Given an F-space (X, τ ) and σ ≤ τ a linear topology on X, this paper provides the definition of a general set function that allows us to define measures of σ-noncompactness in X. In particular, we construct measures of nonconvex σ-noncompactness that are monotonic, invariant under passage to the closed convex hull, and satisfy the Cantor intersection property. Additionally, we derive a fixed point theorem for maps that satisfy the classical Darbo condition with respect to a given measure of nonconvex σ-noncompactness.
Caponetti, D., Trombetta, A., Trombetta, G. (2025). On measures of σ-noncompactess in F-spaces. MATHEMATICA SLOVACA, 75(6), 1461-1470 [10.1515/ms-2025-0107].
On measures of σ-noncompactess in F-spaces
Caponetti, Diana
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2025-12-12
Abstract
Given an F-space (X, τ ) and σ ≤ τ a linear topology on X, this paper provides the definition of a general set function that allows us to define measures of σ-noncompactness in X. In particular, we construct measures of nonconvex σ-noncompactness that are monotonic, invariant under passage to the closed convex hull, and satisfy the Cantor intersection property. Additionally, we derive a fixed point theorem for maps that satisfy the classical Darbo condition with respect to a given measure of nonconvex σ-noncompactness.
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