Ringschluss

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In mathematics, a Ringschluss (German: Beweis durch Ringschluss, lit.'Proof by ring-inference') is a mathematical proof technique where the equivalence of several statements can be proven without having to prove all pairwise equivalences directly. In English it is also sometimes called a cycle of implications,[1] closed chain inference, or circular implication; however, it should be distinguished from circular reasoning, a logical fallacy.

In order to prove that the statements φ1,,φn are each pairwise equivalent, proofs are given for the implications φ1φ2, φ2φ3, , φn1φn and φnφ1.[2][3]

The pairwise equivalence of the statements then results from the transitivity of the material conditional.

Example

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For n=4 the proofs are given for φ1φ2, φ2φ3, φ3φ4 and φ4φ1. The equivalence of φ2 and φ4 results from the chain of conclusions that are no longer explicitly given:

φ2φ3φ3φ4. This leads to: φ2φ4
φ4φ1φ1φ2. This leads to: φ4φ2

That is φ2φ4.

Motivation

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The technique saves writing effort above all. In proving the equivalence of n statements, it requires the direct proof of only n out of the n(n1)/2 implications between these statements. In contrast, for instance, choosing one of the statements as being central and proving that the remaining n1 statements are each equivalent to the central one would require 2(n1) implications, a larger number.[1] The difficulty for the mathematician is to find a sequence of statements that allows for the most elegant direct proofs possible.

References

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