Results 101 to 110 of about 939 (135)

Gene expression and differentiation. [PDF]

Curr Opin Genet Dev, 1992
europepmc   +1 more source

Weak convergence of resolvents of maximal monotone operators and Mosco convergence

Weak convergence of resolvents of maximal monotone operators and Mosco convergence
identifier:oai:t2r2.star.titech.ac.jp ...
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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
identifier:oai:t2r2.star.titech.ac.jp ...
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Mosco convergence of closed convex subsets and resolvents of maximal monotone operators

Mosco convergence of closed convex subsets and resolvents of maximal monotone operators
identifier:oai:t2r2.star.titech.ac.jp ...
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On instability of global path properties of symmetric Markov processes under Mosco convergence (Symposium on Probability Theory)

, 2014
Kohei SUZUKI, Toshihiro Uemura
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ON INSTABILITY OF GLOBAL PATH PROPERTIES OF SYMMETRIC DIRICHLET FORMS UNDER MOSCO-CONVERGENCE

ON INSTABILITY OF GLOBAL PATH PROPERTIES OF SYMMETRIC DIRICHLET FORMS UNDER MOSCO-CONVERGENCE
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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
Wei Sun
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Convergence of the Associated Sequence of Normal Cones of a Mosco Convergent Sequence of Sets

SIAM Journal on Optimization, 2012
In 1977, Attouch established a relationship between the Mosco epiconvergence of a sequence of convex functions and the graph convergence of the associated sequence of subdifferentials, which has been found to have many important applications in optimization.
Xi Yin Zheng
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Mosco convergence and weak topologies for convex sets and functions

Mathematika, 1991
Let \({\mathcal C}(X)\) denote the space of closed convex sets in a Banach space. A sequence \((C_ n)\) in \({\mathcal C}(X)\) is said to be Mosco convergent to a closed set \(C\) if (1) every \(c\in C\) is a strong limit of a sequence \((c_ n)\), \(c_ n\in C_ n\); (2) if a vector \(x\) is the weak limit of some sequence \(c_ k\in C_{n(k)}\), where \(n(
Gerald Beer
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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.
Arian Bërdëllima
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