Uniformly continuous superposition operators in the space of functions of bounded n-dimensional Φ-variation

Bracamonte, M.; Ereú, J.; Giménez, J.; Merentes, N.

Artykuł - szczegóły

Tytuł artykułu

Uniformly continuous superposition operators in the space of functions of bounded n-dimensional Φ-variation

Autorzy

Bracamonte M. , Ereú J. , Giménez J. , Merentes N.

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http://www.degruyter.com/view/j/dema

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Abstrakty

We prove that if a superposition operator maps a subset of the space of all metric-vector-space-valued-functions of bounded n-dimensional Φ-variation into another such space, and is uniformly continuous, then the generating function of the operator is an affine function in the functional variable.

Słowa kluczowe

superposition operator bounded Φ-variation metric semigroup

operator superpozycji ograniczona Φ-zmiana metryka półgrupy

Wydawca

De Gruyter

Czasopismo

Demonstratio Mathematica

Rocznik

2014

Tom

Vol. 47, nr 1

Strony

56--68

Opis fizyczny

Bibliogr. 13 poz.

Twórcy

autor

Bracamonte M.

mireyabracamonte@ucla.edu.ve

Departamento De Matemáticas, Universidad Centroccidental Lisandro Alvarado Barquisimeto, Venezuela

autor

Ereú J.

jereu@ucla.edu.ve

Departamento De Matemáticas, Universidad Centroccidental Lisandro Alvarado Barquisimeto, Venezuela

autor

Giménez J.

jgimenez@ula.ve

Departamento De Matemáticas, Universidad De Los Andes Mérida, Venezuela

autor

Merentes N.

nmerucv@gmail.com

Escuela De Matemáticas, Universidad Central De Venezuela Caracas, Venezuela

Bibliografia

[1] J. Appell, P. P. Zabrejko, Nonlinear Superposition Operator, Cambridge University Press, New York, 1990.
[2] V. V. Chistyakov, Functions of several variables of finite variation and superposition operators, in: Real Analysis Exchange 26th Summer Symposium, Lexington, VA, USA, 2002, pp. 61–66.
[3] V. V. Chistyakov, A selection principle for mappings of bounded variation of several variables, in: Real Analysis Exchange 27th Summer Symposium, Opava, Czech Republic, 2003, pp. 217–222.
[4] V. V. Chistyakov, Y. Tretyachenko, Maps of several variables of finite total variation and Helly-type selection principles, J. Math. Anal. Appl. 370(2) (2010), 672–686.
[5] J. A. Clarkson, C. R. Adams, On definitions of bounded variation for functions of two variables, Trans. Amer. Math. Soc. 35 (1933), 824–854.
[6] T. H. Hildebrandt, Introduction to the Theory of Integration, Academic Press, New York and London, 1963.
[7] M. Kuczma, An Introduction to the Theory of Functional Equations and Inequalities, Polish Scientific Editors and Silesian University, Warszawa, Kraków, Katowice, 1985.
[8] K. Lichawski, J. Matkowski, J. Mi`s, Locally defined operators in the space of differentiable functions, Bull. Polish Acad. Sci. Math. 37 (1989), 315–125.
[9] J. Matkowski, Uniformly continuous superposition operators in the space of bounded variation functions, Math. Nachr. 283(7) (2010), 1060–1064.
[10] F. A. Talalyan, A multidimensional analogue of a theorem of F. Riesz, Sbornik: Mathematics 186(9) (1995), 1363–1374.
[11] G. Vitali, Sui gruppi di punti e sulle funzioni di variabili reali, Atti Accad. Sci. Torino 43 (1908), 75–92.
[12] M. Wróbel, Representation theorem for local operators in the space of continuous and monotone functions, J. Math. Anal. Appl. 372 (2010), 45–54.
[13] M. Wróbel, Locally defined operators in the Hölder spaces, Nonlinear Anal. 74 (2011), 317–323.

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Bibliografia

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