Add to ORKGIn this thesis, we discuss three topics on Dirichlet forms and non-symmetric Markov processes. First, we explore the analytic structure of non-symmetric Markov processes. Let U be an open set of \mathbf{R}^n, m a positive Radon measure on U, and (P_t)_{t>0} a strongly continuous contraction sub-Markovian semigroup on L^2(U;m). We give an explicit Levy-Khintchine type representation of the generator A of (P_t)_{t>0}. If (P_t)_{t>0} is an analytic semigroup, we give an explicit characterization of the semi-Dirichlet form {\cal E} associated with (P_t)_{t>0}. Second, we consider the Dirichlet boundary value problem for a general class of second order non-symmetric elliptic operators L with singular coefficients. We show that ther...
AbstractWe extend the Ruzhansky–Turunen theory of pseudo-differential operators on compact Lie group...
We extend the main result in [A/M/R], which is a complete characterization of all Dirichlet forms de...
Bibliography: p. 50.N.S.F. grant DMS 8415211 A.R.O. grant DAAG29-84-K-0005by E.A. Carlen, S. Kusuoka...
AbstractThis paper consists of three parts. In Part I, we obtain results on the integrability of fun...
Ito's construction of Markovian solutions to stochastic equations driven by a Lévy noise is extende...
Some new results on Markov uniqueness of generators (L,D(L)) of (non-symmetric) Dirichlet forms are ...
AbstractFirst we compute Brownian motion expectations of some Kac's functionals. This allows a compl...
Focussing on the interrelations of the subjects of Markov processes, analytic semigroups and ellipti...
AbstractThe theory of non symmetric Dirichlet forms is generalized to the non abelian setting, also ...
A careful and accessible exposition of functional analytic methods in stochastic analysis is provide...
Since the publication of the first edition in 1994, this book has attracted constant interests from ...
International audienceWe give an account of results already obtained in the direction of regularity ...
AbstractWe study perturbations Eμ≔E+Qu of Dirichlet forms E on some L2 space L2(m) given by quadrati...
In this thesis we consider two types of non-symmetric processes, which are similar to the symmetric ...
AbstractWe investigate the Dirichlet operator semigroups of non-Gaussian Gibbs measures on linear sp...
AbstractWe extend the Ruzhansky–Turunen theory of pseudo-differential operators on compact Lie group...
We extend the main result in [A/M/R], which is a complete characterization of all Dirichlet forms de...
Bibliography: p. 50.N.S.F. grant DMS 8415211 A.R.O. grant DAAG29-84-K-0005by E.A. Carlen, S. Kusuoka...
AbstractThis paper consists of three parts. In Part I, we obtain results on the integrability of fun...
Ito's construction of Markovian solutions to stochastic equations driven by a Lévy noise is extende...
Some new results on Markov uniqueness of generators (L,D(L)) of (non-symmetric) Dirichlet forms are ...
AbstractFirst we compute Brownian motion expectations of some Kac's functionals. This allows a compl...
Focussing on the interrelations of the subjects of Markov processes, analytic semigroups and ellipti...
AbstractThe theory of non symmetric Dirichlet forms is generalized to the non abelian setting, also ...
A careful and accessible exposition of functional analytic methods in stochastic analysis is provide...
Since the publication of the first edition in 1994, this book has attracted constant interests from ...
International audienceWe give an account of results already obtained in the direction of regularity ...
AbstractWe study perturbations Eμ≔E+Qu of Dirichlet forms E on some L2 space L2(m) given by quadrati...
In this thesis we consider two types of non-symmetric processes, which are similar to the symmetric ...
AbstractWe investigate the Dirichlet operator semigroups of non-Gaussian Gibbs measures on linear sp...
AbstractWe extend the Ruzhansky–Turunen theory of pseudo-differential operators on compact Lie group...
We extend the main result in [A/M/R], which is a complete characterization of all Dirichlet forms de...
Bibliography: p. 50.N.S.F. grant DMS 8415211 A.R.O. grant DAAG29-84-K-0005by E.A. Carlen, S. Kusuoka...