Overlap (term rewriting)

In mathematics, computer science and logic, overlap, as a property of the reduction rules in term rewriting system, describes a situation where a number of different reduction rules specify potentially contradictory ways of reducing a reducible expression, also known as a redex, within a term.^[1]

More precisely, if a number of different reduction rules share function symbols on the left-hand side, overlap can occur. Often we do not consider trivial overlap with a redex and itself.

Examples[edit]

Consider the term rewriting system defined by the following reduction rules:

\rho _{1}\ :\ f(g(x),y)\rightarrow y

\rho _{2}\ :\ g(x)\rightarrow f(x,x)

The term $f(g(x),y)$ can be reduced via ρ₁ to yield $y$ , but it can also be reduced via ρ₂ to yield $f(f(x,x),y).$ . Note how the redex $g(x)$ is contained in the redex $f(g(x),y)$ . The result of reducing different redexes is described in a what is known as a critical pair; the critical pair arising out of this term rewriting system is $(f(f(x,x),y),y)$ .

Overlap may occur with fewer than two reduction rules.

Consider the term rewriting system defined by the following reduction rule:

\rho _{1}\ :\ g(g(x))\rightarrow x

The term $g(g(g(x)))$ has overlapping redexes, which can be either applied to the innermost occurrence or to the outermost occurrence of the $g(g(x))$ term.

References[edit]

^ Marc Bezem; Jan Willem Klop; Roel de Vrijer (2003). Term Rewriting Systems. Cambridge Tracts in Theoretical Computer Science. Cambridge, UK: Cambridge University Press. p. 48. ISBN 0-521-39115-6.

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[1] Marc Bezem; Jan Willem Klop; Roel de Vrijer (2003). Term Rewriting Systems. Cambridge Tracts in Theoretical Computer Science. Cambridge, UK: Cambridge University Press. p. 48. ISBN 0-521-39115-6.

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