We study the performances of stochastic heuristic search algorithms on Uniquely Extendible Constraint Satisfaction Problems with random inputs. We show that, for any heuristic preserving the Poissonian nature of the underlying instance, the (heuristic-dependent) largest ratio a,, of constraints per variables for which a search algorithm is likely to find solutions is smaller than the critical ratio alpha(d) above which solutions are clustered and highly correlated. In addition we show that the clustering ratio can be reached when the number k of variables per constraints goes to infinity by the so-called Generalized Unit Clause heuristic.
Relationship between clustering and algorithmic phase transitions in the random k-XORSAT model and its NP-complete extensions / Altarelli, F; Monasson, R; Zamponi, F. - In: JOURNAL OF PHYSICS. CONFERENCE SERIES. - ISSN 1742-6588. - 95:(2008). [10.1088/1742-6596/95/1/012013]
Relationship between clustering and algorithmic phase transitions in the random k-XORSAT model and its NP-complete extensions
Zamponi F
2008
Abstract
We study the performances of stochastic heuristic search algorithms on Uniquely Extendible Constraint Satisfaction Problems with random inputs. We show that, for any heuristic preserving the Poissonian nature of the underlying instance, the (heuristic-dependent) largest ratio a,, of constraints per variables for which a search algorithm is likely to find solutions is smaller than the critical ratio alpha(d) above which solutions are clustered and highly correlated. In addition we show that the clustering ratio can be reached when the number k of variables per constraints goes to infinity by the so-called Generalized Unit Clause heuristic.I documenti in IRIS sono protetti da copyright e tutti i diritti sono riservati, salvo diversa indicazione.
