Abstract
If A is a bounded R ℓ -monoid or a pseudo-BL algebra, then it was proved that a subinterval [ a , b ] of A can be endowed with a structure of an algebra of the same kind as A. Similar results were obtained if A is a residuated lattice and a , b belong to the Boolean center of A. Given a bounded pseudo-hoop A, in this paper we will give conditions for a , b ∈ A for the subinterval [ a , b ] of A to be endowed with a structure of a pseudo-hoop. We will introduce the notions of Bosbach and Riečan states on a pseudo-hoop, we study their properties and we prove that any Bosbach state on a good pseudo-hoop is a Riečan state. For the case of a bounded Wajsberg pseudo-hoop we prove that the two states coincide. We also study the restrictions of Bosbach states on subinterval algebras of a pseudo-hoop.
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