Galois Connection for Hyperclones

This paper is inspired by the paper of Tarasov in which he investigates maximal partial clones on a two-element set. It happens that the approach of Tarasov can be translated into the language of hyperclone theory. He introduced a notion of quasicomposition which assigns to extended hyperoperations extension of their composition. We introduce a new operation in the set of extended hyperoperation and define a quasiclone as a composition closed set of extended hyperoperations containing all projections which is closed with respect to the new operation. For a Galois connection between sets of extended hyperoperations and power relations, we prove that the set e Pol R of all extended hyperoperations e-preserving every relation ρ ∈ R is a quasiclone and that each quasiclone is of the form e Pol R for a set R of relations on the power set of A without empty-set. Finally, we re-state results of Tarasov in hyperclone framework.