On weak compactness in the space of Radon measures

Abstract We show that the sequential closure of a family of probability measures on the canonical space of càdlàg paths satisfying Stricker’s uniform tightness condition is a weak∗ compact set of semimartingale measures in the dual pairing of bounded continuous functions and Radon measures, that is, the dual pairing from the Riesz representation theorem under topological assumptions on the path space. Similar results are obtained for quasi- and supermartingales under analogous conditions. In particular, we give a full characterisation of the strongest topology on the Skorokhod space for which these results are true.

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Combined Mean-Field and Semiclassical Limits of Large Fermionic Systems

Journal of Statistical Physics ◽

10.1007/s10955-021-02700-w ◽

2021 ◽

Vol 182 (2) ◽

Author(s):

Li Chen ◽

Jinyeop Lee ◽

Matthew Liew

Keyword(s):

Schrödinger Equation ◽

Schrodinger Equation ◽

Mean Field ◽

Weak Limit ◽

Weak Compactness ◽

Three Dimensions ◽

Uniform Estimates ◽

Fermionic Systems ◽

Semiclassical Limits ◽

Semiclassical Regime

AbstractWe study the time dependent Schrödinger equation for large spinless fermions with the semiclassical scale $$\hbar = N^{-1/3}$$ ħ = N - 1 / 3 in three dimensions. By using the Husimi measure defined by coherent states, we rewrite the Schrödinger equation into a BBGKY type of hierarchy for the k particle Husimi measure. Further estimates are derived to obtain the weak compactness of the Husimi measure, and in addition uniform estimates for the remainder terms in the hierarchy are derived in order to show that in the semiclassical regime the weak limit of the Husimi measure is exactly the solution of the Vlasov equation.

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Invariant Radon measures and minimal sets for subgroups of Homeo+(R)

Topology and its Applications ◽

10.1016/j.topol.2020.107378 ◽

2020 ◽

Vol 285 ◽

pp. 107378

Author(s):

Hui Xu ◽

Enhui Shi ◽

Yiruo Wang

Keyword(s):

Radon Measures ◽

Minimal Sets

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The weakly compact reflection principle need not imply a high order of weak compactness

Archive for Mathematical Logic ◽

10.1007/s00153-019-00686-7 ◽

2019 ◽

Vol 59 (1-2) ◽

pp. 179-196

Author(s):

Brent Cody ◽

Hiroshi Sakai

Keyword(s):

Weak Compactness ◽

Reflection Principle ◽

High Order ◽

Weakly Compact

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The spectral theorem for well-bounded operators

Journal of the Australian Mathematical Society. Series A. Pure Mathematics and Statistics ◽

10.1017/s1446788700031827 ◽

1993 ◽

Vol 54 (3) ◽

pp. 334-351 ◽

Cited By ~ 1

Author(s):

Ian Doust ◽

Qiu Bozhou

Keyword(s):

Functional Calculus ◽

Continuous Functions ◽

Weak Compactness ◽

Compact Interval ◽

Spectral Theorem ◽

Type B ◽

Bounded Operators ◽

Absolutely Continuous Functions ◽

Absolutely Continuous

AbstractWell-bounded operators are those which possess a bounded functional calculus for the absolutely continuous functions on some compact interval. Depending on the weak compactness of this functional calculus, one obtains one of two types of spectral theorem for these operators. A method is given which enables one to obtain both spectral theorems by simply changing the topology used. Even for the case of well-bounded operators of type (B), the proof given is more elementary than that previously in the literature.

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Weak compactness of Fréchet-derivatives: application to composition operators

Journal of the Australian Mathematical Society ◽

10.1017/s1446788700021558 ◽

1980 ◽

Vol 29 (4) ◽

pp. 399-406

Author(s):

Peter Dierolf ◽

Jürgen Voigt

Keyword(s):

Banach Spaces ◽

Integral Equations ◽

Sobolev Spaces ◽

Composition Operators ◽

Weak Compactness ◽

Nonlinear Integral Equations ◽

Weakly Compact ◽

Frechet Derivatives ◽

Fréchet Derivatives ◽

Compact Map

AbstractWe prove a result on compactness properties of Fréchet-derivatives which implies that the Fréchet-derivative of a weakly compact map between Banach spaces is weakly compact. This result is applied to characterize certain weakly compact composition operators on Sobolev spaces which have application in the theory of nonlinear integral equations and in the calculus of variations.

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