Modal operator


A modal connective is a logical connective for modal logic. It is an operator which forms propositions from propositions. In general, a modal operator has the "formal" property of being non-truth-functional in the following sense: The truth-value of composite formulae sometimes depend on factors other than the actual truth-value of their components. In the case of alethic modal logic, a modal operator can be said to be truth-functional in another sense, namely, that of being sensitive only to the distribution of truth-values across possible worlds, actual or not. Finally, a modal operator is "intuitively" characterized by expressing a modal attitude about the proposition to which the operator is applied.

Modality interpreted

There are several ways to interpret modal operators in modal logic, including:
alethic, deontic, axiological, epistemic, and doxastic.

Alethic

modal operators determine the fundamental conditions of possible worlds, especially causality, time-space parameters, and the action capacity of persons. They indicate the possibility, impossibility and necessity of actions, states of affairs, events, people, and qualities in the possible worlds.

Deontic

modal operators influence the construction of possible worlds as proscriptive or prescriptive norms, i.e. they indicate what is prohibited, obligatory, or permitted.

Axiological

modal operators transform the world's into values and disvalues as seen by a social group, a culture, or a historical period. Axiological modalities are highly subjective categories: what is good for one person may be considered as bad by another one.

Epistemic

modal operators reflect the level of knowledge, ignorance and belief in the possible world.

Doxastic

modal operators express belief in statements.

Boulomaic

Boulomaic modal operators express desire.