Generalized Henstock integrals in the theory of series in multiplicative systems

Francesco Tulone; null Tulone; Valentin Skvortsov

Generalized Henstock integrals in the theory of series in multiplicative systems

Francesco Tulone, Tulone, Valentin Skvortsov

Matematica e Informatica

Risultato della ricerca: Article › peer review

5 Citazioni (Scopus)

Abstract

Properties of a Henstock type integral defined by means of a differential basis generated by P-adic paths ae studied. It is proved that this integral solves the problem of coefficients reconstruction by using generalized Fourier formulas for a series over multiplivative systems.

Lingua originale	English
pagine (da-a)	7-11
Numero di pagine	5
Rivista	VESTNIK MOSKOVSKOGO UNIVERSITETA SERIYA 1 MATEMATIKA MEKHANIKA
Volume	78, no. 2
Stato di pubblicazione	Published - 2004

All Science Journal Classification (ASJC) codes

Computational Mechanics
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Mechanics of Materials

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title = "Generalized Henstock integrals in the theory of series in multiplicative systems",

abstract = "Properties of a Henstock type integral defined by means of a differential basis generated by P-adic paths ae studied. It is proved that this integral solves the problem of coefficients reconstruction by using generalized Fourier formulas for a series over multiplivative systems.",

author = "Francesco Tulone and Tulone and Valentin Skvortsov",

year = "2004",

language = "English",

volume = "78, no. 2",

pages = "7--11",

journal = "Vestnik Moskovskogo Universiteta. Ser. 1 Matematika Mekhanika",

issn = "0579-9368",

publisher = "Izdatel'stvo Moskovskogo Gosudarstvennogo Universiteta im.M.V.Lomonosova/Publishing House of Moscow State University",

}

TY - JOUR

T1 - Generalized Henstock integrals in the theory of series in multiplicative systems

AU - Tulone, Francesco

AU - Tulone, null

AU - Skvortsov, Valentin

PY - 2004

Y1 - 2004

N2 - Properties of a Henstock type integral defined by means of a differential basis generated by P-adic paths ae studied. It is proved that this integral solves the problem of coefficients reconstruction by using generalized Fourier formulas for a series over multiplivative systems.

AB - Properties of a Henstock type integral defined by means of a differential basis generated by P-adic paths ae studied. It is proved that this integral solves the problem of coefficients reconstruction by using generalized Fourier formulas for a series over multiplivative systems.

UR - http://hdl.handle.net/10447/17520

M3 - Article

VL - 78, no. 2

SP - 7

EP - 11

JO - Vestnik Moskovskogo Universiteta. Ser. 1 Matematika Mekhanika

JF - Vestnik Moskovskogo Universiteta. Ser. 1 Matematika Mekhanika

SN - 0579-9368

ER -