Results 101 to 110 of about 366 (139)

Absolutely closed semigroups. [PDF]

Rev R Acad Cienc Exactas Fis Nat A Mat
Banakh T, Bardyla S.
europepmc   +1 more source

Three-Space as a Quantum Hyperlayer in 1+3 Dimensions: A Case Study in Quantum Space and Time. [PDF]

Entropy (Basel)
Czachor M.
europepmc   +1 more source

Non-commutative L p spaces and Grassmann stochastic analysis. [PDF]

Probab Theory Relat Fields
De Vecchi F, Fresta L, Gordina M, Gubinelli M.   +3 more
europepmc   +1 more source

On The Irreducible Representations Of A Finite Semigroup

, 2009
Work of Clifford, Munn and Ponizovskii parameterized the irreducible representations of a finite semigroup in terms of the irreducible representations of its maximal subgroups. Explicit constructions of the irreducible representations were later obtained
Mazorchuk, V., Ganyushkin, O., Styeinberg, B.   +2 more
core  

Dots and lines : geometric semigroup theory and finite presentability

, 2015
Geometric semigroup theory means different things to different people, but it is agreed that it involves associating a geometric structure to a semigroup and deducing properties of the semigroup based on that structure.
Awang, Jennifer S.
core  

A construction principle and compact clifford semigroups

Semigroup Forum, 1971
openaire   +2 more sources

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The Semigroup Structure of Left Clifford Semirings

Acta Mathematica Sinica, English Series, 2003
A left zero band semiring is a semiring whose additive reduct is a left zero band and whose multiplicative reduct is a band. A left ring is the direct product of a left zero band semiring and a ring, and a left Clifford semiring is a distributive lattice of left rings.
Kar Ping Shum, M K Sen, Sen M K
exaly   +2 more sources

LeftRight Clifford Semigroups

Springer Proceedings in Mathematics and Statistics, 2015
Clifford semigroups are certain interesting class semigroups and looking for regular semigroups close to this is natural. Here we discuss the leftright Clifford semigroups.
exaly   +2 more sources

Weak containment and Clifford semigroups

Proceedings of the Royal Society of Edinburgh: Section A Mathematics, 1978
SynopsisLet S be a Clifford semigroup with identity. The weak containment question is posed for S, and answered affirmatively when each of the maximal groups Se in S is amenable. The amenability of S itself is characterised in terms of PL(S), the set of normalised positive definite functions on S arising from the left regular representation of S.
Alan L. T. Paterson
openaire   +3 more sources

Clifford Regular Domains

Journal of Algebra, 2001
The class semigroup of a commutative integral domain R is the semigroup S(R) of the isomorphism classes of the nonzero ideals of R with operation induced by multiplication. A domain Ris said to be Clifford regular if S(R) is a Clifford semigroup, i.e.
Silvana Bazzoni
exaly   +2 more sources