Surface measures and convergence of the Ornstein-Uhlenbeck semigroup in Wiener spaces

We study points of density 1/2 of sets of finite perimeter in infinite-dimensional Gaussian spaces and prove that, as in the finite-dimensional theory, the surface measure is concentrated on this class of points. Here density 1/2 is formulated in terms of the pointwise behaviour of the Ornstein-Uhlembeck semigroup.

[1]  A. Besicovitch On existence of subsets of finite measure of sets of infinite measure , 1952 .

[2]  E. Giorgi,et al.  Su una teoria generale della misura (r − 1)-dimensionale in uno spazio adr dimensioni , 1954 .

[3]  H. Fédérer,et al.  A note on the Gauss-Green theorem , 1958 .

[4]  H. Fédérer Geometric Measure Theory , 1969 .

[5]  E. Stein Topics in Harmonic Analysis Related to the Littlewood-Paley Theory. , 1970 .

[6]  W. Ziemer Weakly differentiable functions , 1989 .

[7]  D. Feyel,et al.  Hausdorff measures on the Wiener space , 1992 .

[8]  M. Ledoux Semigroup proofs of the isoperimetric inequality in Euclidean and Gauss space , 1994 .

[9]  M. Ledoux,et al.  Isoperimetry and Gaussian analysis , 1996 .

[10]  M. Fukushima On Semi-Martingale Characterizations of Functionals of Symmetric Markov Processes , 1999 .

[11]  M. Fukushima BV Functions and Distorted Ornstein Uhlenbeck Processes over the Abstract Wiener Space , 2000 .

[12]  L. Ambrosio,et al.  Functions of Bounded Variation and Free Discontinuity Problems , 2000 .

[13]  Ronald F. Gariepy FUNCTIONS OF BOUNDED VARIATION AND FREE DISCONTINUITY PROBLEMS (Oxford Mathematical Monographs) , 2001 .

[14]  M. Fukushima,et al.  On the Space of BV Functions and a Related Stochastic Calculus in Infinite Dimensions , 2001 .

[15]  L. Zambotti Integration by parts formulae on convex sets of paths and applications to SPDEs with reflection , 2002 .

[16]  V. Bogachev Gaussian Measures on a , 2022 .

[17]  L. Ambrosio,et al.  BV functions in abstract Wiener spaces , 2010 .

[18]  L. Ambrosio,et al.  Sets with finite perimeter in Wiener spaces, perimeter measure and boundary rectifiability , 2010 .

[19]  A. Figalli,et al.  A mass transportation approach to quantitative isoperimetric inequalities , 2010 .

[20]  M. Hino Sets of finite perimeter and the Hausdorff-Gauss measure on the Wiener space , 2009, 0907.0056.

[21]  L. Ambrosio,et al.  BV functions in a Hilbert space with respect to a Gaussian measure , 2010 .