Article ID Journal Published Year Pages File Type
431094 The Journal of Logic and Algebraic Programming 2008 37 Pages PDF
Abstract

To ensure the conformance of an implementation under test (in the following IUT) with respect to a specification requires, in general, the application of an infinite number of tests. In order to use finite test suites, most testing methodologies add some feasible hypotheses about the behavior of the IUT. Since these methodologies are designed for considering a fix set of hypotheses, they usually do not have the capability of dealing with other testing scenarios where the set of assumed hypotheses varies. In this paper we propose a logic to infer whether a set of observations (i.e., results of test applications) allows to claim that the IUT conforms to the specification if a specific set of hypotheses (taken from a repertory of hypotheses) is assumed. We show the soundness and completeness of our logic with respect to a general notion of conformance.

Related Topics
Physical Sciences and Engineering Computer Science Computational Theory and Mathematics