A residuated lattice is a specific type of algebraic structure that arises in the study of lattice theory, as well as in the analysis of certain types of ordered sets and algebraic systems. It combines the properties of a lattice with additional operations that allow for the definition of residuals. Here are the key features that characterize a residuated lattice: 1. **Lattice Structure**: A residuated lattice is first and foremost a lattice.
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