Measure, integration and elements of harmonic analysis on generalized loop spaces

Fesenko, Ivan

doi:10.1090/trans2/219/05

Cited by 15 publications

(31 citation statements)

References 16 publications

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“…The paper can be read independently of other related works, in particular in two-dimensional adelic analysis [2,3,5,6], and that the paper is organized as self-contained one as possible.…”

Section: Then All Poles Ofmentioning

confidence: 99%

“…Both n E (s) ±1 are meromorphic on C, and are holomorphic on (s) > 1. Recently a new approach to ζ E (s) was proposed by I. Fesenko in his series of works [2,3,6] (see also the survey article [5]). His proposal is treating zeta functions ζ E (s) directly without through L-functions by establishing the theory of "two-dimensional" zeta integrals defined for functions on two-dimensional adelic objects attached to arithmetic elliptic surfaces.…”

Section: Introductionmentioning

confidence: 99%

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Positivity of certain functions associated with analysis on elliptic surfaces

Suzuki

2011

Journal of Number Theory

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Available online xxxx Communicated by Ph. Michel MSC: 11G40 19F27 11M41 Keywords: Hasse-Weil L-functions Two-dimensional adelic analysis Riemann hypothesisIn this paper, we study functions of one variable that are called boundary terms of two-dimensional zeta integrals established in recent works of Ivan Fesenko's two-dimensional adelic analysis attached to arithmetic elliptic surfaces. It is known that the positivity of the fourth log derivatives of boundary terms around the origin is a sufficient condition for the Riemann hypothesis of Hasse-Weil L-functions of elliptic curves. We show that such positivity is also a necessary condition under some reasonable technical assumptions.

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“…The paper can be read independently of other related works, in particular in two-dimensional adelic analysis [2,3,5,6], and that the paper is organized as self-contained one as possible.…”

Section: Then All Poles Ofmentioning

confidence: 99%

Section: Introductionmentioning

confidence: 99%

Positivity of certain functions associated with analysis on elliptic surfaces

Suzuki

2011

Journal of Number Theory

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“…The key ingredient, which has not been available until recently, is the theory of translation invariant measure and integration on higher dimensional local fields, developed in [11], [12]. To introduce the zeta integral we first construct the theory of measure and integration on new adelic objects.…”

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confidence: 99%

“…Prerequisites for this work are the one-dimensional theory [57], [24] and the higher dimensional, local theory [11], [12]. A closely related text which explains the main ideas, methods, constructions, and directions of applications and which is relatively free from technical details is [14].…”

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confidence: 99%

“…The sections form rather natural divisions of the material of the paper and they are of varying length; such a simple marking of the text aims to simplify its reading. The two-dimensional theory of [11] was extended to higher dimensional local fields in [12], which also contains a discussion of the links between the integration on higher local fields and the Feynman path integral. For an alternative approach to the measure, integration and zeta integrals on valuation fields whose residue field is a local field see [39]; its method uses the lifting from the residue level in a systematic way and is related to section 13 of [11].…”

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confidence: 99%

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Analysis on arithmetic schemes. II

Fesenko¹

2010

J. K-Theory

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Kak qislo v ume, na peske ostavl sled, okean gromozdits vo t me, milliony let mertvo i zyb ba ka wepku. I esli rezko xagnut s debarkadera vbok, vovne, budex dolgo padat , ruki po xvam; no ne vosposleduet vspleska. J. Brodsky AbstractWe construct adelic objects for rank two integral structures on arithmetic surfaces and develop measure and integration theory, as well as elements of harmonic analysis. Using the topological Milnor K 2 -delic and K 1 K 1 -delic objects associated to an arithmetic surface, an adelic zeta integral is defined. Its unramified version is closely related to the square of the zeta function of the surface. For a proper regular model of an elliptic curve over a global field, a two-dimensional version of the theory of Tate and Iwasawa is derived. Using adelic analytic duality and a two-dimensional theta formula, the study of the zeta integral is reduced to the study of a boundary integral term. The work includes first applications to three fundamental properties of the zeta function: its meromorphic continuation and functional equation and a hypothesis on its mean periodicity; the location of its poles and a hypothesis on the permanence of the sign of the fourth logarithmic derivative of a boundary function; and its pole at the central point where the boundary integral explicitly relates the analytic and arithmetic ranks.Key Words: topological Milnor K-groups, explicit two-dimensional class field theory, adeles for arithmetic schemes, translation invariant integration and harmonic analysis, two-dimensional adelic analysis, zeta functions, zeta integral, analytic duality on arithmetic surfaces, boundary term, elliptic curves over global fields.

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Model theory guidance in number theory?

Fesenko¹

2008

Model Theory With Applications to Algebra and Analysis

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Measure, integration and elements of harmonic analysis on generalized loop spaces

Cited by 15 publications

References 16 publications

Positivity of certain functions associated with analysis on elliptic surfaces

Positivity of certain functions associated with analysis on elliptic surfaces

Analysis on arithmetic schemes. II

Model theory guidance in number theory?

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