Results 31 to 40 of about 147 (121)
Multivalued strong laws of large numbers in the slice topology. Application to integrands
, 1994 Starting from the multivalued strong law of large numbers in the Wijsman topology recently proved by the present author, we deduce two multivalued strong laws of large numbers in the ‘slice topology’ introduced by Beer.
Hess, Christian
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Wijsman convergence: topological properties and embeddings
, 2010 In 1966, R. A. Wijsman studied some optimum properties of the sequential probability ratio test, he considered a mode of convergence for sequences of closed convex sets in R^n.
Cao, J
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Baire spaces and the Wijsman topology
, 2007 In 1960s, when he studied Banach space geometry, R. Wijsman considered the weak topology on the collection of nonempty closed subsets of a metric space generated by the distance functionals viewed as functions of set argument.
Tomita, A, Cao, J
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Compactness and local compactness in hyperspaces
, 2002 We give characterizations for a subspace of a hyperspace, endowed with either the Vietoris or the Wijsman topology, to be compact or relatively compact.
Costantini, Camillo +2 more
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Baire spaces and the Wijsman topology
, 2012 In 1960s, when he studied Banach space geometry, R. Wijsman considered the weak topology on the collection of nonempty closed subsets of a metric space generated by the distance functionals viewed as functions of set argument.
Tomita, A, Cao, J
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, 2012 In 1960's, when he studied some optimum properties of sequential probability ratio test, R. A. Wijsman considered a mode of convergence for sequences of closed sets such that if a sequence of proper lower semicontinuous convex functions defined on R^n ...
Cao, J
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Weightable quasi-uniformities [PDF]
, 2012 [EN] The authors study quasi-uniformities that are generated by a family of weightable quasi-pseudometrics. Each totally bounded quasi-uniformity is of this kind.
Romaguera Bonilla, Salvador +3 more
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, 2010 In 1960's, when he studied some optimum properties of sequential probability ratio test, R. A. Wijsman considered a mode of convergence for sequences of closed sets such that if a sequence of proper lower semicontinuous convex functions defined on R^n ...
Cao, J
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Level sets of depth measures in abstract spaces. [PDF]
Test (Madr), 2023 Cholaquidis A, Fraiman R, Moreno L.
europepmc +1 more source
Norms that Generate the Same Wijsman Topology on Convex Sets
, 2007 Introduction Let X be a Banach space and let C(X) be the family of closed and convex subsets of X. The Wijsman topology on C(X) is defined to be the weakest topology for which the distance functionals d(x; :) : C(X) \Gamma! IR are continous for all x 2
Pietro Poggi-corradini
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