A skew lattice is a mathematical structure that generalizes the concept of a lattice, extending it to cases where the order relation is not necessarily antisymmetric. In a typical lattice, every two elements have a unique least upper bound (join) and greatest lower bound (meet). However, in a skew lattice, this property can still hold, but elements may not adhere to the requirement of antisymmetry, meaning that two different elements can be comparable.
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