A recursive approach for the enumeration of the homomorphisms from a poset P to the chain C3

Abstract

Let H(P,C3) be the set of order homomorphisms from a poset P to the chain C3 = 1 < 2 < 3. We develop a recursive approach for the calculation of the cardinality of H(P,C3), and we apply it on several types of posets, including P = C3 × C3 × Ck and P = H(Ck, C3); for the latter poset P, we derive a direct formula for \# H ( P, C3 ).