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GENERALIZED COMMUTATION RELATIONS IN SPINOR ELECTRODYNAMICSGENERALIZED COMMUTATION RELATIONS IN SPINOR ELECTRODYNAMICS
On condensed forms for partially commuting matricesTwo complex n×n matrices A and B are said to be partially commuting if A and B have a common
Commutativity of projections and characterization of traces on Von Neumann algebrasWe find new necessary and sufficient conditions for the commutativity of projections in terms
A non-commutative Yosida-Hewitt theorem and convex sets of measurable operators closed locally in measureWe present a non-commutative extension of the classical Yosida-Hewitt decomposition of a finitely
Commutators of riesz potential in the vanishing generalized weighted morrey spaces with variable exponent commutators on the spaces Mp(.),φω(Ω) and VMp(.),φω(Ω). This result generalizes several existing results
Anisotropic fractional maximal commutators with BMO functions on anisotropic Morrey-type spaces of anisotropic fractional maximal commutator Mb,αd on anisotropic local Morrey-type spaces, when b belongs to BMO
Commutators of fractional maximal operator in variable Lebesgue spaces over bounded quasi-metric measure spacesWe study the fractional maximal commutators (Formula presented.) and the commutators (Formula
Some Characterizations of BMO Spaces via Commutators in Orlicz Spaces on Stratified Lie GroupsIn the paper we study the fractional maximal commutators Mb,α and the commutators of the fractional
Characterizations for the genuine Calderón-Zygmund operators and commutators on generalized Orlicz-Morrey spacesIn this article, we show continuity of commutators of Calderón-Zygmund operators [ b, T ] with BMO
An analog of the Hahn-Banach theorem for commutative semigroups commutative semigroup to functions defined on the entire semigroup is obtained.
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