Title:
Phase Transition and Landscape Statistics of the Number Partitioning Problem
Author(s):
Peter F. Stadler, Wim Hordijk, and José F. Fontanari
Reference:
Physical Review E 67, 056701, 2003
Abstract:
The phase transition in the number partitioning problem (NPP), i.e., the
transition from a region in the space of control parameters in which almost all instances
have many solutions to a region in which almost all instances have no solution, is
investigated by examining the energy landscape of this classic optimization problem. This
is achieved by coding the information about the minimum energy paths connecting pairs of
minima into a tree structure, termed a barrier tree, the leaves and internal nodes of which
represent, respectively, the minima and the lowest energy saddles connecting those minima.
Here we apply several measures of shape (balance and symmetry) as well as of branch lengths
(barrier heights) to the barrier trees that result from the landscape of the NPP, aiming at
identifying traces of the easy/hard transition. We find that it is not possible to tell the
easy regime from the hard one by visual inspection of the trees or by measuring the barrier
heights. Only the difficulty measure, given by the maximum value of the ratio between
the barrier height and the energy surplus of local minima, succeeded in detecting traces of
the phase transition in the tree. In adddition, we show that the barrier trees associated
with the NPP are very similar to random trees, contrasting dramatically with trees associated
with the p-spin-glass and random energy models. We also examine critically a recent
conjecture on the equivalence between the NPP and a truncated random energy model.
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Other URLs:
SFI working paper 03-02-006
cond-mat/0302155