Results 261 to 270 of about 24,623 (305)

CONCAVE FUNCTIONS OF POSITIVE OPERATORS, SUMS AND CONGRUENCES (Prospects of non-commutative analysis in operator theory)

, 2010
Jean-Christophe Bourin, Eun‐Young Lee
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Behavioral TOPSIS technique based on probabilistic picture hesitant fuzzy probability splitting algorithm and novel interactive operations. [PDF]

Sci Rep
Cheng J, Ning B.
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Outermost-Strongly Solid Variety of Commutative Semigroups

, 2016
Sorasak Leeratanavalee
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A mathematical study of non-commutative probability theory

, 1974
Thomas K. Louton
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The Kazhdan-Lusztig polynomials arising in the modular representation theory of reductive algebraic groups(Combinatorial Theory and Related Topics : Mutual Relation among Commutative Algebra,Algebraic Geometry,Representation Theory of Lie Algebras and Partially Ordered Sets)

, 1988
Masaharu Kaneda
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On Commutativity and Strong Commutativity-Preserving Maps

Canadian Mathematical Bulletin, 1994
AbstractIf R is a ring and S ⊆ R, a mapping f:R —> R is called strong commutativity- preserving (scp) on S if [x, y] = [f(x),f(y)] for all x,y € S. We investigate commutativity in prime and semiprime rings admitting a derivation or an endomorphism which is scp on a nonzero right ideal.
Bell, Howard E., Daif, Mohamad Nagy
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Subgroups with large relative commutativity degree

Quaestiones Mathematicae, 2017
The order of subgroups with large relative commutativity degrees are determined. Also a relationship between the number of relative commutativity degrees of a group and the length of its subgroup chains is obtained.Mathematics Subject Classication (2010):
Hesam Safa
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Commutativity and Homotopy-Commutativity

1964
The aim of this section is to show, by means of the methods developed in Chapter 3, that for an associative H-space G there exist maps G× G → G satisfying certain commutativity conditions (Theorem 4.5). As will be explained in Remarks 4.6 this result is related to the work of other authors on homotopy-commutativity.
M. Arkowitz, C. R. Curjel
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On Non-Commutative Algebras and Commutativity Conditions

Results in Mathematics, 1990
A theorem of T. Nakayama states that an algebra \(A\) over an \({\mathcal N}\)- ring \(R\) is commutative if \(A\) satisfies the following condition: (N) For each \(x\) in \(A\), there exists \(f(X)\) in \(X^ 2 R[X]\) such that \(x-f(x)\) is central. More generally, W. Streb studied \(R\)-algebras \(A\) satisfying the following condition: (S) For each \
Komatsu, Hiroaki, Tominaga, Hisao
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Commutators and the Commutator Subgroup

The American Mathematical Monthly, 1977
(1977). Commutators and the Commutator Subgroup. The American Mathematical Monthly: Vol. 84, No. 9, pp. 720-722.
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