In this thesis we recall the notion of a quasi-norm and a p-norm. We mention the Aoki-Rolewicz theor...
In this thesis we recall the notion of a quasi-norm and a p-norm. We mention the Aoki-Rolewicz theor...
AbstractIt is proved in the case of Lebesgue measure space(R+,Σ,m) that for any p ϵ (0,1) the spaces...
Abstract. For a complete measure space (X,Σ,µ), we give conditions which force Lp(X,µ), for 1 ≤ p &l...
Abstract. For a complete measure space (X,Σ,µ), we give conditions which force Lp(X,µ), for 1 ≤ p &l...
AbstractAssume that (X,Σ,μ) is a measure space and p1,…,pn, r>0. We prove that {(f1,…,fn)∈Lp1×⋯×Lpn:...
We prove the result stated in the title. It comes as a consequence of the fact that the space Lp n L...
We prove the result stated in the title. It comes as a consequence of the fact that the space Lp n L...
In a first course in functional analysis, a great deal of time is spent with Banach spaces, especial...
We prove that every n-point subset of lp (1 ⩽ p ⩽ ∞) embeds isometrically into lpm, where lpm, and t...
We provide a representation of elements of the space lp(A,X) for a locally convex space X and 1≤p<∞ ...
AbstractThis paper gives new admissible values for the constant in Markov inequality in the p-metric...
The Bartle - Dunford - Schwartz integral.II. Lp-spaces, 1 ≤ p < ∞Panchapagesan T., Venkataramaiyer27...
Let $1\leq p<+\infty$ or $p=0$ and let $A=(a_n)_n$ be an increasing sequence of strictly positive we...
It is shown that the space of bounded linear operators on certain L∞-spaces is non-separable. These ...
In this thesis we recall the notion of a quasi-norm and a p-norm. We mention the Aoki-Rolewicz theor...
In this thesis we recall the notion of a quasi-norm and a p-norm. We mention the Aoki-Rolewicz theor...
AbstractIt is proved in the case of Lebesgue measure space(R+,Σ,m) that for any p ϵ (0,1) the spaces...
Abstract. For a complete measure space (X,Σ,µ), we give conditions which force Lp(X,µ), for 1 ≤ p &l...
Abstract. For a complete measure space (X,Σ,µ), we give conditions which force Lp(X,µ), for 1 ≤ p &l...
AbstractAssume that (X,Σ,μ) is a measure space and p1,…,pn, r>0. We prove that {(f1,…,fn)∈Lp1×⋯×Lpn:...
We prove the result stated in the title. It comes as a consequence of the fact that the space Lp n L...
We prove the result stated in the title. It comes as a consequence of the fact that the space Lp n L...
In a first course in functional analysis, a great deal of time is spent with Banach spaces, especial...
We prove that every n-point subset of lp (1 ⩽ p ⩽ ∞) embeds isometrically into lpm, where lpm, and t...
We provide a representation of elements of the space lp(A,X) for a locally convex space X and 1≤p<∞ ...
AbstractThis paper gives new admissible values for the constant in Markov inequality in the p-metric...
The Bartle - Dunford - Schwartz integral.II. Lp-spaces, 1 ≤ p < ∞Panchapagesan T., Venkataramaiyer27...
Let $1\leq p<+\infty$ or $p=0$ and let $A=(a_n)_n$ be an increasing sequence of strictly positive we...
It is shown that the space of bounded linear operators on certain L∞-spaces is non-separable. These ...
In this thesis we recall the notion of a quasi-norm and a p-norm. We mention the Aoki-Rolewicz theor...
In this thesis we recall the notion of a quasi-norm and a p-norm. We mention the Aoki-Rolewicz theor...
AbstractIt is proved in the case of Lebesgue measure space(R+,Σ,m) that for any p ϵ (0,1) the spaces...
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