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Ukrainian Mathematical Journal, 2017
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Acta Mathematica Hungarica, 2002
In J. Algebra 221, 315--344 (1999; Zbl 0961.06005), the first author and \textit{F. Wehrung} introduced the lattice tensor product \(A\boxtimes B\) for lattices \(A\) and \(B\). Then the authors [in Part I of this series of papers in Acta Math. Hung. 95, 261--279 (2002; Zbl 0997.06002)] showed that if \(A\) is finite and \(B\) is bounded, then members ...
Grätzer, G., Greenberg, M.
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In J. Algebra 221, 315--344 (1999; Zbl 0961.06005), the first author and \textit{F. Wehrung} introduced the lattice tensor product \(A\boxtimes B\) for lattices \(A\) and \(B\). Then the authors [in Part I of this series of papers in Acta Math. Hung. 95, 261--279 (2002; Zbl 0997.06002)] showed that if \(A\) is finite and \(B\) is bounded, then members ...
Grätzer, G., Greenberg, M.
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ON THE TENSOR PRODUCTS OF JC-ALGEBRAS
The Quarterly Journal of Mathematics, 1994AbstractIn this article we introduce and develop a theory of tensor products of JW-algebras. Since JW-algebras are so close to W*-algebras, one can expect that the W*-algebra tensor product theory will be actively involved. It is shown that if Mand N are JW-algebras with centres Z1 and Z2 respectively, then Z1 ⊗ Z2 is not the centre of the JW-tensor ...
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CONNECTIVITY OF TENSOR PRODUCT OF GRAPHS
Discrete Mathematics, Algorithms and Applications, 2013In this paper, we determine the connectivity of G × Kr0,r1,…,rn-1, where × denotes the tensor product of graphs and Kr0,r1,…,rn-1 denotes the complete n-partite graph with [Formula: see text], and n ≥ 3. The main result of this paper deduces the main result of the paper appeared in Discrete Math. 311 (2011) 2563–2565 as a corollary.
P. Paulraja, V. Sheeba Agnes
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2002
Having considered bilinear maps, we now come to multilinear maps and basic theorems concerning their structure. There is a universal module representing multilinear maps, called the tensor product. We derive its basic properties, and postpone to Chapter XIX the special case of alternating products.
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Having considered bilinear maps, we now come to multilinear maps and basic theorems concerning their structure. There is a universal module representing multilinear maps, called the tensor product. We derive its basic properties, and postpone to Chapter XIX the special case of alternating products.
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Irreducible Tensor Products for Alternating Groups in Characteristic 5
Algebras and Representation Theory, 2020Lucia Morotti
exaly
Cohomology of twisted tensor products
Journal of Algebra, 2008Petter Andreas Bergh, Steffen Oppermann
exaly
Polynomials on Banach lattices and positive tensor products
Journal of Mathematical Analysis and Applications, 2012Qingying Bu, Gérard Buskes
exaly