AbstractElliptic stochastic partial differential equations (SPDE) with polynomial and exponential perturbation terms defined in terms of Nelson's Euclidean free field on Rd are studied using results by S. Kusuoka and A.S. Üstünel and M. Zakai concerning transformation of measures on abstract Wiener space. SPDEs of this type arise, in particular, in (Euclidean) quantum field theory with interactions of the polynomial or exponential type. The probability laws of the solutions of such SPDEs are given by Girsanov probability measures, that are non-linearly transformed measures of the probability law of Nelson's free field defined on subspaces of Schwartz space of tempered distributions
AbstractThe aim of this paper is to extend the usual framework of SPDE with monotone coefficients to...
Gubinelli M, Hofmanová M. PDE construction of the Euclidean Φ 4 3 quantum field theory. 2018
AbstractIn this article we prove new results concerning the structure and the stability properties o...
AbstractElliptic stochastic partial differential equations (SPDE) with polynomial and exponential pe...
The topic of this thesis is the application of techniques proper of algebraic quantum field theory (...
AbstractWe prove Lp-uniqueness of Dirichlet operators for Gibbs measures on the path space C(R,Rd) a...
We present a theory of hypoellipticity and unique ergodicity for semilinear parabolic stochastic PDE...
We study random-field solutions of a class of stochastic partial differential equations, involving o...
Gubinelli M, Hofmanová M. A PDE Construction of the Euclidean Phi(4)(3) Quantum Field Theory. Commun...
Albeverio S, Kawabi H, Roeckner M. Strong uniqueness for both Dirichlet operators and stochastic dyn...
We present a novel framework for the study of a large class of nonlinear stochastic partial differen...
International audienceWe consider stochastic differential equations on the whole Euclidean space pos...
Abstract. It is frequently the case that a white-noise-driven parabolic and/or hyperbolic stochastic...
A stochastic partial differential equation (SPDE) is a partial differential equation containing a ra...
Abstract. We present the Girsanov theorem for a non linear Ito ̂ equation in an infinite dimensional...
AbstractThe aim of this paper is to extend the usual framework of SPDE with monotone coefficients to...
Gubinelli M, Hofmanová M. PDE construction of the Euclidean Φ 4 3 quantum field theory. 2018
AbstractIn this article we prove new results concerning the structure and the stability properties o...
AbstractElliptic stochastic partial differential equations (SPDE) with polynomial and exponential pe...
The topic of this thesis is the application of techniques proper of algebraic quantum field theory (...
AbstractWe prove Lp-uniqueness of Dirichlet operators for Gibbs measures on the path space C(R,Rd) a...
We present a theory of hypoellipticity and unique ergodicity for semilinear parabolic stochastic PDE...
We study random-field solutions of a class of stochastic partial differential equations, involving o...
Gubinelli M, Hofmanová M. A PDE Construction of the Euclidean Phi(4)(3) Quantum Field Theory. Commun...
Albeverio S, Kawabi H, Roeckner M. Strong uniqueness for both Dirichlet operators and stochastic dyn...
We present a novel framework for the study of a large class of nonlinear stochastic partial differen...
International audienceWe consider stochastic differential equations on the whole Euclidean space pos...
Abstract. It is frequently the case that a white-noise-driven parabolic and/or hyperbolic stochastic...
A stochastic partial differential equation (SPDE) is a partial differential equation containing a ra...
Abstract. We present the Girsanov theorem for a non linear Ito ̂ equation in an infinite dimensional...
AbstractThe aim of this paper is to extend the usual framework of SPDE with monotone coefficients to...
Gubinelli M, Hofmanová M. PDE construction of the Euclidean Φ 4 3 quantum field theory. 2018
AbstractIn this article we prove new results concerning the structure and the stability properties o...