Propositional calculus

Propositional logic (also called sentential calculus or sentential logic) is the branch of mathematical logic concerned with the study of propositions (whether they're true or false) and formed by other propositions with the use of logical connectives, and how their value depends on the truth value of their components. Logical connectives are found in natural languages. In English for example, some examples are "and" (conjunction), "or" (disjunction), "not” (negation) and "if" (but only when used to denote material conditional).

The following is an example of a very simple inference within the scope of propositional logic:

Premise 1: If it's raining then it's cloudy.

Premise 2: It's raining.

Conclusion: It's cloudy.

Both premises and the conclusions are propositions. The premises are taken for granted and then with the application of modus ponens (an inference rule) the conclusion follows.

As propositional logic is not concerned with the structure of propositions beyond the point where they can't be decomposed anymore by logical connectives, this inference can be restated replacing those atomic statements with statement letters, which are interpreted as variables representing statements:

Premise 1: P \to Q

Premise 2: P

Conclusion: Q

The same can be stated succinctly in the following way:

P \to Q, P \vdash Q

When P is interpreted as “It's raining” and Q as “it's cloudy” the above symbolic expressions can be seen to exactly correspond with the original expression in natural language. Not only that, but they will also correspond with any other inference of this form, which will be valid on the same basis that this inference is.

Propositional logic may be studied through a formal system in which formulas of a formal language may be interpreted to represent propositions. A system of inference rules and axioms allows certain formulas to be derived. These derived formulas are called theorems and may be interpreted to be true propositions. A constructed sequence of such formulas is known as a derivation or proof and the last formula of the sequence is the theorem. The derivation may be interpreted as proof of the proposition represented by the theorem.

When a formal system is used to represent formal logic, only statement letters are represented directly. The natural language propositions that arise when they're interpreted are outside the scope of the system, and the relation between the formal system and its interpretation is likewise outside the formal system itself.

Usually in truth-functional propositional logic, formulas are interpreted as having either a truth value of true or a truth value of false. Truth-functional propositional logic and systems isomorphic to it, are considered to be zeroth-order logic.

History

Although propositional logic (which is interchangeable with propositional calculus) had been hinted by earlier philosophers, it was developed into a formal logic by Chrysippus in the 3rd century BC^[1] and expanded by the Stoics. The logic was focused on propositions. This advancement was different from the traditional syllogistic logic which was focused on terms. However, later in antiquity, the propositional logic developed by the Stoics was no longer understood . Consequently, the system was essentially reinvented by Peter Abelard in the 12th century.^[2]

Propositional logic was eventually refined using [3]

Just as propositional logic can be considered an advancement from the earlier syllogistic logic, Gottlob Frege's predicate logic was an advancement from the earlier propositional logic. One author describes predicate logic as combining "the distinctive features of syllogistic logic and propositional logic."^[4] Consequently, predicate logic ushered in a new era in logic's history; however, advances in propositional logic were still made after Frege, including Natural Deduction, Truth-Trees and Truth-Tables. Natural deduction was invented by Gerhard Gentzen and Jan Łukasiewicz. Truth-Trees were invented by Evert Willem Beth.^[5] The invention of truth-tables, however, is of controversial attribution.

Within works by Frege^[6] and Bertrand Russell,^[7] one finds ideas influential in bringing about the notion of truth tables. The actual 'tabular structure' (being formatted as a table), itself, is generally credited to either Ludwig Wittgenstein or Emil Post (or both, independently).^[6] Besides Frege and Russell, others credited with having ideas preceding truth-tables include Philo, Boole, Charles Sanders Peirce, and Ernst Schröder. Others credited with the tabular structure include Łukasiewicz, Schröder, Alfred North Whitehead, William Stanley Jevons, John Venn, and Clarence Irving Lewis.^[7] Ultimately, some have concluded, like John Shosky, that "It is far from clear that any one person should be given the title of 'inventor' of truth-tables.".^[7]

Terminology

In general terms, a calculus is a formal system that consists of a set of syntactic expressions (well-formed formulas), a distinguished subset of these expressions (axioms), plus a set of formal rules that define a specific binary relation, intended to be interpreted to be logical equivalence, on the space of expressions.

When the formal system is intended to be a logical system, the expressions are meant to be interpreted to be statements, and the rules, known to be inference rules, are typically intended to be truth-preserving. In this setting, the rules (which may include axioms) can then be used to derive ("infer") formulas representing true statements from given formulas representing true statements.

The set of axioms may be empty, a nonempty finite set, a countably infinite set, or be given by axiom schemata. A formal grammar recursively defines the expressions and well-formed formulas of the language. In addition a semantics may be given which defines truth and valuations (or interpretations).

The language of a propositional calculus consists of

1. a set of primitive symbols, variously referred to be atomic formulas, placeholders, proposition letters, or variables, and
2. a set of operator symbols, variously interpreted to be logical operators or logical connectives.

A well-formed formula is any atomic formula, or any formula that can be built up from atomic formulas by means of operator symbols according to the rules of the grammar.

Mathematicians sometimes distinguish between propositional constants, propositional variables, and schemata. Propositional constants represent some particular proposition, while propositional variables range over the set of all atomic propositions. Schemata, however, range over all propositions. It is common to represent propositional constants by A, B, and C, propositional variables by P, Q, and R, and schematic letters are often Greek letters, most often φ, ψ, and χ.

Basic concepts

The following outlines a standard propositional calculus. Many different formulations exist which are all more or less equivalent but differ in the details of:

1. their language, that is, the particular collection of primitive symbols and operator symbols,
2. the set of axioms, or distinguished formulas, and
3. the set of inference rules.

Any given proposition may be represented with a letter called a 'propositional constant', analogous to representing a number by a letter in mathematics, for instance, a = 5. All propositions require exactly one of two truth-values: true or false. For example, let P be the proposition that it is raining outside. This will be true (P) if it is raining outside and false otherwise (¬P).

• We then define truth-functional operators, beginning with negation. (¬P represents the negation of P, which can be thought of as the denial of P. In the example above, (¬P expresses that it is not raining outside, or by a more standard reading: "It is not the case that it is raining outside." When P is true, (¬P is false; and when P is false, (¬P is true. {(¬¬P always has the same truth-value as P.
• Conjunction is a truth-functional connective which forms a proposition out of two simpler propositions, for example, P and Q. The conjunction of P and Q is written P ∧ Q, and expresses that each are true. We read P ∧ Q for "P and Q". For any two propositions, there are four possible assignments of truth values:
• P is true and Q is true
• P is true and Q is false
• P is false and Q is true
• P is false and Q is false

The conjunction of P and Q is true in case 1 and is false otherwise. Where P is the proposition that it is raining outside and Q is the proposition that a cold-front is over Kansas, P ∧ Q is true when it is raining outside and there is a cold-front over Kansas. If it is not raining outside, then P ∧ Q is false; and if there is no cold-front over Kansas, then P ∧ Q is false.

• Disjunction resembles conjunction in that it forms a proposition out of two simpler propositions. We write it P ∨ Q, and it is read "P or Q". It expresses that either P or Q is true. Thus, in the cases listed above, the disjunction of P and Q is true in all cases except 4. Using the example above, the disjunction expresses that it is either raining outside or there is a cold front over Kansas. (Note, this use of disjunction is supposed to resemble the use of the English word "or". However, it is most like the English inclusive "or", which can be used to express the truth of at least one of two propositions. It is not like the English exclusive "or", which expresses the truth of exactly one of two propositions. That is to say, the exclusive "or" is false when both P and Q are true (case 1). An example of the exclusive or is: You may have a bagel or a pastry, but not both. Often in natural language, given the appropriate context, the addendum "but not both" is omitted but implied. In mathematics, however, "or" is always inclusive or; if exclusive or is meant it will be specified, possibly by "xor".)
• Material conditional also joins two simpler propositions, and we write P → Q, which is read "if P then Q". The proposition to the left of the arrow is called the antecedent and the proposition to the right is called the consequent. (There is no such designation for conjunction or disjunction, since they are commutative operations.) It expresses that Q is true whenever P is true. Thus it is true in every case above except case 2, because this is the only case when P is true but Q is not. Using the example, if P then Q expresses that if it is raining outside then there is a cold-front over Kansas. The material conditional is often confused with physical causation. The material conditional, however, only relates two propositions by their truth-values—which is not the relation of cause and effect. It is contentious in the literature whether the material implication represents logical causation.
• Biconditional joins two simpler propositions, and we write P ↔ Q, which is read "P if and only if Q". It expresses that P and Q have the same truth-value, thus P if and only if Q is true in cases 1 and 4, and false otherwise.

It is extremely helpful to look at the truth tables for these different operators, as well as the method of analytic tableaux.

Closure under operations

Propositional logic is closed under truth-functional connectives. That is to say, for any proposition φ, ¬φ is also a proposition. Likewise, for any propositions φ and ψ, φ ∧ ψ is a proposition, and similarly for disjunction, conditional, and biconditional. This implies that, for instance, φ ∧ ψ is a proposition, and so it can be conjoined with another proposition. In order to represent this, we need to use parentheses to indicate which proposition is conjoined with which. For instance, P ∧ Q ∧ R is not a well-formed formula, because we do not know if we are conjoining P ∧ Q with R or if we are conjoining P with Q ∧ R. Thus we must write either (P ∧ Q) ∧ R to represent the former, or P ∧ (Q ∧ R) to represent the latter. By evaluating the truth conditions, we see that both expressions have the same truth conditions (will be true in the same cases), and moreover that any proposition formed by arbitrary conjunctions will have the same truth conditions, regardless of the location of the parentheses. This means that conjunction is associative, however, one should not assume that parentheses never serve a purpose. For instance, the sentence P ∧ (Q ∨ R) does not have the same truth conditions of (P ∧ Q) ∨ R, so they are different sentences distinguished only by the parentheses. One can verify this by the truth-table method referenced above.

Note: For any arbitrary number of propositional constants, we can form a finite number of cases which list their possible truth-values. A simple way to generate this is by truth-tables, in which one writes P, Q, ..., Z, for any list of k propositional constants—that is to say, any list of propositional constants with k entries. Below this list, one writes 2^k rows, and below P one fills in the first half of the rows with true (or T) and the second half with false (or F). Below Q one fills in one-quarter of the rows with T, then one-quarter with F, then one-quarter with T and the last quarter with F. The next column alternates between true and false for each eighth of the rows, then sixteenths, and so on, until the last propositional constant varies between T and F for each row. This will give a complete listing of cases or truth-value assignments possible for those propositional constants.

Argument

The propositional calculus then defines an argument to be a set of propositions. A valid argument is a set of propositions, the last of which follows from—or is implied by—the rest. All other arguments are invalid. The simplest valid argument is modus ponens, one instance of which is the following set of propositions:

\begin{array}{rl} 1. & P \to Q \\ 2. & P \\ \hline \therefore & Q \end{array}

This is a set of three propositions, each line is a proposition, and the last follows from the rest. The first two lines are called premises, and the last line the conclusion. We say that any proposition C follows from any set of propositions (P_1, ..., P_n), if C must be true whenever every member of the set (P_1, ..., P_n) is true. In the argument above, for any P and Q, whenever P → Q and P are true, necessarily Q is true. Notice that, when P is true, we cannot consider cases 3 and 4 (from the truth table). When P → Q is true, we cannot consider case 2. This leaves only case 1, in which Q is also true. Thus Q is implied by the premises.

This generalizes schematically. Thus, where φ and ψ may be any propositions at all,

\begin{array}{rl} 1. & \varphi \to \psi \\ 2. & \varphi \\ \hline \therefore & \psi \end{array}

Other argument forms are convenient, but not necessary. Given a complete set of axioms (see below for one such set), modus ponens is sufficient to prove all other argument forms in propositional logic, thus they may be considered to be a derivative. Note, this is not true of the extension of propositional logic to other logics like first-order logic. First-order logic requires at least one additional rule of inference in order to obtain completeness.

The significance of argument in formal logic is that one may obtain new truths from established truths. In the first example above, given the two premises, the truth of Q is not yet known or stated. After the argument is made, Q is deduced. In this way, we define a deduction system to be a set of all propositions that may be deduced from another set of propositions. For instance, given the set of propositions A = \{ P \or Q, \neg Q \and R, (P \or Q) \to R \}, we can define a deduction system, Γ, which is the set of all propositions which follow from A. Reiteration is always assumed, so P \or Q, \neg Q \and R, (P \or Q) \to R \in \Gamma. Also, from the first element of A, last element, as well as modus ponens, R is a consequence, and so R \in \Gamma. Because we have not included sufficiently complete axioms, though, nothing else may be deduced. Thus, even though most deduction systems studied in propositional logic are able to deduce (P \or Q) \leftrightarrow (\neg P \to Q), this one is too weak to prove such a proposition.

Generic description of a propositional calculus

A propositional calculus is a formal system \mathcal{L} = \mathcal{L} \left( \Alpha,\ \Omega,\ \Zeta,\ \Iota \right), where:

• The alpha set \Alpha is a finite set of elements called proposition symbols or propositional variables. Syntactically speaking, these are the most basic elements of the formal language \mathcal{L}, otherwise referred to as atomic formulas or terminal elements. In the examples to follow, the elements of \Alpha are typically the letters p, q, r, and so on.

• The omega set Ω is a finite set of elements called operator symbols or logical connectives. The set Ω is partitioned into disjoint subsets as follows:

\Omega = \Omega_0 \cup \Omega_1 \cup \ldots \cup \Omega_j \cup \ldots \cup \Omega_m.

In this partition, \Omega_j is the set of operator symbols of arity j.

In the more familiar propositional calculi, Ω is typically partitioned as follows:

\Omega_1 = \{ \lnot \},

\Omega_2 \subseteq \{ \land, \lor, \to, \leftrightarrow \}.

A frequently adopted convention treats the constant logical values as operators of arity zero, thus:

\Omega_0 = \{ 0, 1 \}.

Some writers use the tilde (~), or N, instead of ¬; and some use the ampersand (&), the prefixed K, or \cdot instead of \wedge. Notation varies even more for the set of logical values, with symbols like {false, true}, {F, T}, or \{ \bot, \top \} all being seen in various contexts instead of {0, 1}.

• The zeta set \Zeta is a finite set of transformation rules that are called inference rules when they acquire logical applications.

• The iota set \Iota is a finite set of initial points that are called axioms when they receive logical interpretations.

The language of \mathcal{L}, also known as its set of formulas, well-formed formulas, is inductively defined by the following rules:

1. Base: Any element of the alpha set \Alpha is a formula of \mathcal{L}.
2. If p_1, p_2, \ldots, p_j are formulas and f is in \Omega_j, then \left( f(p_1, p_2, \ldots, p_j) \right) is a formula.
3. Closed: Nothing else is a formula of \mathcal{L}.

Repeated applications of these rules permits the construction of complex formulas. For example:

1. By rule 1, p is a formula.
2. By rule 2, \neg p is a formula.
3. By rule 1, q is a formula.
4. By rule 2, ( \neg p \lor q ) is a formula.

Example 1. Simple axiom system

Let \mathcal{L}_1 = \mathcal{L}(\Alpha,\Omega,\Zeta,\Iota), where \Alpha, \Omega, \Zeta, \Iota are defined as follows:

• The alpha set \Alpha, is a finite set of symbols that is large enough to supply the needs of a given discussion, for example:

\Alpha = \{p, q, r, s, t, u \}.

• Of the three connectives for conjunction, disjunction, and implication (\wedge, \lor, and →), one can be taken as primitive and the other two can be defined in terms of it and negation (¬).^[8] Indeed, all of the logical connectives can be defined in terms of a sole sufficient operator. The biconditional (↔) can of course be defined in terms of conjunction and implication, with a \leftrightarrow b defined as (a \to b) \land (b \to a).

Adopting negation and implication as the two primitive operations of a propositional calculus is tantamount to having the omega set \Omega = \Omega_1 \cup \Omega_2 partition as follows:

\Omega_1 = \{ \lnot \},

\Omega_2 = \{ \to \}.

• An axiom system discovered by Jan Łukasiewicz formulates a propositional calculus in this language as follows. The axioms are all substitution instances of:

• (p \to (q \to p))

• ((p \to (q \to r)) \to ((p \to q) \to (p \to r)))

• ((\neg p \to \neg q) \to (q \to p))

• The rule of inference is modus ponens (i.e., from p and (p \to q), infer q). Then a \lor b is defined as \neg a \to b, and a \land b is defined as \neg(a \to \neg b). This system is used in Metamath set.mm formal proof database.

Example 2. Natural deduction system

Let \mathcal{L}_2 = \mathcal{L}(\Alpha, \Omega, \Zeta, \Iota), where \Alpha, \Omega, \Zeta, \Iota are defined as follows:

• The alpha set \Alpha, is a finite set of symbols that is large enough to supply the needs of a given discussion, for example:

  \Alpha = \{p, q, r, s, t, u \}.

• The omega set \Omega = \Omega_1 \cup \Omega_2 partitions as follows:

  \Omega_1 = \{ \lnot \},

  \Omega_2 = \{ \land, \lor, \to, \leftrightarrow \}.

In the following example of a propositional calculus, the transformation rules are intended to be interpreted as the inference rules of a so-called natural deduction system. The particular system presented here has no initial points, which means that its interpretation for logical applications derives its theorems from an empty axiom set.

• The set of initial points is empty, that is, \Iota = \varnothing.
• The set of transformation rules, \Zeta, is described as follows:

Our propositional calculus has ten inference rules. These rules allow us to derive other true formulas given a set of formulas that are assumed to be true. The first nine simply state that we can infer certain well-formed formulas from other well-formed formulas. The last rule however uses hypothetical reasoning in the sense that in the premise of the rule we temporarily assume an (unproven) hypothesis to be part of the set of inferred formulas to see if we can infer a certain other formula. Since the first nine rules don't do this they are usually described as non-hypothetical rules, and the last one as a hypothetical rule.

In describing the transformation rules, we may introduce a metalanguage symbol \vdash. It is basically a convenient shorthand for saying "infer that". The format is \Gamma \vdash \psi, in which Γ is a (possibly empty) set of formulas called premises, and ψ is a formula called conclusion. The transformation rule \Gamma \vdash \psi means that if every proposition in Γ is a theorem (or has the same truth value as the axioms), then ψ is also a theorem. Note that considering the following rule Conjunction introduction, we will know whenever Γ has more than one formula, we can always safely reduce it into one formula using conjunction. So for short, from that time on we may represent Γ as one formula instead of a set. Another omission for convenience is when Γ is an empty set, in which case Γ may not appear.

Negation introduction

From (p \to q) and (p \to \neg q), infer \neg p.

That is, \{ (p \to q), (p \to \neg q) \} \vdash \neg p.

Negation elimination

From \neg p, infer (p \to r).

That is, \{ \neg p \} \vdash (p \to r).

Double negative elimination

From \neg \neg p, infer p.

That is, \neg \neg p \vdash p.

Conjunction introduction

From p and q, infer (p \land q).

That is, \{ p, q \} \vdash (p \land q).

Conjunction elimination

From (p \land q), infer p.

From (p \land q), infer q.

That is, (p \land q) \vdash p and (p \land q) \vdash q.

Disjunction introduction

From p, infer (p \lor q).

From q, infer (p \lor q).

That is, p \vdash (p \lor q) and q \vdash (p \lor q).

Disjunction elimination

From (p \lor q) and (p \to r) and (q \to r), infer r.

That is, \{p \lor q, p \to r, q \to r\} \vdash r.

Biconditional introduction

From (p \to q) and (q \to p), infer (p \leftrightarrow q).

That is, \{p \to q, q \to p\} \vdash (p \leftrightarrow q).

Biconditional elimination

From (p \leftrightarrow q), infer (p \to q).

From (p \leftrightarrow q), infer (q \to p).

That is, (p \leftrightarrow q) \vdash (p \to q) and (p \leftrightarrow q) \vdash (q \to p).

Modus ponens (conditional elimination)

From p and (p \to q), infer q.

That is, \{ p, p \to q\} \vdash q.

Conditional proof (conditional introduction)

From [accepting p allows a proof of q], infer (p \to q).

That is, (p \vdash q) \vdash (p \to q).

Basic and derived argument forms

Proofs in propositional calculus

One of the main uses of a propositional calculus, when interpreted for logical applications, is to determine relations of logical equivalence between propositional formulas. These relationships are determined by means of the available transformation rules, sequences of which are called derivations or proofs.

In the discussion to follow, a proof is presented as a sequence of numbered lines, with each line consisting of a single formula followed by a reason or justification for introducing that formula. Each premise of the argument, that is, an assumption introduced as an hypothesis of the argument, is listed at the beginning of the sequence and is marked as a "premise" in lieu of other justification. The conclusion is listed on the last line. A proof is complete if every line follows from the previous ones by the correct application of a transformation rule. (For a contrasting approach, see proof-trees).

Example of a proof

• To be shown that A → A.

• One possible proof of this (which, though valid, happens to contain more steps than are necessary) may be arranged as follows:

Interpret A \vdash A as "Assuming A, infer A". Read \vdash A \to A as "Assuming nothing, infer that A implies A", or "It is a tautology that A implies A", or "It is always true that A implies A".

Soundness and completeness of the rules

The crucial properties of this set of rules are that they are sound and complete. Informally this means that the rules are correct and that no other rules are required. These claims can be made more formal as follows.

We define a truth assignment as a function that maps propositional variables to true or false. Informally such a truth assignment can be understood as the description of a possible state of affairs (or possible world) where certain statements are true and others are not. The semantics of formulas can then be formalized by defining for which "state of affairs" they are considered to be true, which is what is done by the following definition.

We define when such a truth assignment A satisfies a certain well-formed formula with the following rules:

• A satisfies the propositional variable P if and only if A(P) = true
• A satisfies ¬φ if and only if A does not satisfy φ
• A satisfies (φ ∧ ψ) if and only if A satisfies both φ and ψ
• A satisfies (φ ∨ ψ) if and only if A satisfies at least one of either φ or ψ
• A satisfies (φ → ψ) if and only if it is not the case that A satisfies φ but not ψ
• A satisfies (φ ↔ ψ) if and only if A satisfies both φ and ψ or satisfies neither one of them

With this definition we can now formalize what it means for a formula φ to be implied by a certain set S of formulas. Informally this is true if in all worlds that are possible given the set of formulas S the formula φ also holds. This leads to the following formal definition: We say that a set S of well-formed formulas semantically entails (or implies) a certain well-formed formua φ if all truth assignments that satisfy all the formulas in S also satisfy φ.

Finally we define syntactical entailment such that φ is syntactically entailed by S if and only if we can derive it with the inference rules that were presented above in a finite number of steps. This allows us to formulate exactly what it means for the set of inference rules to be sound and complete:

Soundness: If the set of well-formed formulas S syntactically entails well-formed formulas φ then S semantically entails φ.

Completeness: If the set of well-formed formulas S semantically entails well-formed formua φ then S syntactically entails φ.

For the above set of rules this is indeed the case.

Sketch of a soundness proof

(For most logical systems, this is the comparatively "simple" direction of proof)

Notational conventions: Let G be a variable ranging over sets of sentences. Let A, B and C range over sentences. For "G syntactically entails A" we write "G proves A". For "G semantically entails A" we write "G implies A".

We want to show: (A)(G) (if G proves A, then G implies A).

We note that "G proves A" has an inductive definition, and that gives us the immediate resources for demonstrating claims of the form "If G proves A, then ...". So our proof proceeds by induction.