Abstract
A pO-algebra $${(L; f, \, ^{\star})}$$ is an algebra in which (L; f) is an Ockham algebra, $${(L; \, ^{\star})}$$ is a p-algebra, and the unary operations f and $${^{\star}}$$ commute. Here we consider the endomorphism monoid of such an algebra. If $${(L; f, \, ^{\star})}$$ is a subdirectly irreducible pK 1,1- algebra then every endomorphism $${\vartheta}$$ is a monomorphism or $${\vartheta^3 = \vartheta}$$ . When L is finite the endomorphism monoid of L is regular, and we determine precisely when it is a Clifford monoid.
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