TY - JOUR
T1 - Coupling policy iteration with semi-definite relaxation to compute accurate numerical invariants in static analysis
AU - Adjé, Assalé
AU - Gaubert, Stéphane
AU - Goubault, Eric
PY - 2012/1/1
Y1 - 2012/1/1
N2 - We introduce a new domain for finding precise numerical invariants of programs by abstract interpretation. This domain, which consists of level sets of non-linear functions, generalizes the domain of linear "templates" introduced by Manna, Sankaranarayanan, and Sipma. In the case of quadratic templates, we use Shor's semi-definite relaxation to derive computable yet precise abstractions of semantic functionals, and we show that the abstract fixpoint equation can be solved accurately by coupling policy iteration and semi-definite programming. We demonstrate the interest of our approach on a series of examples (filters, integration schemes) including a degenerate one (symplectic scheme).
AB - We introduce a new domain for finding precise numerical invariants of programs by abstract interpretation. This domain, which consists of level sets of non-linear functions, generalizes the domain of linear "templates" introduced by Manna, Sankaranarayanan, and Sipma. In the case of quadratic templates, we use Shor's semi-definite relaxation to derive computable yet precise abstractions of semantic functionals, and we show that the abstract fixpoint equation can be solved accurately by coupling policy iteration and semi-definite programming. We demonstrate the interest of our approach on a series of examples (filters, integration schemes) including a degenerate one (symplectic scheme).
KW - Abstract interpretation
KW - Convex programming
KW - Lyapunov functions
KW - Policy iteration
KW - Quadratic programming
KW - Semi-definite programming
U2 - 10.2168/LMCS-8(1:01)2012
DO - 10.2168/LMCS-8(1:01)2012
M3 - Article
AN - SCOPUS:84860015852
SN - 1860-5974
VL - 8
JO - Logical Methods in Computer Science
JF - Logical Methods in Computer Science
IS - 1
ER -