Results 271 to 280 of about 18,240 (305)
Modelling non-local cell-cell adhesion: a multiscale approach. [PDF]
Zhigun A, Rajendran ML.
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Generate what you can make: achieving in-house synthesizability with readily available resources in de novo drug design. [PDF]
Hassen AK +10 more
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Learning-based multi-objective hyper-heuristic algorithm for reconfigurable assembly line scheduling problems. [PDF]
Zhao H +5 more
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Minimum Vertex Cut with Reachable Set (MVCRS) Problem for Suppressing Botnet Propagation in IoT Networks: Complexity and Algorithms. [PDF]
Yamaguchi S.
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Solvability and approximate solvability of fuzzy relation equations*
International Journal of General Systems, 2003We give here a discussion of approximate solvability of a system of fuzzy relation equations. We demonstrate how problems of interpolation and approximation of fuzzy functions are connected with solvability of systems of fuzzy relation equations. First we explain the general framework, and later on we prove some particular results related to the ...
Irina Perfilieva
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CHARACTERIZATION OF SOLVABLE GROUPS AND SOLVABLE RADICAL
International Journal of Algebra and Computation, 2013We give a survey of new characterizations of finite solvable groups and the solvable radical of an arbitrary finite group which were obtained over the past decade. We also discuss generalizations of these results to some classes of infinite groups and their analogues for Lie algebras. Some open problems are discussed as well.
Fritz Grunewald +2 more
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Journal of Group Theory, 2003
A group \(G\) is called \(R^*\)-group if for all \(n>0\) and elements \(g\) and \(x_1,\dots,x_n\) the equation \(g^{x_1 }\cdots g^{x_n }=1\) implies \(g=1\). The following results are proved: (1) if \(G\) is an Abelian-by-nilpotent as well as nilpotent-by-Abelian \(R^*\)-group, then every partial order on \(G\) can be extented to a linear order; (2) if
LONGOBARDI, Patrizia +2 more
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A group \(G\) is called \(R^*\)-group if for all \(n>0\) and elements \(g\) and \(x_1,\dots,x_n\) the equation \(g^{x_1 }\cdots g^{x_n }=1\) implies \(g=1\). The following results are proved: (1) if \(G\) is an Abelian-by-nilpotent as well as nilpotent-by-Abelian \(R^*\)-group, then every partial order on \(G\) can be extented to a linear order; (2) if
LONGOBARDI, Patrizia +2 more
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Dominance solvability and cournot stability
In normal form games with single-valued best reply functions it is shown that dominance-solvability (resulting from successive elimination of dominated strategies) implies the global stability of the Cournot tatonnement process. When only two players are
Hervé Moulin
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Applicable Algebra in Engineering, Communication and Computing, 2003
This paper deals with the problem of determining whether a quintic polynomial is solvable, i.e. whether its roots are expressible by repeated radicals. Every irreducible quintic \(f(x)\) can be transformed, by two applications of Tschirnhausen transformations, into a so-called Brioschi quintic or Brioschi resolvent, with a parameter \(Z\) in the ...
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This paper deals with the problem of determining whether a quintic polynomial is solvable, i.e. whether its roots are expressible by repeated radicals. Every irreducible quintic \(f(x)\) can be transformed, by two applications of Tschirnhausen transformations, into a so-called Brioschi quintic or Brioschi resolvent, with a parameter \(Z\) in the ...
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On π-Solvable and Locally π-Solvable Groups with Factorization
Ukrainian Mathematical Journal, 2001Summary: We prove that in a locally \(\pi\)-solvable group \(G=AB\) with locally normal subgroups \(A\) and \(B\) there exist pairwise permutable Sylow \(\pi'\)- and \(p\)-subgroups \(A_{\pi'}\), \(A_p\) and \(B_{\pi'}\), \(B_p\), \(p\in\pi\), of the subgroups \(A\) and \(B\), respectively, such that \(A_{\pi'}B_{\pi'}\) is a Sylow \(\pi'\)-subgroup of
Chernikov, N. S., Putilov, S. V.
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