Results 171 to 180 of about 98,002 (213)
BOUNDS FOR THE RATIO AND DIFFERENCE BETWEEN PARALLEL SUM AND SERIES AND NONCOMMUTATIVE KANTOROVICH INEQUALITIES(Communication in commutative Banach algebras and several field of mathematics)openaire
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Finite Dimensionality in the Non-commutative Choquet Boundary: Peaking Phenomena and C*-Liminality
International mathematics research notices, 2020We explore the finite-dimensional part of the non-commutative Choquet boundary of an operator algebra. In other words, we seek finite-dimensional boundary representations. Such representations may fail to exist even when the underlying operator algebra
Raphael Clouatre, I. Thompson
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The Roots of Commutative Algebra in Algebraic Number Theory
Mathematics Magazine, 1995Israel Kleiner
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Commutative Algebras Associated with Classic Equations of Mathematical Physics
2012The idea of an algebraic-analytic approach to equations of mathematical physics means to find a commutative Banach algebra such that monogenic functions with values in this algebra have components satisfying to given equations with partial derivatives.
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THE TIDINGS of the Baltic State Fishing Fleet Academy Psychological and pedagogical sciences (Theory and methods of professional education)
The article is devoted to a detailed study of three fundamental algebraic laws – commutativity, associativity, and distributivity – in the context of training a mathematics teacher. It is emphasized that the depth of understanding of these laws determines the teacher's ability to foster genuine algebraic thinking in students. Through an analysis of the
E. E. Alexeeva, E. A. Silnova
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The article is devoted to a detailed study of three fundamental algebraic laws – commutativity, associativity, and distributivity – in the context of training a mathematics teacher. It is emphasized that the depth of understanding of these laws determines the teacher's ability to foster genuine algebraic thinking in students. Through an analysis of the
E. E. Alexeeva, E. A. Silnova
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Completion and Torsion Over Commutative DG Rings
Israel Journal of Mathematics, 2016Let CDGcont be the category whose objects are pairs ($$(A, \bar{\mathfrak{a}})$$(Aa¯)), where A is a commutative DG-algebra and $$\bar{\mathfrak{a}} \subseteq {{\rm{H}}^0}\left( A \right)$$a¯⊆H0(A) is a finitely generated ideal, and whose morphisms $$f ...
Liran Shaul
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Using the Steinberg algebra model to determine the center of any Leavitt path algebra
Israel Journal of Mathematics, 2016Given an arbitrary graph, we describe the center of its Leavitt path algebra over a commutative unital ring. Our proof uses the Steinberg algebra model of the Leavitt path algebra.
L. O. Clark +3 more
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Graduate Studies in Mathematics, 2019
We define a Hopf algebra and give a variety of examples of varying complexity. To facilitate the definition, we first define the commutative diagram, the tensor product, and an algebra/coalgebra/bialgebra.
Owen Sharpe, M. Mastnak, N. Sasakura
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We define a Hopf algebra and give a variety of examples of varying complexity. To facilitate the definition, we first define the commutative diagram, the tensor product, and an algebra/coalgebra/bialgebra.
Owen Sharpe, M. Mastnak, N. Sasakura
semanticscholar +1 more source
Commutative Monoids, Noncommutative Rings and Modules
New Perspectives in Algebra, Topology and Categories, 2021A. Facchini
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