Definition:Binding Priority/Propositional Logic

Definition
The binding priority convention which is almost universally used for the connectives of propositional logic is:


 * $(1): \quad \neg$ binds more tightly than $\lor$ and $\land$
 * $(2): \quad \lor$ and $\land$ bind more tightly than $\implies$ and $\Longleftarrow$
 * $(3): \quad \implies$ and $\Longleftarrow$ bind more tightly than $\iff$

Note that there is no overall convention defining which of $\land$ and $\lor$ bears a higher binding priority, and therefore we consider them to have equal priority.

Because of this fact, unless specifically defined, expressions such as $p \land q \lor r$ can not be interpreted unambiguously, and parenthesis must be used to determine the exact priorities which are to be used to interpret particular statements which may otherwise be ambiguous.

Most sources do not recognise the use of $\Longleftarrow$ as a separate connective from $\implies$, so the priority of one over the other is rarely a question.

Also known as
The binding priority of a system of connectives can also be seen referred to as their precedence.

Also defined as
Some sources do impose a priority of $\land$ over $\lor$, but this is not a universal convention.

Similarly artificial is any priority imposed of $\implies$ over $\Longleftarrow$.