Partial Correctness of a Fibonacci Algorithm

In this paper we introduce some notions to facilitate formulating and proving properties of iterative algorithms encoded in nominative data language [19] in the Mizar system [3], [1]. It is tested on verification of the partial correctness of an algorithm computing n-th Fibonacci number:

i := 0

s := 0

b := 1

c := 0

while (i <> n)

c := s

s := b

b := c + s

i := i + 1

return s

This paper continues verification of algorithms [10], [13], [12] written in terms of simple-named complex-valued nominative data [6], [8], [17], [11], [14], [15]. The validity of the algorithm is presented in terms of semantic Floyd-Hoare triples over such data [9]. Proofs of the correctness are based on an inference system for an extended Floyd-Hoare logic [2], [4] with partial pre- and post-conditions [16], [18], [7], [5].

eISSN:: 1898-9934
ISSN:: 1426-2630
Langue:: Anglais

Périodicité:: Volume Open
Sujets de la revue:: Computer Sciences, other, Mathematics, General Mathematics

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Partial Correctness of a Fibonacci Algorithm

Publié en ligne: 09 janv. 2021

Pages: 187 - 196

Accepté: 31 mai 2020

DOI: https://doi.org/10.2478/forma-2020-0016

Mots clésnominative data, program verification, Fibonacci sequence

© 2020 Artur Korniłowicz, published by Sciendo

This work is licensed under the Creative Commons Attribution-ShareAlike 4.0 International License.

Mots clés
nominative data, program verification, Fibonacci sequence