Results 81 to 90 of about 103 (101)

Mosco convergence of closed convex subsets and resolvents of maximal monotone operators

Mosco convergence of closed convex subsets and resolvents of maximal monotone operators
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Mosco convergence of sequences of retracts of four nonlinear projections in Banach spaces

Mosco convergence of sequences of retracts of four nonlinear projections in Banach spaces
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On Mosco convergence for a sequence of closed convex subsets of Banach spaces

On Mosco convergence for a sequence of closed convex subsets of Banach spaces
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A note on Mosco convergence in spaces

Canadian Mathematical Bulletin, 2021
AbstractIn this note, we show that in a complete $\operatorname {\mathrm {CAT}}(0)$ space pointwise convergence of proximal mappings under a certain normalization condition implies Mosco convergence.
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Models for growth of heterogeneous sandpiles via Mosco convergence [PDF]

Asymptotic Analysis, 2012
In this paper we study the asymptotic behavior of several classes of power-law functionals involving variable exponents pn(·)→∞, via Mosco convergence. In the particular case pn(·)=np(·), we show that the sequence {Hn} of functionals Hn:L2(RN)→[0,+∞] given by Hn(u)=∫RNλ(x)n/np(x)|∇u(x)|np(x) dx   if u∈L2(RN)∩W1,np(·)(RN), +∞  otherwise, converges ...
Bocea, M., Mihăilescu, M., Pérez-Llanos, M., Rossi, J.D.   +3 more
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Mosco convergence of quasi-regular dirichlet forms

Acta Mathematicae Applicatae Sinica, 1999
The subject of this paper is the Mosco convergence of quasi-regular Dirichlet forms. The author gives a sufficient condition in order that the Mosco limit of a sequence of symmetric quasi-regular Dirichlet forms be quasi-regular. The key point is the uniform tightness of the capacities associated with the corresponding Dirichlet forms. By applying this
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Mosco convergence of set-valued supermartingale

Advances in Operator Theory
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El-Louh, M'hamed, Ezzaki, Fatima
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On Mosco Convergence of Diffusion Dirichlet Forms

Theory of Probability & Its Applications, 2009
This paper considers the Mosco convergence of Dirichlet forms ${\cal E}_n(f)=\int|\nabla f|^2\,d\mu_n$, where the measures $\mu_n$ locally converge in variation and it is not necessary to have complete supports.
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Minimizers of the limit of Mosco converging functions

Archiv der Mathematik, 2005
The author gives a characterization of minimizers of a function \(f\) defined on a Banach space \(E\) which is the limit of the Moscow converging sequence \(\{f_n\}\) of lower semicontinuous functions. It is shown that any minimizer of \(f\) is a cluster point of a sequence of ``almost'' minimizers of the functions \(f_n\).
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Mosco Convergence and Large Deviations

1992
The techniques of convex analysis have come to play an increasingly important role in the theory of large deviations (see, e.g., Bahadur and Zabell, 1979; Ellis, 1985; de Acosta, 1988). The purpose of this brief note is to point out an interesting connection between a basic form of convergence commonly employed in convex analysis (“Mosco convergence”),
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