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In mathematics, a propositional formula is often more briefly referred to as a "proposition", but, more precisely, a propositional formula is not a proposition but a formal expression that denotes a proposition, a formal object under discussion, just like an expression such as "x + y" is not a value, but denotes a value. In some contexts ...
If p is an elementary proposition, ~p is an elementary proposition. Pp 1.71. If p and q are elementary propositions, p ∨ q is an elementary proposition. Pp 1.72. If φp and ψp are elementary propositional functions which take elementary propositions as arguments, φp ∨ ψp is an elementary proposition. Pp
A definition of something as the unique object with a given property descriptive function A function taking values that need not be truth values, in other words what is not called just a function. diversity The inequality relation domain The domain of a relation R is the class of x such that xRy for some y. elementary proposition
Definition 1: Atomic propositional variables are formulas. Definition 2: If is a propositional connective, and A, B, C, … is a sequence of m, possibly but not necessarily atomic, possibly but not necessarily distinct, formulas, then the result of applying to A, B, C, … is a formula.
Given a formula X, the negation ¬X is a formula. Given two formulas X and Y, and a binary connective b (such as the logical conjunction ∧), the expression (X b Y) is a formula. (Note the parentheses.) Through this construction, all of the formulas of propositional logic can be built up from propositional variables as a basic unit.
The definition of a formal proof is intended to capture the concept of proofs as written in the practice of mathematics. The soundness of this definition amounts to the belief that a published proof can, in principle, be converted into a formal proof. However, outside the field of automated proof assistants, this is rarely done in practice.
No elementary proof of the prime number theorem is known, and one may ask whether it is reasonable to expect one. Now we know that the theorem is roughly equivalent to a theorem about an analytic function, the theorem that Riemann's zeta function has no roots on a certain line. A proof of such a theorem, not fundamentally dependent on the ...
A sentence can be viewed as expressing a proposition, something that must be true or false. The restriction of having no free variables is needed to make sure that sentences can have concrete, fixed truth values: as the free variables of a (general) formula can range over several values, the truth value of such a formula may vary.