Abstract
A method is given by which pseudocomplemented semilattices can be constructed from graphs. Two consequences of the method are obtained, namely: there exist continuum-many quasivarieties of pseudocomplemented semilattices; for any non-zero cardinal $\kappa$, there exist $\kappa$ pairwise non-isomorphic pseudocomplemented semilattices with isomorphic endomorphism monoids.
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