Results 11 to 20 of about 322,032 (291)
Goldie extending elements in modular lattices [PDF]
Mathematica Bohemica, 2017 The concept of a Goldie extending module is generalized to a Goldie extending element in a lattice. An element $a$ of a lattice $L$ with $0$ is said to be a Goldie extending element if and only if for every $b \leq a$ there exists a direct summand $c$ of
Shriram K. Nimbhorkar, Rupal C. Shroff
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pexm: A JAGS Module for Applications Involving the Piecewise Exponential Distribution
Journal of Statistical Software, 2021 In this study, we present a new module built for users interested in a programming language similar to BUGS to fit a Bayesian model based on the piecewise exponential (PE) distribution.
Vinícius D. Mayrink +2 more
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International Electronic Journal of Algebra, 2020 Summary: Here we introduce and study the concept of relative superfluous injectivity, which is a generalization of relative injectivity. We show some of the properties that hold true for relative injectivity still hold for relative superfluous injectivity. We also introduce and characterize the new concept of superfluous extending modules.
TABARAK, Manar E. +3 more
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Polytechnic and Design, 2015 The purpose of this article is to show how to extend PHP and build modules. Since PHP is built mostly with C, one must be familiar with C or at least with some programming constructs like variables, loops, structures, unions, macros etc. PHP modules are built when standard PHP abilities doesn’t fit developer’s needs and when a developer wants to create
Lozić, Davor, Šimec, Alen
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Mediterranean Journal of Mathematics, 2010 Let \(\tau\) be a hereditary torsion theory on the category of modules, and denote by \(\tau(M)\) the \(\tau\)-torsion submodule of a module \(M\). A submodule \(K\) of \(M\) is called \(\tau\)-large in \(M\) if for every submodule \(W\) of \(M\), \(K\cap W\subseteq\tau(M)\) implies \(W\subseteq\tau(M)\).
Ceken, Secil, Alkan, Mustafa
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Hacettepe Journal of Mathematics and Statistics, 2020 A submodule $N$ of a module $M$ is called d-closed if $M/N$ has a zero socle. D-closed submodules are similar concept to s-closed submodules, which are defined through nonsingular modules by Goodearl. In this article we deal with modules with the property that all d-closed submodules are direct summands (respectively, closed, pure). The structure of a
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Journal of Commutative Algebra, 2009 For local ring \(R\) and \(S\) and a flat local homomorphism \((R,{\mathbf m}) \rightarrow (S,{\mathbf n})\), a finitely generated \(S\)-module \(N\) is extended if there exists an \(R\)-module \(M\) such that \(S \otimes_R M\) is isomorphic to \(N\) as \(S\)-module.
Hassler, W., Wiegand, R.
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Notes on Approximately Pure Submodules
مجلة بغداد للعلوم, 2013 Let R be a commutative ring with identity 1 and M be a unitary left R-module. A submodule N of an R-module M is said to be approximately pure submodule of an R-module, if for each ideal I of R.
Baghdad Science Journal
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Chest-scale self-compensated epidermal electronics for standard 6-precordial-lead ECG
npj Flexible Electronics, 2022 Six chest leads are the standardized clinical devices of diagnosing cardiac diseases. Emerging epidermal electronics technology shift the dangling wires and bulky devices to imperceptible wearing, achieving both comfortable experience and high-fidelity ...
Lang Yin +8 more
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ON MONO-INJECTIVE MODULES AND MONO-OJECTIVE MODULES [PDF]
, 2013 In [5] and [6], we have introduced a couple of relative generalized epi-projectivities and given several properties of these projectivities. In this paper, we consider relative generalized injectivities that are dual to these relative projectivities and ...
Keskin Tütüncü, Derya +1 more
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