论文信息 - Discrete (set) derivatives and "algebraic" fuzzy logic operations

Discrete (set) derivatives and "algebraic" fuzzy logic operations

We propose a new way to generalize logical operations from the discrete classical logic to a continuous fuzzy logic, namely we propose to define derivatives for the discrete case, and then to use these derivatives to derive the continuous operations. We show that this natural approach leads to "algebraic" fuzzy operations a/spl middot/b and a+b-a/spl middot/b.

Vladik Kreinovich | Bernadette Bouchon-Meunier | Hung T Nguyen

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