TY  - THES
A1  - Lindauer, T. Marius
T1  - Algorithm selection, scheduling and configuration of Boolean constraint solvers
N2  - Boolean constraint solving technology has made tremendous progress over the last decade, leading to industrial-strength solvers, for example, in the areas of answer set programming (ASP), the constraint satisfaction problem (CSP), propositional satisfiability (SAT) and satisfiability of quantified Boolean formulas (QBF). However, in all these areas, there exist multiple solving strategies that work well on different applications; no strategy dominates all other strategies. Therefore, no individual solver shows robust state-of-the-art performance in all kinds of applications. Additionally, the question arises how to choose a well-performing solving strategy for a given application; this is a challenging question even for solver and domain experts. One way to address this issue is the use of portfolio solvers, that is, a set of different solvers or solver configurations. We present three new automatic portfolio methods: (i) automatic construction of parallel portfolio solvers (ACPP) via algorithm configuration,(ii) solving the $NP$-hard problem of finding effective algorithm schedules with Answer Set Programming (aspeed), and (iii) a flexible algorithm selection framework (claspfolio2) allowing for fair comparison of different selection approaches. All three methods show improved performance and robustness in comparison to individual solvers on heterogeneous instance sets from many different applications. Since parallel solvers are important to effectively solve hard problems on parallel computation systems (e.g., multi-core processors), we extend all three approaches to be effectively applicable in parallel settings. We conducted extensive experimental studies different instance sets from ASP, CSP, MAXSAT, Operation Research (OR), SAT and QBF that indicate an improvement in the state-of-the-art solving heterogeneous instance sets. Last but not least, from our experimental studies, we deduce practical advice regarding the question when to apply which of our methods.
N2  - Bool'sche Solver Technologie machte enormen Fortschritt im letzten Jahrzehnt, was beispielsweise zu industrie-relevanten Solvern auf der Basis von Antwortmengenprogrammierung (ASP), dem Constraint Satisfcation Problem (CSP), dem Erfüllbarkeitsproblem für aussagenlogische Formeln (SAT) und dem Erfüllbarkeitsproblem für quantifizierte boolesche Formeln (QBF) führte. Allerdings gibt es in all diesen Bereichen verschiedene Lösungsstrategien, welche bei verschiedenen Anwendungen unterschiedlich effizient sind. Dabei gibt es keine einzelne Strategie, die alle anderen Strategien dominiert. Das führt dazu, dass es keinen robusten Solver für das Lösen von allen möglichen Anwendungsprobleme gibt. Die Wahl der richtigen Strategie für eine neue Anwendung ist eine herausforderne Problemstellung selbst für Solver- und Anwendungsexperten. Eine Möglichkeit, um Solver robuster zu machen, sind Portfolio-Ansätze. Wir stellen drei automatisch einsetzbare Portfolio-Ansätze vor: (i) automatische Konstruktion von parallelen Portfolio-Solvern (ACPP) mit Algorithmen-Konfiguration, (ii) das Lösen des $NP$-harten Problems zur Algorithmen-Ablaufplanung (aspeed) mit ASP, und (iii) ein flexibles Algorithmen-Selektionsframework (claspfolio2), was viele Techniken von Algorithmen-Selektion parametrisiert implementiert und eine faire Vergleichbarkeit zwischen Ihnen erlaubt. Alle drei Methoden verbessern die Robustheit des Solvingprozesses für heterogenen Instanzmengen bestehend aus unterschiedlichsten Anwendungsproblemen. Parallele Solver sind zunehmend der Schlüssel zum effektiven Lösen auf multi-core Maschinen. Daher haben wir all unsere Ansätze auch für den Einsatz auf parallelen Architekturen erweitert. Umfangreiche Experimente auf ASP, CSP, MAXSAT, Operation Research (OR), SAT und QBF zeigen, dass der Stand der Technik durch verbesserte Performanz auf heterogenen Instanzmengen verbessert wurde. Auf Grundlage dieser Experimente leiten wir auch Ratschläge ab, in welchen Anwendungsszenarien welches unserer Verfahren angewendet werden sollte.
T2  - Algorithmen-Selektion, -Ablaufplanung und -Konfiguration von Bool'schen Constraint Solvern
KW  - algorithm configuration
KW  - algorithm scheduling
KW  - algorithm selection
KW  - parallel solving
KW  - Boolean constraint solver
KW  - Algorithmenselektion
KW  - Algorithmenablaufplanung
KW  - Algorithmenkonfiguration
KW  - paralleles Lösen
Y1  - 2014
U6  - http://nbn-resolving.de/urn/resolver.pl?urn:nbn:de:kobv:517-opus4-71260
ER  - 
TY  - JOUR
A1  - Hoos, Holger
A1  - Lindauer, Marius
A1  - Schaub, Torsten H.
T1  - claspfolio 2
BT  - advances in algorithm selection for answer set programming
JF  - Theory and practice of logic programming
N2  - Building on the award-winning, portfolio-based ASP solver claspfolio, we present claspfolio 2, a modular and open solver architecture that integrates several different portfolio-based algorithm selection approaches and techniques. The claspfolio 2 solver framework supports various feature generators, solver selection approaches, solver portfolios, as well as solver-schedule-based pre-solving techniques. The default configuration of claspfolio 2 relies on a light-weight version of the ASP solver clasp to generate static and dynamic instance features. The flexible open design of claspfolio 2 is a distinguishing factor even beyond ASP. As such, it provides a unique framework for comparing and combining existing portfolio-based algorithm selection approaches and techniques in a single, unified framework. Taking advantage of this, we conducted an extensive experimental study to assess the impact of different feature sets, selection approaches and base solver portfolios. In addition to gaining substantial insights into the utility of the various approaches and techniques, we identified a default configuration of claspfolio 2 that achieves substantial performance gains not only over clasp's default configuration and the earlier version of claspfolio, but also over manually tuned configurations of clasp.
Y1  - 2014
U6  - https://doi.org/10.1017/S1471068414000210
SN  - 1471-0684
SN  - 1475-3081
VL  - 14
SP  - 569
EP  - 585
PB  - Cambridge Univ. Press
CY  - New York
ER  -