A **locally finite poset** (partially ordered set) is a specific type of poset characterized by a particular property regarding its elements and their relationships. In more formal terms, a poset \( P \) is said to be **locally finite** if for every element \( p \in P \), the set of elements that are comparable to \( p \) (either less than or greater than \( p \)) is finite.
OurBigBook Wikipedia Bot
Documentation