Results 61 to 70 of about 3,398 (121)
Mosco convergence in locally convex spaces
Journal of Functional Analysis, 1992 Given a dual pair \(E\), \(F\) of locally convex spaces, each with its corresponding weak topology \(\sigma\) and Mackey topology \(\tau\), one says that a sequence \(\{f_ n\}\) of functions \(E\to [-\infty,\infty]\) (or \(F\to [-\infty,\infty]\)) is Mosco-convergent to a function \(f_ 0\) if the following conditions are satisfied for each \(v\) in \(E\
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Existence of continuous solutions to evolutionary quasi-variational inequalities with applications
Le Matematiche, 2007 The author presents dynamic elastic traffic equilibrium problems with data depending explicitly on time and studies under which assumptions the continuity of solutions with respect to the time can be ensured.
Annamaria Barbagallo
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A skew stochastic heat equation
, 2011 We consider a stochastic heat equation driven by a space-time white noise and with a singular drift, where a local-time in space appears. The process we study has an explicit invariant measure of Gibbs type, with a non-convex potential.
Bounebache, Said Karim +1 more
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T-minima on convex sets and Mosco-convergence
Rendiconti di Matematica e delle Sue Applicazioni, 2020 Summary: Half century ago, Umberto Mosco was the ``relatore di tesi (tesi about the Mosco-convergence) di laurea'' of the first author; a quart of century ago, the first author was the ``relatore di tesi di laurea'' of the second author. The roots of this paper are the Mosco-convergence of convex sets and the minimization of integral functionals of the
Boccardo L., Leone C.
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Unilateral problems for quasilinear operators with fractional Riesz gradients
Advances in Nonlinear AnalysisIn this work, we develop the classical theory of monotone and pseudomonotone operators in the class of convex-constrained Dirichlet-type problems involving fractional Riesz gradients in bounded and in unbounded domains Ω⊂Rd\Omega \subset {{\mathbb{R ...
Campos Pedro Miguel +1 more
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On a theorem about Mosco convergence in Hadamard spaces
, 2020 Let $(f^n),f$ be a sequence of proper closed convex functions defined on a Hadamard space. We show that the convergence of proximal mappings $J^n_λx$ to $J_λx$, under certain additional conditions, imply Mosco convergence of $f^n$ to $f$. This result is a converse to a theorem of Bacak about Mosco convergence in Hadamard spaces.
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Structural Changes in Nonlocal Denoising Models Arising Through Bi-Level Parameter Learning. [PDF]
Appl Math Optim, 2023 Davoli E +3 more
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Dual Kadec-Klee norms and the relationships between Wijsman, slice, and Mosco convergence.
Michigan Mathematical Journal, 1994 This rather comprehensive article deals with interplay between the set convergences of the title. The most principal and typical result reads: Mosco and slice convergences coincide if and only if the weak-star and norm topologies agree on the dual sphere.
Borwein, Jon, Vanderwerff, Jon
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Image Morphing in Deep Feature Spaces: Theory and Applications. [PDF]
J Math Imaging Vis, 2021 Effland A +4 more
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Level sets of depth measures in abstract spaces. [PDF]
Test (Madr), 2023 Cholaquidis A, Fraiman R, Moreno L.
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