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Idempotent (ring theory)
Single Elements
ON FULLY IDEMPOTENT RINGS 1. Introduction Throughout This Note
Idempotent Lifting and Ring Extensions
SPECIAL CLEAN ELEMENTS in RINGS 1. Introduction for Any Unital
A GENERALIZATION of BAER RINGS K. Paykan1 §, A. Moussavi2
Recollements of Module Categories 2
On Unit-Central Rings
Idempotents in Ring Extensions Introduction
Idempotents and Units of Matrix Rings Over Polynomial Rings
Fixed Points Results in Algebras of Split Quaternion and Octonion
The Radical-Annihilator Monoid of a Ring,” 2016
Fully Idempotent and Multiplication Modules Nil ORHAN ERTA¸S
Rings in Which Every Unit Is a Sum of a Nilpotent and an Idempotent
Idempotents and Units of Matrix Rings Over Polynomial Rings
Noncommutative Ring Theory Notes
Is a Commutative Ring with Unity. It Is the Smallest Subring of C Containing Z and I
Actions of Locally Compact (Quantum) Groups on Ternary Rings of Operators
Solutions to Assignment 5
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An Introduction to Idempotency Jeremy Gunawardena Basic Research Institute in the Mathematical Sciences HP Laboratories Bristol HPL-BRIMS-96-24 September, 1996
Corner Ring Theory: a Generalization of Peirce Decompositions, I T
Exercises Algebra II (Commutative Algebra) Prof
Principal Ideal Rings and a Condition of Kummer
A Variant of NTRU with Split Quaternions Algebra Khushboo Thakur and B.P.Tripathi
On Weakly Von Neumann Regular Rings
P. V. Danchev on the IDEMPOTENT and NILPOTENT SUM NUMBERS
Structure of Weak Idempotent Rings
Idempotent Simple Algebras ∗
SEMIHEREDITARY RINGS 1. Introduction. a Ring Is (Right
Rings Involving Idempotents, Units and Nilpotent Elements 3
Split Quaternions, Generalized Quaternions and Integer-Valued Polynomials
On a Generalisation of Self-Injective Von Neumann Regular Rings
A Note on Baer Rings
Relation Algebras, Idempotent Semirings and Generalized Bunched Implication Algebras Peter Jipsen Chapman University,
[email protected]
Clear Elements and Clear Rings
On Elements of Split Quaternions Over Zp
Rings with Central Idempotent Or Nilpotent Elements
LTCC Representation Theory Matt Fayers, Based on Notes by Markus Linckelmann