Normal modal logic

In logic, normal modal logic is a set L of modal formulas such that L contains

• all propositional tautologies,
• Kripke's schema: ${\displaystyle \Box (A\to B)\to (\Box A\to \Box B)}$,

and L is closed under

• substitution,
• detachment rule: from A and A→B infer B,
• necessitation rule: from A infer ${\displaystyle \Box A}$.

The minimal normal modal logic is known as K.

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