrium

Classical analysis and nilpotent Lie groups,groups and for a class of Riemannian manifolds closely related to a nilpotent Lie group structure. There are also some infinite dimensional analogs but I won’t go into that here. The analytic ideas are not so different from the classical Fourier transform and Fourier inversion theories in one real v

詢(xún)問(wèn)

,Leibniz’ conjecture, periods & motives, historical introduction to periods with the aim to demonstrate how a very nice and deep theory evolved during 3 centuries with three themes: numbers (Euler, Leibniz, Hermite, Lindemann, Siegel, Gelfond, Schneider, Baker), Hodge theory (Hodge, De Rham, Grothendieck, Griffiths, Deligne) and motives (

Popcorn

FLIRT

,Leibniz’ conjecture, periods & motives,Deligne, Nori). One of our main intends is to discuss then how to possibly bring these themes together and to show how modern transcendence theory can solve questions which arise at the interfaces between number theory, global analysis, algebraic geometry and arithmetic algebraic geometry.

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