Results 31 to 40 of about 1,014,079 (278)
Simple endotrivial modules for quasi-simple groups [PDF]
Journal für die reine und angewandte Mathematik (Crelles Journal), 2013 Abstract We investigate simple endotrivial modules of finite quasi-simple groups and classify them in several important cases. This is motivated by a recent result of Robinson [Bull. Lond. Math. Soc. 43 (2011), 712–716] showing that simple endotrivial modules of most groups come from quasi-simple groups.
Lassueur Caroline +2 more
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On Lusztig’s Character Formula for Chevalley Groups of Type Al
MathematicsFor a Chevalley group G over an algebraically closed field K of characteristic p>0 with the irreducible root system R, Lusztig’s character formula expresses the formal character of a simple G-module by the formal characters of the Weyl modules and the ...
Sherali S. Ibraev +5 more
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Fuzzy Soc–Semi T–ABSO Modules and Related Conepts
Wasit Journal for Pure Sciences, 2023 In this study, the connection between the fuzzy semi T-ABSO module and the fuzzy socle is compared. In order to address this query, we provide an idea known as fuzzy socle semi-TABSO modules.
Wafaa Hanoon, Mustafa Salman (
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The structure of blocks with a Klein four defect group [PDF]
, 2011 We prove Erdmann’s conjecture [16] stating that every block with a Klein four defect group has a simple module with trivial source, and deduce from this that Puig’s finiteness conjecture holds for source algebras of blocks with a Klein four defect group.
A. Borel +44 more
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On Weakly Regular Rings and SSF-rings [PDF]
Al-Rafidain Journal of Computer Sciences and Mathematics, 2006 In this work we consider weakly regular rings whose simple singular right R-Modules are flat. We also consider the condition (*): R satisfies L(a)Ír(a) for any aÎR. We prove that if R satisfies(*) and whose simple singular right R-module are flat, then Z
Raida Mahmood
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Modules with Simple Multiplicity Modules
Journal of Algebra, 1995 Let \(G\) be a finite group, \(\mathcal O\) be a complete local commutative noetherian ring with an algebraically closed residue field \(k\) of nonzero characteristic \(p\). Let \(M\) be an indecomposable \({\mathcal O}G\)-module with vertex \(P\), \(\delta\) be a local point of \(P\) on \(\text{End}_{\mathcal O}(M)\) and \(V\) be the multiplicity \(k_*
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Restrictions of generalized Verma modules to symmetric pairs
, 2012 We initiate a new line of investigation on branching problems for generalized Verma modules with respect to complex reductive symmetric pairs (g,k). Here we note that Verma modules of g may not contain any simple module when restricted to a reductive ...
C Benson +10 more
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The Making Evidence-Based Medicine Simple Series — Diagnostic Testing Module
MedEdPORTAL, 2013 Introduction The Making Evidence Based Medicine Simple Series is an evidence-based clinical practice curriculum. It consists of six modules that review the articles types addressing the most common clinical questions (i.e., diagnosis, therapy, harm ...
Michael Mojica
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On GP-InjectivityWith Some Types of Rings [PDF]
مجلة التربية والعلم, 2007 The purpose of this paper is to study GP-injective modules and give some of it is properties. Also, we proved: (1) If every simple right R-module is GP-injective, and R is reversible ring, then R is a right weakly -regular.
Abdullah M. Abdul-Jabbar +1 more
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SIMPLE MULTIPLIERS ON BANACH MODULES [PDF]
Glasgow Mathematical Journal, 2003 Let \(A\) be a Banach algebra and \(X, Y\) be left Banach \(A\)-modules. A bounded linear operator \(T:X\to Y\) is said to be multiplier if it satisfies \(T(ax)=aTx\) \((a\in A, x\in X)\). In particular, a multiplier from \(X\) into \(\mathbb C_{\phi}\) is called a point multiplier. Here \(\mathbb C_{\phi}\) is the space of all complex numbers equipped
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