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Confluent


Confluent

A reduction system is called confluent (or globally confluent) if, for all x, u, and w such that x->_*u and x->_*w, there exists a z such that u->_*z and w->_*z. A reduction system is said to be locally confluent if, for all x, u, w such that x->u and x->w, there exists a z such that u->_*z and w->_*z. Here, the notation x->y indicates that x is reduced to y in one step, and x->_*y indicates that x is reduced to y in zero or more steps.

A reduction system is confluent iff it has Church-Rosser property (Wolfram 2002, p. 1036). In finitely terminating reduction systems, global and local confluence are equivalent, for instance in the systems shown above. Reduction systems that are both finitely terminating and confluent are called convergent. In a convergent reduction system, unique normal forms exist for all expressions.

The problem of determining whether a given reduction system is confluent is recursively undecidable.

The property of being confluent is called confluence. Confluence is a necessary condition for causal invariance.


See also

Causal Invariance, Confluent Hypergeometric Differential Equation, Confluent Hypergeometric Function of the First Kind, Confluent Hypergeometric Function of the Second Kind, Critical Pair, Knuth-Bendix Completion Algorithm, Multiway System, Reduction Order

Portions of this entry contributed by Todd Rowland

Portions of this entry contributed by Alex Sakharov (author's link)

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References

Baader, F. and Nipkow, T. Term Rewriting and All That. Cambridge, England: Cambridge University Press, 1999.Wolfram, S. A New Kind of Science. Champaign, IL: Wolfram Media, pp. 507 and 1036-1037, 2002.

Referenced on Wolfram|Alpha

Confluent

Cite this as:

Rowland, Todd; Sakharov, Alex; and Weisstein, Eric W. "Confluent." From MathWorld--A Wolfram Web Resource. https://mathworld.wolfram.com/Confluent.html

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