Partial magmatic bialgebras

Abstract

A partial magmatic bialgebra, (T;S)-magmatic bialgebra where T ⊂ S are subsets of the set of positive integers, is a vector space endowed with an n-ary operation for each n in S and an m-ary co-operation for each m in T satisfying some compatibility and unitary relations. We prove an analogue of the Poincar\'e-Birkhoff-Witt theorem for these partial magmatic bialgebras.