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Deontik

Deontik, or deontic modality, is the branch of philosophy and formal logic that concerns normative concepts such as obligation, permission, and prohibition. The term is commonly used to refer to deontic logic, the study of normative statements and the rules that govern them. In formal treatments, deontic operators express what ought to be the case within a system of norms, laws, or rules.

The standard operators are O for obligatory, P for permissible, and F for forbidden. Oφ reads “it

Historical roots trace to G. H. von Wright in the 1950s, who introduced formal deontic logic. Since

Applications of deontik span philosophy, law, political theory, linguistics, and computer science, where it provides a

is
obligatory
that
φ,”
Pφ
reads
“it
is
permissible
that
φ,”
and
Fφ
reads
“it
is
forbidden
that
φ.”
In
many
logics
Fφ
is
defined
as
the
negation
of
Pφ,
while
others
treat
prohibition
as
a
primitive
notion
distinct
from
permission.
To
handle
context-sensitive
norms
and
conditional
obligations,
some
frameworks
use
dyadic
forms
such
as
O(φ|ψ),
meaning
φ
is
obligatory
given
ψ.
Dyadic
approaches
help
address
problems
that
arise
in
monadic
deontic
logic,
such
as
contrary-to-duty
scenarios
and
related
paradoxes.
then,
the
field
has
developed
with
various
systems
and
refinements,
including
conditional
or
dyadic
deontic
logics
and
analyses
of
normative
contradictions.
These
tools
are
used
to
model
ethical
theories,
legal
norms,
contracts,
and
other
normative
systems,
and
to
support
normative
reasoning
in
artificial
intelligence
and
multi-agent
frameworks.
formal
vocabulary
for
expressing
duties,
permissions,
and
prohibitions
and
for
analyzing
the
implications
of
normative
rules.