Properties of a Henstock type integral defined on a compact zero-dimensional metric space are studied. Theorems on integral representation of so-called quasi-measures, i.e., linear functionals on the space of “polynomials” defined on the space of the above mentioned type, are obtained.
Skvortsov, V., Tulone, F. (2012). Henstock type integral in compact zero-dimensional metric space and quasi-measures representations. MOSCOW UNIVERSITY MATHEMATICS BULLETIN, 67(2), 55-60 [10.3103/S0027132212020039].
Henstock type integral in compact zero-dimensional metric space and quasi-measures representations
TULONE, Francesco
2012-01-01
Abstract
Properties of a Henstock type integral defined on a compact zero-dimensional metric space are studied. Theorems on integral representation of so-called quasi-measures, i.e., linear functionals on the space of “polynomials” defined on the space of the above mentioned type, are obtained.File in questo prodotto:
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