Self-decomposable probability measures on Banach spaces
A. Kumar, B. Schreiber (1975)
Studia Mathematica
Similarity:
A. Kumar, B. Schreiber (1975)
Studia Mathematica
Similarity:
Thu Nguyen (1979)
Studia Mathematica
Similarity:
K. Urbanik (1978)
Studia Mathematica
Similarity:
K. Urbanik (1973)
Studia Mathematica
Similarity:
K. Urbanik (1979)
Banach Center Publications
Similarity:
Markus Riedle (2011)
Studia Mathematica
Similarity:
In this work infinitely divisible cylindrical probability measures on arbitrary Banach spaces are introduced. The class of infinitely divisible cylindrical probability measures is described in terms of their characteristics, a characterisation which is not known in general for infinitely divisible Radon measures on Banach spaces. Further properties of infinitely divisible cylindrical measures such as continuity are derived. Moreover, the classification result enables us to deduce new...
K. Urbanik (1972)
Studia Mathematica
Similarity:
John Crawford (1977)
Studia Mathematica
Similarity:
T. Byczkowski (1981)
Studia Mathematica
Similarity: