Results 231 to 240 of about 65,466 (259)
Research on Fatigue Damage and Pitting Mechanism of Gears in Offshore Wind Power. [PDF]
Materials (Basel)Zhu Z, He S, Wang Z, Ma Z.
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Area Law for the Entanglement Entropy of Free Fermions in Nonrandom Ergodic Field. [PDF]
Entropy (Basel)Pastur L, Shamis M.
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Entanglement Swapping Enables the Practical Security of Quantum Cryptography. [PDF]
Entropy (Basel)Jiang YF +11 more
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On a Product of Finite Monoids
Semigroup Forum, 1998The authors associate with a finite monoid \(S_0\) and \(m\) finite commutative monoids \(S_1,\dots,S_m\) a product \(\lozenge_m(S_m,\dots,S_1,S_0)\). There is a representation of the free objects in the pseudovariety \(\lozenge_m({\mathcal W}_m,\dots,{\mathcal W}_1,{\mathcal W}_0)\) generated by these \((m+1)\)-ary products where \(S_i\in{\mathcal W ...
Blanchet-Sadri, F., Gaddis, F. Dale
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Finite Groups With Product Fusion
The Annals of Mathematics, 1975In several recent papers concerning the classification of finite simple groups, the investigators were forced to treat subsidiary problems involving a group G whose Sylow 2-subgroup S is a direct product S = S, x S2 in which the fusion of 2-elements of G corresponds to that of the direct product of two groups having S, and S2, respectively, as their ...
Gorenstein, Daniel, Harris, Morton E.
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Products of Finite Supersoluble Groups
Algebra Colloquium, 2009Let H and T be subgroups of a finite group G. We say that H is completely c-permutable with T in G if there exists an element x ∈ 〈H,T〉 such that HTx= TxH. In this paper, we use this concept to determine the supersolubility of a group G = AB, where A and B are supersoluble subgroups of G.
Liu, Xi, Guo, Wenbin, Shum, K. P.
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Finite Products of Interpolating Blaschke Products
Journal of the London Mathematical Society, 1994The main result of this paper is a characterization of the Blaschke products \(B\) which are such that \(\tau_ \alpha (B)\) is a finite product of interpolating Blaschke products for all \(\alpha \in D\), the unit disc. That is Theorem. Let \(B\) be a finite product of interpolating Blaschke products. Let \(\{z_ n\}\) be the sequence of zeros of \(B\),
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Complete finite semidirect products and wreath products
Archiv der Mathematik, 2011A group \(G\) is `complete' if \(Z(G)=\{1\}\) and \(\Aut(G)=\mathrm{Inn}(G)\). This paper uses group cohomology to give a sufficient condition for a finite semidirect product \(G=N\rtimes H\) with \(C_G(N)\leq N\) to be complete and proves a partial converse.
Brewster, Ben, Wilcox, Elizabeth
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