consistency - meaning and definition. What is consistency
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What (who) is consistency - definition

IN LOGIC, PROPERTY OF A THEORY THAT DOES NOT CONTAIN A CONTRADICTION
Consistent; Inconsistency; Consistancy; Consistent theory; Inconsistent; Consistency (Mathematical Logic); Internal logic; Consistency (mathematical logic); Consistent set; Consistency proof; Logically consistent; Self consistent; Self-consistent; Consistencies; Logical consistency; Inconsistent theory; Absolute consistency; Inconsistency principle; Inconsistancy; Relative consistency; Henkin's theorem

consistency         
(also consistence)
¦ noun (plural consistencies)
1. the state of being consistent.
2. the thickness or viscosity of a substance.
Consistency         
·noun A degree of firmness, density, or spissitude.
II. Consistency ·noun That which stands together as a united whole; a combination.
III. Consistency ·noun Firmness of constitution or character; substantiality; durability; persistency.
IV. Consistency ·noun The condition of standing or adhering together, or being fixed in union, as the parts of a body; existence; firmness; coherence; solidity.
V. Consistency ·noun Agreement or harmony of all parts of a complex thing among themselves, or of the same thing with itself at different times; the harmony of conduct with profession; congruity; correspondence; as, the consistency of laws, regulations, or judicial decisions; consistency of opinions; consistency of conduct or of character.
consistency         
1.
Consistency is the quality or condition of being consistent.
He scores goals with remarkable consistency...
There's always a lack of consistency in matters of foreign policy.
N-UNCOUNT
2.
The consistency of a substance is how thick or smooth it is.
Dilute the paint with water until it is the consistency of milk...
N-UNCOUNT: usu with supp

Wikipedia

Consistency

In classical deductive logic, a consistent theory is one that does not lead to a logical contradiction. The lack of contradiction can be defined in either semantic or syntactic terms. The semantic definition states that a theory is consistent if it has a model, i.e., there exists an interpretation under which all formulas in the theory are true. This is the sense used in traditional Aristotelian logic, although in contemporary mathematical logic the term satisfiable is used instead. The syntactic definition states a theory T {\displaystyle T} is consistent if there is no formula φ {\displaystyle \varphi } such that both φ {\displaystyle \varphi } and its negation ¬ φ {\displaystyle \lnot \varphi } are elements of the set of consequences of T {\displaystyle T} . Let A {\displaystyle A} be a set of closed sentences (informally "axioms") and A {\displaystyle \langle A\rangle } the set of closed sentences provable from A {\displaystyle A} under some (specified, possibly implicitly) formal deductive system. The set of axioms A {\displaystyle A} is consistent when φ , ¬ φ A {\displaystyle \varphi ,\lnot \varphi \in \langle A\rangle } for no formula φ {\displaystyle \varphi } .

If there exists a deductive system for which these semantic and syntactic definitions are equivalent for any theory formulated in a particular deductive logic, the logic is called complete. The completeness of the sentential calculus was proved by Paul Bernays in 1918 and Emil Post in 1921, while the completeness of predicate calculus was proved by Kurt Gödel in 1930, and consistency proofs for arithmetics restricted with respect to the induction axiom schema were proved by Ackermann (1924), von Neumann (1927) and Herbrand (1931). Stronger logics, such as second-order logic, are not complete.

A consistency proof is a mathematical proof that a particular theory is consistent. The early development of mathematical proof theory was driven by the desire to provide finitary consistency proofs for all of mathematics as part of Hilbert's program. Hilbert's program was strongly impacted by the incompleteness theorems, which showed that sufficiently strong proof theories cannot prove their consistency (provided that they are consistent).

Although consistency can be proved using model theory, it is often done in a purely syntactical way, without any need to reference some model of the logic. The cut-elimination (or equivalently the normalization of the underlying calculus if there is one) implies the consistency of the calculus: since there is no cut-free proof of falsity, there is no contradiction in general.

Examples of use of consistency
1. It depends on consistency, continuity, and repetition.
2. More consistency and coherence are not impossible.
3. Difficult questions –– unless you opt for consistency.
4. Although it is presented as a point of principle – "consistency, consistency" this commitment was made during a wobbly moment in his campaign for the leadership.
5. Add cornstarch as required to achieve the desired consistency.