Z User Workshop, York 1991: Proceedings of the Sixth Annual Z User Meeting, York 16-17 December 1991

In ordinary mathematics, an equation can be written down which is syntactically correct, but for which no solution exists. For example, consider the equation x = x + 1 defined over the real numbers; there is no value of x which satisfies it. Similarly it is possible to specify objects using the formal specification language Z [3,4], which can not possibly exist. Such specifications are called inconsistent and can arise in a number of ways. Example 1 The following Z specification of a functionf, from integers to integers "f x: 1 x O- fx = x + 1 (i) "f x: 1 x O- fx = x + 2 (ii) is inconsistent, because axiom (i) gives f 0 = 1, while axiom (ii) gives f 0 = 2. This contradicts the fact that f was declared as a function, that is, f must have a unique result when applied to an argument. Hence no suchfexists. Furthermore, iff 0 = 1 andfO = 2 then 1 = 2 can be deduced! From 1 = 2 anything can be deduced, thus showing the danger of an inconsistent specification. Note that all examples and proofs start with the word Example or Proof and end with the symbol.1.

Author: J. E. Nicholls

Publisher: Springer

Publication Date: Aug 06, 1992

Number of Pages: 408 pages

Binding: Paperback or Softback

ISBN-10: 354019780X

ISBN-13: 9783540197805