Add to ORKGsummary:It is shown that every strongly lattice norm on $c_0(\Gamma)$ can be approximated by $C^\infty$ smooth norms. We also show that there is no lattice and G\^ateaux differentiable norm on $C_0[0,\omega_1]$
AbstractWe show that the saturation order of piecewise constant approximation in Lp norm on convex p...
Renorming theory involves finding isomorphisms in order to improve the norm of a normed space X. Thi...
summary:Some class of locally solid topologies (called uniformly $\mu$-continuous) on \linebreak Köt...
summary:It is shown that every strongly lattice norm on $c_0(\Gamma)$ can be approximated by $C^\inf...
summary:Every separable Banach space with $C^{(n)}$-smooth norm (Lipschitz bump function) admits an ...
summary:Every separable Banach space with $C^{(n)}$-smooth norm (Lipschitz bump function) admits an ...
* Supported by NSERC (Canada)Let X be a Banach space equipped with norm || · ||. We say that || · ||...
AbstractLet X be a Banach space whose norm is simultaneously LUR and Gateaux (Fréchet) smooth. Under...
AbstractIn this paper, we solve a biharmonic equation in an exterior domain of Rn. Our approach rest...
AbstractNorms referred to as generalized peak norms involve a parameter α which lies between 0 and 1...
In this paper we introduce a modification of the Day norm in \(c_0(\Gamma)\) and investigate propert...
AbstractIn this paper, we discuss the problem of compactness for weighted composition operators, def...
AbstractSome geometric properties of classical Lorentz spaces Λ1,w are considered. First criteria fo...
Abstract. We present partial positive results supporting a conjecture that admitting an equivalent L...
AbstractWe prove an infinite-dimensional generalization of Zengerʼs lemma that was used in the proof...
AbstractWe show that the saturation order of piecewise constant approximation in Lp norm on convex p...
Renorming theory involves finding isomorphisms in order to improve the norm of a normed space X. Thi...
summary:Some class of locally solid topologies (called uniformly $\mu$-continuous) on \linebreak Köt...
summary:It is shown that every strongly lattice norm on $c_0(\Gamma)$ can be approximated by $C^\inf...
summary:Every separable Banach space with $C^{(n)}$-smooth norm (Lipschitz bump function) admits an ...
summary:Every separable Banach space with $C^{(n)}$-smooth norm (Lipschitz bump function) admits an ...
* Supported by NSERC (Canada)Let X be a Banach space equipped with norm || · ||. We say that || · ||...
AbstractLet X be a Banach space whose norm is simultaneously LUR and Gateaux (Fréchet) smooth. Under...
AbstractIn this paper, we solve a biharmonic equation in an exterior domain of Rn. Our approach rest...
AbstractNorms referred to as generalized peak norms involve a parameter α which lies between 0 and 1...
In this paper we introduce a modification of the Day norm in \(c_0(\Gamma)\) and investigate propert...
AbstractIn this paper, we discuss the problem of compactness for weighted composition operators, def...
AbstractSome geometric properties of classical Lorentz spaces Λ1,w are considered. First criteria fo...
Abstract. We present partial positive results supporting a conjecture that admitting an equivalent L...
AbstractWe prove an infinite-dimensional generalization of Zengerʼs lemma that was used in the proof...
AbstractWe show that the saturation order of piecewise constant approximation in Lp norm on convex p...
Renorming theory involves finding isomorphisms in order to improve the norm of a normed space X. Thi...
summary:Some class of locally solid topologies (called uniformly $\mu$-continuous) on \linebreak Köt...