AbstractWe consider several properties that might be described as “monotonicity” or “absoluteness” that a norm may or may not have and give a complete set of implications among them. We also consider some related Hadamard-product inequalities under various normalizations
AbstractLet p be a norm on Kn, where K = R or K = C. If S ϵ Kn,n is a nonsingular matrix, let ps be ...
AbstractLet K be the field of real or complex numbers. A characterization of *orthant-monotonicity o...
AbstractA space X is acyclic monotonically normal if it has a monotonically normal operator M〈·,·〉 s...
AbstractWe consider several properties that might be described as “monotonicity” or “absoluteness” t...
AbstractOur main result is a list of characterizations of ∗orthant-monotonic norms
AbstractLet K be the field of real or complex numbers. A characterization of *orthant-monotonicity o...
AbstractLet p be a norm on Kn, where K = R or K = C. If S ϵ Kn,n is a nonsingular matrix, let ps be ...
AbstractWe survey various generalizations of matrix monotonicity. Of much interest to us are relatio...
summary:Let $\Bbb K$ be the field of real or complex numbers. In this note we characterize all inner...
AbstractThis paper gives a characterization of real vector norms with respect to the interval [ −1,1...
summary:Let $\Bbb K$ be the field of real or complex numbers. In this note we characterize all inner...
AbstractLet K be the field of real or complex numbers. A characterization of all inner product norms...
AbstractOur main result is a list of characterizations of ∗orthant-monotonic norms
In this paper monotone versions of some results on normality and on property (a) are investigated
AbstractIn real n-space the orthant monotonic norms of Gries [5] can be given a new characterization...
AbstractLet p be a norm on Kn, where K = R or K = C. If S ϵ Kn,n is a nonsingular matrix, let ps be ...
AbstractLet K be the field of real or complex numbers. A characterization of *orthant-monotonicity o...
AbstractA space X is acyclic monotonically normal if it has a monotonically normal operator M〈·,·〉 s...
AbstractWe consider several properties that might be described as “monotonicity” or “absoluteness” t...
AbstractOur main result is a list of characterizations of ∗orthant-monotonic norms
AbstractLet K be the field of real or complex numbers. A characterization of *orthant-monotonicity o...
AbstractLet p be a norm on Kn, where K = R or K = C. If S ϵ Kn,n is a nonsingular matrix, let ps be ...
AbstractWe survey various generalizations of matrix monotonicity. Of much interest to us are relatio...
summary:Let $\Bbb K$ be the field of real or complex numbers. In this note we characterize all inner...
AbstractThis paper gives a characterization of real vector norms with respect to the interval [ −1,1...
summary:Let $\Bbb K$ be the field of real or complex numbers. In this note we characterize all inner...
AbstractLet K be the field of real or complex numbers. A characterization of all inner product norms...
AbstractOur main result is a list of characterizations of ∗orthant-monotonic norms
In this paper monotone versions of some results on normality and on property (a) are investigated
AbstractIn real n-space the orthant monotonic norms of Gries [5] can be given a new characterization...
AbstractLet p be a norm on Kn, where K = R or K = C. If S ϵ Kn,n is a nonsingular matrix, let ps be ...
AbstractLet K be the field of real or complex numbers. A characterization of *orthant-monotonicity o...
AbstractA space X is acyclic monotonically normal if it has a monotonically normal operator M〈·,·〉 s...
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