On finite dimensional subspaces of Banach spaces with local unconditional structure
On Fourier coefficients and factorable operators.
On general Lipschitzian kernels.
On Generalised Putnam-Fuglede Theorems.
On J. C. Alexander's theorem
On M-ideals in B(.
On Multi-Dimensional Random Walk Models Approximating Symmetric Space-Fractional Diffusion Processes
Mathematics Subject Classification: 26A33, 47B06, 47G30, 60G50, 60G52, 60G60.In this paper the multi-dimensional analog of the Gillis-Weiss random walk model is studied. The convergence of this random walk to a fractional diffusion process governed by a symmetric operator defined as a hypersingular integral or the inverse of the Riesz potential in the sense of distributions is proved.* Supported by German Academic Exchange Service (DAAD).
On Neumann operators.
On non-archimedean locally convex spaces
On operators fixing copies of and
On representation of linear operators on
On Riesz and Inessential Operators.
On the Approximation Numbers of an Operator and Its Adjoint.
On the approximation numbers of large Toeplitz matrices.
On the compact non-nuclear operator problem.
On the Convergence of Neumann Series in Banach Spaces.
On the isomorphism of cartesian products of locally convex spaces
On the Metric Geometry of Ideals of Operators on Hubert Space.
On the optimal control of nonresonant elliptic equations
On the singular numbers for some integral operators.
Two-sided estimates of Schatten-von Neumann norms for weighted Volterra integral operators are established. Analogous problems for some potential-type operators defined on Rn are solved.