A selection principle for mappings of bounded variation of several variables
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Publication:2433629
zbMath1102.26008MaRDI QIDQ2433629
Publication date: 2 November 2006
Published in: Real Analysis Exchange (Search for Journal in Brave)
Related Items (7)
A pointwise selection principle for maps of several variables via the total joint variation ⋮ Uniformly continuous superposition operators in the space of functions of bounded \(n\)-dimensional \(\Phi\)-variation ⋮ Some inequalities for reciprocally (s,m)-convex in the second sense functions and applications to special means ⋮ On metric semigroups-valued functions of bounded Riesz-\(\Phi\)-variation in several variables ⋮ A Banach algebra of functions of several variables of finite total variation and Lipschitzian superposition operators. I ⋮ Maps of several variables of finite total variation. II: E. Helly-type pointwise selection principles ⋮ Maps of several variables of finite total variation. I: Mixed differences and the total variation
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