Not necessarily closed convex polyhedra and the double description method

Autor:	Roberto Bagnara, Patricia M. Hill, Enea Zaffanella
Rok vydání:	2005
Předmět:	Regular polygon Constrained optimization Integer points in convex polyhedra Abstract interpretation Theoretical Computer Science Domain (software engineering) Algebra Polyhedron TheoryofComputation_ANALYSISOFALGORITHMSANDPROBLEMCOMPLEXITY Embedding Algorithm Software Mathematics Vector space
Zdroj:	Formal Aspects of Computing. 17:222-257
ISSN:	1433-299X 0934-5043
Popis:	Since the seminal work of Cousot and Halbwachs, the domain of convex polyhedra has been employed in several systems for the analysis and verification of hardware and software components. Although most implementations of the polyhedral operations assume that the polyhedra are topologically closed (i.e., all the constraints defining them are non-strict), several analyzers and verifiers need to compute on a domain of convex polyhedra that are not necessarily closed (NNC). The usual approach to implementing NNC polyhedra is to embed them into closed polyhedra in a higher dimensional vector space and reuse the tools and techniques already available for closed polyhedra. In this work we highlight and discuss the issues underlying such an embedding for those implementations that are based on the double description method, where a polyhedron may be described by a system of linear constraints or by a system of generating rays and points. Two major achievements are the definition of a theoretically clean, high-level user interface and the specification of an efficient procedure for removing redundancies from the descriptions of NNC polyhedra.
Databáze:	OpenAIRE
Externí odkaz:	https://explore.openaire.eu/search/publication?articleId=doi_________::30a7916fac6dcf6b06fcbd18bec68f4b https://doi.org/10.1007/s00165-005-0061-1 Zobrazit plný text záznamu Full text from SpringerLink