Multi-argument specialization semilattices

Abstract

If X is a closure space with closure K, we consider the semilattice ( P(X), ) endowed with further relations x y1, y2, …, yn (a distinct n+1-ary relation for each n ≥ 1), whose interpretation is x ⊂eq Ky1 Ky2 … Kyn . We present axioms for such "multi-argument specialization semilattices" and show that this list of axioms is complete for substructures, namely, every model satisfying the axioms can be embedded into some structure originated by some closure space as in the previous sentence. We also provide a canonical embedding of a multi-argument specialization semilattice into (the reduct of) some closure semilattice.