We define two Besov spaces on the boundary of a bounded domain with fractalboundary and show that two operators with respect to the Dirichlet problem is bounded fromone of the two Besov spaces to the other.Convex Analysis and Chaos : The Third Symposium on Nonlinear Analysis, July 23-25, 1998 Josai University, edited by Kiyoko Nishizaw
Extending recent work for the linear Poisson problem for the Laplacian in the framework of Sobolev-B...
AbstractThis paper gives several results on Besov spaces of holomorphic functions on a very large cl...
Let X be a real Banach space. A subset B of the dual unit sphere of X is said to be a boundary for X...
We define two Besov spaces on the boundary of a bounded domain with fractalboundary and show that tw...
Proceedings of The First Symposium on Non-Linear Analysis : CONVEXITY, CHAOS AND FRACTALS / edited b...
For a bounded domain D with fractal boundary we consider a Besov space on ∂D, with respect to a meas...
AbstractThe main theorem of this paper gives a characterization for holomorphic Besov space Bp(D) ov...
International audienceIn the framework of the Laplacian transport, described by a Robin boundary val...
summary:For $1\leq p\leq\infty$, precise conditions on the parameters are given under which the part...
Let $\Gamma$ be a fractal $h$-set and ${\mathbb{B}}^{{\sigma}}_{p,q}(\Gamma)$ be a trace space of Be...
AbstractWe study the fully inhomogeneous Dirichlet problem for the Laplacian in bounded convex domai...
functions from a hypersurface with the boundary R. Duduchava∗ We extend m-tuples of functions from t...
The method of pseudoanalytic continuation developed by E. M. Dyn’kin is extended to convex domains i...
We study Besov spaces on d-sets and provide their characterization by means of Hölder-continuous ato...
ABSTRACT. We study Besov spaces Bc(Lp(Q)), 0 < p, q, Ca < oo, on do-mains Q in Rd. We show tha...
Extending recent work for the linear Poisson problem for the Laplacian in the framework of Sobolev-B...
AbstractThis paper gives several results on Besov spaces of holomorphic functions on a very large cl...
Let X be a real Banach space. A subset B of the dual unit sphere of X is said to be a boundary for X...
We define two Besov spaces on the boundary of a bounded domain with fractalboundary and show that tw...
Proceedings of The First Symposium on Non-Linear Analysis : CONVEXITY, CHAOS AND FRACTALS / edited b...
For a bounded domain D with fractal boundary we consider a Besov space on ∂D, with respect to a meas...
AbstractThe main theorem of this paper gives a characterization for holomorphic Besov space Bp(D) ov...
International audienceIn the framework of the Laplacian transport, described by a Robin boundary val...
summary:For $1\leq p\leq\infty$, precise conditions on the parameters are given under which the part...
Let $\Gamma$ be a fractal $h$-set and ${\mathbb{B}}^{{\sigma}}_{p,q}(\Gamma)$ be a trace space of Be...
AbstractWe study the fully inhomogeneous Dirichlet problem for the Laplacian in bounded convex domai...
functions from a hypersurface with the boundary R. Duduchava∗ We extend m-tuples of functions from t...
The method of pseudoanalytic continuation developed by E. M. Dyn’kin is extended to convex domains i...
We study Besov spaces on d-sets and provide their characterization by means of Hölder-continuous ato...
ABSTRACT. We study Besov spaces Bc(Lp(Q)), 0 < p, q, Ca < oo, on do-mains Q in Rd. We show tha...
Extending recent work for the linear Poisson problem for the Laplacian in the framework of Sobolev-B...
AbstractThis paper gives several results on Besov spaces of holomorphic functions on a very large cl...
Let X be a real Banach space. A subset B of the dual unit sphere of X is said to be a boundary for X...
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