The Z notation /ˈzɛd/ is a formal specification language used for describing and modelling computing systems. It is targeted at the clear specification of computer programs and computer-based systems in general.
History
In 1974, Jean-Raymond Abrial published "Data Semantics". He used a notation that would later be taught in the University of Grenoble until the end of the 1980s. While at EDF (Électricité de France), working with Bertrand Meyer, Abrial also worked on developing Z. The Z notation is used in the 1980 book Méthodes de programmation.
Z was originally proposed by Abrial in 1977 with the help of Steve Schuman and Bertrand Meyer. It was developed further at the Programming Research Group at Oxford University, where Abrial worked in the early 1980s, having arrived at Oxford in September 1979.
Abrial has said that Z is so named "Because it is the ultimate language!" although the name "Zermelo" is also associated with the Z notation through its use of Zermelo–Fraenkel set theory.
In 1992, the Z User Group (ZUG) was established to oversee activities concerning the Z notation, especially meetings and conferences.
Usage and notation
Z is based on the standard mathematical notation used in axiomatic set theory, lambda calculus, and first-order predicate logic. All expressions in Z notation are typed, thereby avoiding some of the paradoxes of naive set theory. Z contains a standardized catalogue (called the mathematical toolkit) of commonly used mathematical functions and predicates, defined using Z itself. It is augmented with Z schema boxes, which can be combined using their own operators, based on standard logical operators, and also by including schemas within other schemas. This allows Z specifications to be built up into large specifications in a convenient manner.
Because Z notation (just like the APL language, long before it) uses many non-ASCII symbols, the specification includes suggestions for rendering the Z notation symbols in ASCII and in LaTeX. There are also Unicode encodings for all standard Z symbols.
Standards
ISO completed a Z standardization effort in 2002. This standard and a technical corrigendum are available from ISO free:
- the standard is publicly available from the ISO ITTF site free of charge and, separately, available for purchase from the ISO site;
- the technical corrigendum is available from the ISO site free of charge.
Award
In 1992, Oxford University Computing Laboratory and IBM were jointly awarded The Queen's Award for Technological Achievement "for the development of ... the Z notation, and its application in the IBM Customer Information Control System (CICS) product."
See also
- Z User Group (ZUG)
- Community Z Tools (CZT) project
- Other formal methods (and languages using formal specifications):
- VDM-SL, the main alternative to Z
- B-Method, developed by Jean-Raymond Abrial (creator of Z notation)
- Z++ and Object-Z, object extensions for the Z notation
- Alloy, a specification language inspired by Z notation and implementing the principles of Object Constraint Language (OCL).
- Verus, a proprietary tool built by Compion, Champaign, Illinois (later purchased by Motorola), for use in the multi-level secure UNIX project pioneered by its Addamax division.
- Fastest, a model-based testing tool for the Z notation.
- Unified Modeling Language, a software system design modeling tool by Object Management Group
References
- Bowen, Jonathan P. (2016). "The Z Notation: Whence the Cause and Whither the Course?" (PDF). Engineering Trustworthy Software Systems. Lecture Notes in Computer Science. Vol. 9506. Springer. pp. 103–151. doi:10.1007/978-3-319-29628-9_3. ISBN 978-3-319-29627-2.
- Abrial, Jean-Raymond (1974), "Data Semantics", in Klimbie, J. W.; Koffeman, K. L. (eds.), Proceedings of the IFIP Working Conference on Data Base Management, North-Holland, pp. 1–59
- Hoare, Tony (2010). Greetings to Bertrand on the Occasion of his Sixtieth Birthday (PDF). Springer. p. 183. ISBN 978-3-642-15187-3.
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ignored (help) - Meyer, Bertrand; Baudoin, Claude (1980), Méthodes de programmation (in French), Eyrolles
- Abrial, Jean-Raymond; Schuman, Stephen A; Meyer, Bertrand (1980), "A Specification Language", in Macnaghten, A. M.; McKeag, R. M. (eds.), On the Construction of Programs, Cambridge University Press, ISBN 0-521-23090-X (describes early version of the language).
- Hoogeboom, Hendrik Jan. "Formal Methods in Software Engineering" (PDF). The Netherland: University of Leiden. Retrieved 14 April 2017.
- Bowen, Jonathan (July 2022). "The Z User Group: Thirty Years After" (PDF). FACS FACTS. No. 2022–2. BCS-FACS. pp. 50–56. Retrieved 3 August 2022.
- Spivey, J. Michael (1992). The Z Notation: A Reference Manual. International Series in Computer Science (2nd ed.). Hemel Hempstead: Prentice Hall. ISBN 978-0139785290.
- Korpela, Jukka K. "Unicode Explained: Internationalize Documents, Programs, and Web Sites". unicode-search.net. Retrieved 24 March 2020.
- ^ "ISO/IEC 13568:2002". Information Technology — Z Formal Specification Notation — Syntax, Type System and Semantics (Zipped PDF). ISO. 1 July 2002. 196 pp.
- ^ "ISO/IEC 13568:2002/Cor.1:2007". Information Technology — Z Formal Specification Notation — Syntax, Type System and Semantics — Technical corrigendum 1 (PDF). ISO. 15 July 2007. 12 pp.
- "The Queen's Award for Technological Achievement 1992". Oxford University Computing Laboratory. Archived from the original on 2 December 2008. Retrieved 17 October 2021.
Further reading
- Spivey, John Michael (1992). The Z Notation: A reference manual. International Series in Computer Science (2nd ed.). Prentice Hall.
- Davies, Jim; Woodcock, Jim (1996). Using Z: Specification, Refinement and Proof. International Series in Computer Science. Prentice Hall. ISBN 0-13-948472-8.
- Bowen, Jonathan (1996). Formal Specification and Documentation using Z: A Case Study Approach. International Thomson Computer Press, International Thomson Publishing. ISBN 1-85032-230-9.
- Jacky, Jonathan (1997). The Way of Z: Practical Programming with Formal Methods. Cambridge University Press. ISBN 0-521-55976-6.
- Ince, D C (1993). An Introduction to Discrete Mathematics, Formal System Specification, and Z. Oxford University Press. doi:10.1093/oso/9780198538370.001.0001. ISBN 9780198538370.