Results 191 to 200 of about 236,033 (224)
Holonomy of the Planar Brownian Motion in a Poisson Punctured Plane. [PDF]
Commun Math PhysSauzedde I.
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Cyclic Evolution of Synergized Spin and Orbital Angular Momenta. [PDF]
Adv Sci (Weinh)Liu L +5 more
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PERSISTENT DIRAC OF PATHS ON DIGRAPHS AND HYPERGRAPHS. [PDF]
Found Data SciSuwayyid F, Wei GW.
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Modular geodesics and wedge domains in non-compactly causal symmetric spaces. [PDF]
Ann Glob Anal Geom (Dordr)Morinelli V, Neeb KH, Ólafsson G.
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Non-Abelian braiding of graph vertices in a superconducting processor [PDF]
Nature, 2023 Yuri D Lensky, M R Hoffmann, Jiun How Ng
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Elementary abelian operator groups [PDF]
Manuscripta Mathematica, 1994 Letp be a prime,n a positive integer. Suppose thatG is a finite solvablep'-group acted on by an elementary abelianp-groupA. We prove that ifCG(ϕ) is of nilpotent length at mostn for every nontrivial element ϕ ofA and |A|≥pn+1 thenG is of nilpotent length at mostn+1.
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1992
Elementary abelian groups can be thought of as additive groups of finite fields. As such, all of the tools of field theory are available to us in the study of orthomorphism graphs of these groups. In particular, any function from a finite field to itself, and thus any orthomorphism of the additive group of the field, can be realized as a polynomial ...
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Elementary abelian groups can be thought of as additive groups of finite fields. As such, all of the tools of field theory are available to us in the study of orthomorphism graphs of these groups. In particular, any function from a finite field to itself, and thus any orthomorphism of the additive group of the field, can be realized as a polynomial ...
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Groups with elementary Abelian centralizers of involutions
Algebra and Logic, 2007An involution i of a group G is said to be almost perfect in G if any two involutions of iG the order of a product of which is infinite are conjugated via a suitable involution in iG. We generalize a known result by Brauer, Suzuki, and Wall concerning the structure of finite groups with elementary Abelian centralizers of involutions to groups with ...
A. S. Kryukovskii, A. I. Sozutov
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Interlacing of elementary abelian groups
Mathematical Notes of the Academy of Sciences of the USSR, 1972A lattice of characteristic subgroups of multiple interlacings of finite elementary abelian groups by itself is established herein.
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