Some properties of solutions to weakly hypoelliptic equations [PDF]
A linear differential operator L is called weakly hypoelliptic if any local solution u of Lu = 0 is smooth. We allow for systems, i.e. the coefficients may be matrices, not necessarily of square size.
Bär, Christian
core
Using Perturbed Underdamped Langevin Dynamics to Efficiently Sample from Probability Distributions. [PDF]
Duncan AB, Nüsken N, Pavliotis GA.
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Noncommutative topology and the world's simplest index theorem. [PDF]
van Erp E.
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Variance Reduction Using Nonreversible Langevin Samplers. [PDF]
Duncan AB, Lelièvre T, Pavliotis GA.
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The Kotake-Narasimhan theorem in general ultradifferentiable classes. [PDF]
Fürdös S.
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Generalizations of the classical Weyl and Colin de Verdiere's formulas and the orbit method. [PDF]
Boyarchenko M, Levendorskii S.
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On the hypoellipticity and the global analytic-hypoellipticity of pseudo- differential operators
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On hypoellipticity for pseudodifferential operators
2001 【要旨】
openaire
Variational approach to coarse-graining of generalized gradient flows. [PDF]
Duong MH +3 more
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A Stochastic Version of the Jansen and Rit Neural Mass Model: Analysis and Numerics. [PDF]
Ableidinger M +2 more
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