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An Integrated Testbed for MITRE-Mapped Attack Emulation in Industrial Control Networks. [PDF]
Sensors (Basel)Rahmani J, Detken KO, Sikora A.
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From chessboard of bipolarons of size 4a in cubic [Formula: see text] to stripes of the same bipolarons in layered high [Formula: see text] cuprates. [PDF]
Sci RepHennion M +3 more
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Equilibria in security markets with a continuum of agents [PDF]
Martins-da-Rocha, Victor Filipe +2 more
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Disjointness in Partially Ordered Vector Spaces
Positivity, 2006If \(X\) 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, 19751. 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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An algebraic ordered extension of vector space
Transactions of A Razmadze Mathematical Institute, 2018 zbMATH Open Web Interface contents unavailable due to conflicting licenses.
Sandip Jana
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Vector Lattices Associated with Ordered Vector Spaces
Mediterranean Journal of Mathematics, 2010The vector lattice generated by a real Archimedean vector space \(V\) is considered. It is proved that the cone \(C\) of all positive linear forms on \(V\) separates elements of \(V\). Then the positive linear forms are determined in terms of conical measures on the cone \(C\).
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Fuzzy topological ordered vector spaces I
Fuzzy Sets and Systems, 1993zbMATH Open Web Interface contents unavailable due to conflicting licenses.
Kamal El-Saady
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Endomorphisms of Partially Ordered Vector Spaces
Journal of the London Mathematical Society, 1955A vector space V over the real field R is said to be partially ordered if a non-empty subset F + is specified which satisfies the following axioms: (i) if x and y are in V and oc 0, then x + y and VLX are in V) (ii) if x and — x are in T then x = 0.
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