Add to ORKGIn Euclidean space, the integration by parts formula for a set of finite perimeter is expressed by the integration with respect to a type of surface measure. According to geometric mea-sure theory, this surface measure is realized by the one-codimensional Hausdorff measure restricted on the reduced boundary and/or the measure-theoretic boundary, which may be strictly smaller than the topological boundary. In this paper, we discuss the counterpart of this measure in the abstract Wiener space, which is a typical infinite-dimensional space. We introduce the concept of the measure-theoretic boundary in the Wiener space and provide the integration by parts formula for sets of finite perimeter. The formula is presented in terms of the integration...
On the infinite dimensional space E of continuous paths from [0, 1] to Rn, n≥ 1 , endowed with ...
Kyushu University 21st Century COE Program Development of Dynamic Mathematics with High Functionalit...
Motivated by an example in Magnani (in press), we study, inside a separable metric space (X,d), the ...
AbstractIn Euclidean space, the integration by parts formula for a set of finite perimeter is expres...
AbstractIn Euclidean space, the integration by parts formula for a set of finite perimeter is expres...
In Euclidean space, it is well known that any integration by parts formula for a set of finite perim...
In Euclidean space, it is well known that any integration by parts formula for a set of finite perim...
The theory of sets of finite perimeter and BV functions in Wiener spaces, i.e., Banach spaces endowe...
We compare the perimeter measure with the Airault–Malliavin surface measure and we prove that all op...
We compare the perimeter measure with the Airault–Malliavin surface measure and we prove that all op...
We compare the perimeter measure with the Airault\u2013Malliavin surface measure and we prove that a...
On the infinite dimensional space E of continuous paths from [0, 1] to Rn, n≥ 1 , endowed with ...
On the infinite dimensional space E of continuous paths from [0, 1] to Rn, n≥ 1 , endowed with ...
On the infinite dimensional space E of continuous paths from [0, 1] to Rn, n≥ 1 , endowed with ...
On the infinite dimensional space E of continuous paths from [0, 1] to Rn, n≥ 1 , endowed with ...
On the infinite dimensional space E of continuous paths from [0, 1] to Rn, n≥ 1 , endowed with ...
Kyushu University 21st Century COE Program Development of Dynamic Mathematics with High Functionalit...
Motivated by an example in Magnani (in press), we study, inside a separable metric space (X,d), the ...
AbstractIn Euclidean space, the integration by parts formula for a set of finite perimeter is expres...
AbstractIn Euclidean space, the integration by parts formula for a set of finite perimeter is expres...
In Euclidean space, it is well known that any integration by parts formula for a set of finite perim...
In Euclidean space, it is well known that any integration by parts formula for a set of finite perim...
The theory of sets of finite perimeter and BV functions in Wiener spaces, i.e., Banach spaces endowe...
We compare the perimeter measure with the Airault–Malliavin surface measure and we prove that all op...
We compare the perimeter measure with the Airault–Malliavin surface measure and we prove that all op...
We compare the perimeter measure with the Airault\u2013Malliavin surface measure and we prove that a...
On the infinite dimensional space E of continuous paths from [0, 1] to Rn, n≥ 1 , endowed with ...
On the infinite dimensional space E of continuous paths from [0, 1] to Rn, n≥ 1 , endowed with ...
On the infinite dimensional space E of continuous paths from [0, 1] to Rn, n≥ 1 , endowed with ...
On the infinite dimensional space E of continuous paths from [0, 1] to Rn, n≥ 1 , endowed with ...
On the infinite dimensional space E of continuous paths from [0, 1] to Rn, n≥ 1 , endowed with ...
Kyushu University 21st Century COE Program Development of Dynamic Mathematics with High Functionalit...
Motivated by an example in Magnani (in press), we study, inside a separable metric space (X,d), the ...