Abstract | ||
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We consider the set of equtional classes of finite functions endowed with the operation of class composition. Thus defined, this set gains a semigroup structure. This paper is a contribution to the understanding of this semigroup. We present several interesting properties of this semigroup. In particular, we show that it constitutes a topological semigroup that is profinite. |
Year | DOI | Venue |
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2013 | 10.1109/ISMVL.2013.48 | ISMVL |
Keywords | Field | DocType |
equtional class,set gain,semigroup structure,class composition,finite functions,equational classes,interesting property,topological semigroup,finite function,functions,lattices,group theory,boolean functions,cloning,measurement,topology | Boolean function,Discrete mathematics,Bicyclic semigroup,Cancellative semigroup,Algebra,Lattice (order),Group theory,Semigroup,Topological semigroup,Mathematics | Conference |
ISSN | Citations | PageRank |
0195-623X | 1 | 0.43 |
References | Authors | |
6 | 3 |
Name | Order | Citations | PageRank |
---|---|---|---|
J. Almeida | 1 | 61 | 15.24 |
Miguel Couceiro | 2 | 229 | 51.87 |
Tamás Waldhauser | 3 | 55 | 14.43 |