Results 221 to 230 of about 305,204 (290)

The Power of Protein Dynamics in Binding and Allostery. [PDF]

Biochemistry
Lee AL, Sapienza PJ.
europepmc   +1 more source

GEMDAT: A Python Toolkit for Site-Resolved Diffusion Analysis in Solid-State Molecular Dynamics

Lavrinenko AK, Famprikis T, Landgraf V, Heringa JR, Smeets S, Azizi V, Ciarella S, Wagemaker M, Vasileiadis A.   +8 more
europepmc   +1 more source

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Structure of quasi ordered ∗-vector spaces

2014
Let (𝑋,𝑋+) be a quasi ordered ∗-vector space with order unit, that is, a ∗-vector space 𝑋 with order unite together with a cone 𝑋+⊆𝑋. Our main goal is to find a condition weaker than properness of 𝑋, which suffices for fundamental results of ordered vector space theory to work.
Esslamzadeh, G. H., Moazami Goodarzi, M., Taleghani, F.   +2 more
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CHARACTERISATION OF EQUIVALENT NORMS ON A LINEAR SPACE USING EXPONENTIAL VECTOR SPACE

South East Asian J. of Mathematics and Mathematical Sciences, 2023
In this paper we have found a necessary and sufficient condition for equivalence of two norms on a linear space using the theory of exponential vector space.
Dhrubajyoti Biswas, Priti Sharma, S. Jana   +2 more
semanticscholar   +1 more source

Filters on a countable vector space

Fundamenta Mathematicae, 2021
We study various combinatorial properties, and the implications between them, for filters generated by infinite-dimensional subspaces of a countable vector space.
Iian B. Smythe
semanticscholar   +1 more source

Endomorphisms of a Partially Ordered Vector Space Without Order Unit

Journal of the London Mathematical Society, 1955
F. Bonsall
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Fuzzy topological ordered vector spaces I

Fuzzy Sets and Systems, 1993
zbMATH Open Web Interface contents unavailable due to conflicting licenses.
Bakier, M. Y., El-Saady, K.
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Disjointness in Partially Ordered Vector Spaces

Positivity, 2006
If \(X\) is a vector lattice, \(x,y\in X\) and \(| x| \wedge| y| =0\), then \(x\) and \(y\) are disjoint. This instance of disjointness amounts to the equality \(| x+y| =| x-y| \). In other words, any upper bound of \(x+y\) and \(-x-y\) is an upper bound of \(x-y\) and \(y-x\). The latter property does not involve the lattice structure of \(X\).
van Gaans, Onno, Kalauch, Anke
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Order-quasiultrabarrelled vector lattices and spaces

Periodica Mathematica Hungarica, 1975
1. Introduetion In this paper, we introduce and study a class of topological vector lattices (more generally, ordered topological vector spaces) which we call the class of order-quasiultrabarreUed vector lattices abbreviated to O. Q. U. vector lattices (respectively, O. Q. U. spaces).
Husain, T., Khaleelulla, S. M.
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