A distributive lattice is a specific type of lattice in which the operations of meet (greatest lower bound) and join (least upper bound) distribute over each other. This means that for any three elements, the join distributes over meet and vice versa, leading to a structure where certain identities hold true, making it a more refined form of a lattice. This property connects to various types of mathematical structures, allowing for greater analysis and understanding of relationships among elements within a partially ordered set.
congrats on reading the definition of Distributive Lattice. now let's actually learn it.