Some Consistent Power Constructions
Abstract
Consistent Hoare, Smyth and Plotkin power domains are introduced and discussed by Yuan and Kou. The consistent algebraic operation + defined by them is a binary partial Scott continuous operation satisfying the requirement: a+b exists whenever there exists a c which is greater than a and b. We extend the consistency to be a categorical concept and obtain an approach to generating consistent monads from monads on dcpos whose images equipped with some algebraic operations. Then we provide two new power constructions over domains: the consistent Plotkin index power domain and the consistent probabilistic power domain. Moreover, we verify these power constructions are free.
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