Add to ORKGAbstract. We present “reiteration theorems ” with limiting values θ = 0 and θ = 1 for a real interpolation method involving broken-logarithmic functors. The resulting spaces lie outside of the original scale of spaces and to describe them new interpolation functors are introduced. For an ordered couple of (quasi-) Banach spaces similar results were presented without proofs by Doktorskii in [D].
The problem of coincidence of the interpolation spaces obtained by use of the interpolation method o...
AbstractWe give embeddings theorems for some quasi-Banach spaces constructed from couples of certain...
A scale of function spaces is considered which proved to be of considerable im-portance in analysis....
AbstractWe show that several interpolation functors, including the widely used real and complex meth...
A procedure is given to reduce the interpolation spaces on an ordered pair generated by the function...
We derive interpolation formulae for the measure of non-compactness of operators interpolated by log...
AbstractWe consider certain real interpolation methods for families of Banach spaces. We also define...
The guiding theme and main topic of this monograph is Interpolation Theory. However, as it is sugges...
In this paper, we study the dual space and reiteration theorems for the real method of interpolation...
AbstractGiven Banach spaces X, a subspace Y, and a finite set G of bounded linear functionals on Y, ...
AbstractWe investigate the limit class of interpolation spaces that comes up by the choice θ=0 in th...
The theory of interpolation spaces has its origin in the classical work of Riesz and Marcinkiewicz b...
AbstractComputability of Banach spaces is discussed. A compatible relation is shown to hold between ...
The theory of interpolation spaces originally arose from an attempt to gene-ralize the classical int...
We study the description by means of the J-functional of logarithmic interpolation spaces (A0, A1) 1...
The problem of coincidence of the interpolation spaces obtained by use of the interpolation method o...
AbstractWe give embeddings theorems for some quasi-Banach spaces constructed from couples of certain...
A scale of function spaces is considered which proved to be of considerable im-portance in analysis....
AbstractWe show that several interpolation functors, including the widely used real and complex meth...
A procedure is given to reduce the interpolation spaces on an ordered pair generated by the function...
We derive interpolation formulae for the measure of non-compactness of operators interpolated by log...
AbstractWe consider certain real interpolation methods for families of Banach spaces. We also define...
The guiding theme and main topic of this monograph is Interpolation Theory. However, as it is sugges...
In this paper, we study the dual space and reiteration theorems for the real method of interpolation...
AbstractGiven Banach spaces X, a subspace Y, and a finite set G of bounded linear functionals on Y, ...
AbstractWe investigate the limit class of interpolation spaces that comes up by the choice θ=0 in th...
The theory of interpolation spaces has its origin in the classical work of Riesz and Marcinkiewicz b...
AbstractComputability of Banach spaces is discussed. A compatible relation is shown to hold between ...
The theory of interpolation spaces originally arose from an attempt to gene-ralize the classical int...
We study the description by means of the J-functional of logarithmic interpolation spaces (A0, A1) 1...
The problem of coincidence of the interpolation spaces obtained by use of the interpolation method o...
AbstractWe give embeddings theorems for some quasi-Banach spaces constructed from couples of certain...
A scale of function spaces is considered which proved to be of considerable im-portance in analysis....