A characterization of infinitely divisible characteristic functional on a Hilbert space, analogous to that of Johansen [1], is given
In this note we discuss the ergodicity of the class of Banach spaces which are characterized by prop...
We apply the complex method of interpolation to families of infinite-dimensional, separable Hilbert ...
AbstractLet H be a real or complex infinite-dimensional Hilbert space. Then, for every closed ball B...
AbstractWe shall consider the decomposition problem of multivariate infinitely divisible characteris...
PhDElectrical engineeringUniversity of Michigan, Horace H. Rackham School of Graduate Studieshttp://...
Ph.D.Electrical engineeringUniversity of Michigan, Horace H. Rackham School of Graduate Studieshttp:...
For a densely defined in a Hilbert space closed Hermitian operator with infinite defect numbers its ...
For a densely defined in a Hilbert space closed Hermitian operator with infinite defect numbers its ...
For a densely defined in a Hilbert space closed Hermitian operator with infinite defect numbers its ...
Graduation date: 1987The classical dimension theories of Menger-Urysohn and Lebesgue are equivalent ...
AbstractLet f be an infinitely divisible characteristic function without normal factor. We establish...
Abstract. We prove that for every infinite-dimensional Banach space X with a Fréchet differentiable...
ABSTRACT. In this survey article we present a sketch of the tecliniques which allowed to advance int...
AbstractFor a (point-wisely non-negative) positive definite function a certain criterion for its inf...
As surprising as it may seem, there exist infinitely differentiable functions which are nowhere anal...
In this note we discuss the ergodicity of the class of Banach spaces which are characterized by prop...
We apply the complex method of interpolation to families of infinite-dimensional, separable Hilbert ...
AbstractLet H be a real or complex infinite-dimensional Hilbert space. Then, for every closed ball B...
AbstractWe shall consider the decomposition problem of multivariate infinitely divisible characteris...
PhDElectrical engineeringUniversity of Michigan, Horace H. Rackham School of Graduate Studieshttp://...
Ph.D.Electrical engineeringUniversity of Michigan, Horace H. Rackham School of Graduate Studieshttp:...
For a densely defined in a Hilbert space closed Hermitian operator with infinite defect numbers its ...
For a densely defined in a Hilbert space closed Hermitian operator with infinite defect numbers its ...
For a densely defined in a Hilbert space closed Hermitian operator with infinite defect numbers its ...
Graduation date: 1987The classical dimension theories of Menger-Urysohn and Lebesgue are equivalent ...
AbstractLet f be an infinitely divisible characteristic function without normal factor. We establish...
Abstract. We prove that for every infinite-dimensional Banach space X with a Fréchet differentiable...
ABSTRACT. In this survey article we present a sketch of the tecliniques which allowed to advance int...
AbstractFor a (point-wisely non-negative) positive definite function a certain criterion for its inf...
As surprising as it may seem, there exist infinitely differentiable functions which are nowhere anal...
In this note we discuss the ergodicity of the class of Banach spaces which are characterized by prop...
We apply the complex method of interpolation to families of infinite-dimensional, separable Hilbert ...
AbstractLet H be a real or complex infinite-dimensional Hilbert space. Then, for every closed ball B...
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