Kleene equality

In mathematics, Kleene equality,^[1] or strong equality, (${\displaystyle \simeq }$) is an equality operator on partial functions, that states that on a given argument either both functions are undefined, or both are defined and their values on that arguments are equal.

For example, if we have partial functions ${\displaystyle f}$ and ${\displaystyle g}$, ${\displaystyle f\simeq g}$ means that for every ${\displaystyle x}$:^[2]

• ${\displaystyle f(x)}$ and ${\displaystyle g(x)}$ are both defined and ${\displaystyle f(x)=g(x)}$
• or ${\displaystyle f(x)}$ and ${\displaystyle g(x)}$ are both undefined.

Some authors^[3] are using "quasi-equality", which is defined like this: ${\displaystyle (y_{1}\sim y_{2}):\Leftrightarrow ((y_{1}\downarrow \lor y_{2}\downarrow )\longrightarrow y_{1}=y_{2}),}$ where the down arrow means that the term on the left side of it is defined. Then it becomes possible to define the strong equality in the following way: ${\displaystyle (f\simeq g):\Leftrightarrow (\forall x.(f(x)\sim g(x))).}$

References

1. "Kleene equality in nLab". ncatlab.org.
2. Cutland 1980, p. 3.
3. Farmer, William M.; Guttman, Joshua D. (2000). "A Set Theory with Support for Partial Functions". Studia Logica: An International Journal for Symbolic Logic. 66 (1): 59–78.

• Cutland, Nigel (1980). Computability, an introduction to recursive function theory. Cambridge University Press. p. 251. ISBN 978-0-521-29465-2.