Spreadability for Quantum Stochastic Processes, with an Application to Boolean Commutation Relations [PDF]
Entropy, 2020 In order to manage spreadability for quantum stochastic processes, we study in detail the structure of the involved monoids acting on the index-set of all integers Z , that is that generated by left and right hand-side partial shifts, the monoid of ...
Vitonofrio Crismale +2 more
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Left Annihilators Characterized by GPIS [PDF]
Transactions of the American Mathematical Society, 1995 Let R R be a semiprime ring with extended centroid
Tsiu-Kwen Lee
exaly +2 more sources
ON KERNELS AND ANNIHILATORS OF LEFT-REGULAR MAPPINGS IN d-ALGEBRAS
Honam Mathematical Journal, 2008 In this paper, left-regular maps on d-algebras are defined. These mappings show behaviors reminiscent of homomorphisms on d-algebras which have been studied elsewhere. In particular for these mappings kernels, annihilators and co-annihilators are defined and some of their properties are investigated, especially in the setting of positive implicative d ...
Sun-Shin Ahn, Keum-Sook So
exaly +2 more sources
On the lattice of left annihilators of certain rings [PDF]
Fundamenta Mathematicae, 1971 exaly +2 more sources
The radical property of rings such that every homomorphic image has no nonzero left annihilators [PDF]
Mathematische Nachrichten, 1971 Ferenc A Szasz
exaly +4 more sources
Remarks on my paper “The radical property of rings such that every homomorphic image has no nonzero left annihilators” [PDF]
Mathematische Nachrichten, 1974 Ferenc A Szasz
exaly +3 more sources
ON RINGS WHERE LEFT PRINCIPAL IDEALS ARE LEFT PRINCIPAL ANNIHILATORS
International Electronic Journal of Algebra, 2015 The rings in the title are studied and related to right principally injective rings. Many properties of these rings (called left pseudo-morphic by Yang) are derived, and conditions are given that an endomorphism ring is left pseudo-morphic. Some particular results: (1) Commutative pseudo-morphic rings are morphic; (2) Semiprime left pseudo-morphic ...
Camillo, Victor, Nicholson, W. Keith
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A Note on Skew Generalized Power Serieswise Reversible Property
International Journal of Analysis and Applications, 2023 The aim of this paper is to introduce and study (S, ω)-nil-reversible rings wherein we call a ring R is (S, ω)-nil-reversible if the left and right annihilators of every nilpotent element of R are equal.
Eltiyeb Ali
doaj +1 more source
LEFT ANNIHILATORS CHARACTERIZED BY DIFFERENTIAL IDENTITIES [PDF]
Proceedings of the Edinburgh Mathematical Society, 2004 AbstractLet $R$ be a semiprime ring with $U_{\trm{s}}$ its maximal symmetric ring of quotients and let $\rho_1$ and $\rho_2$ be two right ideals of $R$. We show that $\ell_R(\rho_1)=\ell_R(\rho_2)$ if and only if $\rho_1$ and $\rho_2$ satisfy the same differential identities with coefficients in $U_{\trm{s}}$, where $\ell_R(\rho_i)$ denotes the left ...
Lee, T.-K., Pan, C.-Y.
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Right-left asymmetry of inclusive hadron production in electron-positron annihilation [PDF]
Physics Letters B, 1976 Abstract We calculate a possible right-left asymmetry of inclusive hadron production in highly transversely polarized e + e − annihilation, which is, if successfully measured, an unambiguous clean evidence for parity violation.
R. Simard, M. Suzuki
openaire +3 more sources