Results 141 to 150 of about 3,750 (203)
Units with norm - 1 and signatures of units.
Journal für die reine und angewandte Mathematik (Crelles Journal), 1976 openaire +2 more sources
A graph-theoretic approach to ring analysis: Dominant metric dimensions in zero-divisor graphs. [PDF]
HeliyonAli N +4 more
europepmc +1 more source
Stem cells: units of development, units of regeneration, and units in evolution.
Cell, 2000 openaire +2 more sources
Entanglement growth from squeezing on the MPS manifold. [PDF]
Nat CommunLeontica S, Green AG.
europepmc +1 more source
Overcoming the coherence time barrier in quantum machine learning on temporal data. [PDF]
Nat CommunHu F +6 more
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Robustness of Topological Phases on Aperiodic Lattices. [PDF]
Math Phys Anal GeomLi Y.
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Journal of Combinatorial Theory - Series A, 2014 A necessary and sufficient condition is given for embedding a unital into a projective plane as a polar unital. A strengthened version of the condition is introduced and is shown to be necessary for a classical unital.
Hui, Alice M.W., Wong, Philip P.W.
exaly +2 more sources
Inequality for a trace on a unital C*-algebra [PDF]
Mathematical Notes, 2016 A new inequality for a trace on a unital C*-algebra is established. It is shown that the inequality obtained characterizes the traces in the class of all positive functionals on a unital C*-algebra/ A new criterion for the commutativity of unital C ...
Bikchentaev A M
exaly +1 more source
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Designs, Codes and Cryptography, 2007
Let \({\mathcal R}_k\) denote the Ree unital of order \(3^k\) for any odd integer \(k\geq 1\), and let \(G_k\) denote the associated Ree group naturally acting on this unital. In [\textit{H. Lüneburg}, J. Algebra 3, 256--259 (1966; Zbl 0135.39401)], it was shown that one cannot embed \({\mathcal R}_k\) in a finite projective plane \(\pi\) of order \(3^{
openaire +3 more sources
Let \({\mathcal R}_k\) denote the Ree unital of order \(3^k\) for any odd integer \(k\geq 1\), and let \(G_k\) denote the associated Ree group naturally acting on this unital. In [\textit{H. Lüneburg}, J. Algebra 3, 256--259 (1966; Zbl 0135.39401)], it was shown that one cannot embed \({\mathcal R}_k\) in a finite projective plane \(\pi\) of order \(3^{
openaire +3 more sources