Functions of bounded (2,k)-variation in 2-normed spaces

Cure Arenas Jaffeth; Ferrer Sotelo Kandy; Ferrer Villar Osmin

doi:10.3934/math.20241175

AIMS Mathematics (Aug 2024)

Functions of bounded (2,k)-variation in 2-normed spaces

Cure Arenas Jaffeth ,
Ferrer Sotelo Kandy ,
Ferrer Villar Osmin

Affiliations

Cure Arenas Jaffeth: 1. Departament of Mathematics, University of Sucre, Cra. 28 # 5-267, Puerta Roja, Sincelejo, Sucre, Colombia
Ferrer Sotelo Kandy: 2. Facultad de Ingenierías y Arquitectura, Universidad Pontificia Bolivariana, Cra 6 # 97A-99 Barrio Mocari, Montería, Colombia
Ferrer Villar Osmin: 1. Departament of Mathematics, University of Sucre, Cra. 28 # 5-267, Puerta Roja, Sincelejo, Sucre, Colombia

DOI: https://doi.org/10.3934/math.20241175
Journal volume & issue: Vol. 9, no. 9
pp. 24166 – 24183

Abstract

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In this work, the notion of function of bounded variation in 2-normed spaces was established (Definition 4.2), the set of functions of bounded $ (2, k) $-variation was endowed with a norm (Theorem 4.5), and it was proved that such a set is a Banach space (Theorem 4.6). In addition, the fundamental properties of the functions of bounded $ (2, k) $-variation in the formalism of 2-Hilbert and 2-normed spaces were studied (see Theorems 4.1, 4.3, 4.4). Also, it was shown how to endow a 2-normed space with a function of bounded $ (2, k) $-variation from a classical Hilbert space (Proposition 4.1). A series of examples and counterexamples are presented that enrich the results obtained in this work (4.1 and 4.2).

Published in AIMS Mathematics

ISSN: 2473-6988 (Online)
Publisher: AIMS Press
Country of publisher: United States
LCC subjects: Science: Mathematics
Website: http://www.aimspress.com/journal/Math

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