Espacios con producto interior probabilístico.
Josep M.ª Fortuny (1984)
Stochastica
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Probabilistic inner product spaces are studied with detail.
Josep M.ª Fortuny (1984)
Stochastica
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Probabilistic inner product spaces are studied with detail.
A. Bahamonde Rionda, J. S. López García (1985)
Stochastica
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Partially-additive monoids (pams) were introduced by Arbib and Manes ([1]) in order to provide an algebraic approach to the semantic of recursion in theoretical computer science. Here we extend the range of application of pams for capturing information theory concepts as componibility and sequential continuity, which arise naturally in this framework.
Francesc Bofill (1982)
Stochastica
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We study the relations between simetrization by a limiting process of probabilities and functions defined on a metric compacy product space and their ergodic properties.
Claudi Alsina, J. Giménez (1984)
Stochastica
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Several order relations in the set of strict t-norms are investigated.
Alberto Falqués Serra (1982)
Stochastica
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In this paper it is first shown that the linear evolution equations for a generalized thermoelastic solid generate a C semigroup. Next an analysis of the long time evolution behaviour yields the some results known for classical thermoelasticity: generically, the natural state is asymptotically stable.
Enrique Tarazona Ferrandis (1981)
Stochastica
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This paper deals with the existence of non constant real valued functions on a topological space X. The main results are related to closed covers and order properties.
Carme Burgués (1981)
Stochastica
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We prove that two archimedean t-norms with equal diagonal sections and zero-sets must be identical.
Núria Agell (1984)
Stochastica
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In this note we prove that the unique concave t-norm is Minimum and, among the class of triangular functions that have the family of unit step-functions as idempotent elements, the unique concave triangular function is pi.
Enrique Tarazona Ferrandis (1981)
Stochastica
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We study some relations whose compatibility with the topology is equivalent to normality or to complete regularity.