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In statistical mechanics, the random-subcube model (RSM) is an exactly solvable model that reproduces key properties of hard constraint satisfaction problems (CSPs) and optimization problems, such as geometrical organization of solutions, the effects of frozen variables, and the limitations of various algorithms like decimation schemes.
The RSM consists of a set of N binary variables, where solutions are defined as points in a hypercube. The model introduces clusters, which are random subcubes of the hypercube, representing groups of solutions sharing specific characteristics. As the density of constraints increases, the solution space undergoes a series of phase transitions similar to those observed in CSPs like random k-satisfiability (k-SAT) and random k-coloring (k-COL). These transitions include clustering, condensation, and ultimately the unsatisfiable phase where no solutions exist.
The RSM is equivalent to these real CSPs in the limit of large constraint size. Notably, it reproduces the cluster size distribution and freezing properties of k-SAT and k-COL in the large-k limit. This is similar to how the random energy model is the large-p limit of the p-spin glass model.
Setup
editSubcubes
editThere are particles. Each particle can be in one of two states .
The state space has states. Not all are available. Only those satisfying the constraints are allowed.
Each constraint is a subset of the state space. Each is a "subcube", structured like where each can be one of .
The available states is the union of these subsets:
Random subcube model
editEach random subcube model is defined by two parameters .
To generate a random subcube , sample its components IID according to
Now sample random subcubes, and union them together.
Entropies
editThe entropy density of the -th cluster in bits is
The entropy density of the system in bits is
Phase structure
editCluster sizes and numbers
editLet be the number of clusters with entropy density , then it is binomially distributed, thus where
By the Chebyshev inequality, if , then concentrates to its mean value. Otherwise, since , also concentrates to by the Markov inequality.
Thus, almost surely as .
When exactly, the two forces exactly balance each other out, and does not collapse, but instead converges in distribution to the Poisson distribution by the law of small numbers.
Liquid phase
editFor each state, the number of clusters it is in is also binomially distributed, with expectation
So if , then it concentrates to , and so each state is in an exponential number of clusters.
Indeed, in that case, the probability that all states are allowed is
Thus almost surely, all states are allowed, and the entropy density is 1 bit per particle.
Clustered phase
editIf , then it concentrates to zero exponentially, and so most states are not in any cluster. Those that do are exponentially unlikely to be in more than one. Thus, we find that almost all states are in zero clusters, and of those in at least one cluster, almost all are in just one cluster. The state space is thus roughly speaking the disjoint union of the clusters.
Almost surely, there are clusters of size , therefore, the state space is dominated by clusters with optimal entropy density .
Thus, in the clustered phase, the state space is almost entirely partitioned among clusters of size each. Roughly, the state space looks like exponentially many equally-sized clusters.
Condensation phase
editAnother phase transition occurs when , that is, When , the optimal entropy density becomes unreachable, as there almost surely exists zero clusters with entropy density . Instead, the state space is dominated by clusters with entropy close to , the larger solution to .
Near , the contribution of clusters with entropy density to the total state space is At large , the possible entropy densities are . The contribution of each is
We can tabulate them as follows:
#clusters | |||
contributes |
Thus, we see that for any , at limit, over of the total state space is covered by only a finite number of clusters. The state space looks partitioned into clusters with exponentially decaying sizes. This is the condensation phase.
Unsatisfiable phase
editWhen , the number of clusters is zero, so there are no states.
Extensions
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The RSM can be extended to include energy landscapes, allowing for the study of glassy behavior, temperature chaos, and the dynamic transition.
See also
editReferences
edit- Mora, Thierry; Zdeborová, Lenka (2008-06-01). "Random Subcubes as a Toy Model for Constraint Satisfaction Problems". Journal of Statistical Physics. 131 (6): 1121–1138. arXiv:0710.3804. Bibcode:2008JSP...131.1121M. doi:10.1007/s10955-008-9543-x. ISSN 1572-9613.
- Zdeborová, Lenka (2008-06-25). "Statistical Physics of Hard Optimization Problems". Acta Physica Slovaca. 59 (3): 169–303. arXiv:0806.4112. Bibcode:2008PhDT.......107Z.
- Mézard, Marc; Montanari, Andrea (2009-01-22). Information, Physics, and Computation. Oxford University Press. ISBN 978-0-19-154719-5.