PROTES: Probabilistic Optimization with Tensor Sampling
About
We developed a new method PROTES for black-box optimization, which is based on the probabilistic sampling from a probability density function given in the low-parametric tensor train format. We tested it on complex multidimensional arrays and discretized multivariable functions taken, among others, from real-world applications, including unconstrained binary optimization and optimal control problems, for which the possible number of elements is up to $2^{100}$. In numerical experiments, both on analytic model functions and on complex problems, PROTES outperforms existing popular discrete optimization methods (Particle Swarm Optimization, Covariance Matrix Adaptation, Differential Evolution, and others).
Anastasia Batsheva, Andrei Chertkov, Gleb Ryzhakov, Ivan Oseledets• 2023
Related benchmarks
| Task | Dataset | Result | Rank | |
|---|---|---|---|---|
| Constrained Optimal Control | P-19 | Computation Time (s)8.74 | 8 | |
| Multivariable Analytic Function Minimization | Multivariable Analytic Functions P-01 - P-10 | P-01 Ackley Objective13 | 8 | |
| Optimal Control | P-15 | Computation Time (s)513.6 | 8 | |
| Optimal Control | P-16 | Computation Time (s)542.4 | 8 | |
| Optimal Control Minimization | Optimal Control Problems P-15 - P-18 | Cost P-150.0067 | 8 | |
| Quadratic Unconstrained Binary Optimization (QUBO) | QUBO Problems P-11 - P-14 | Objective Value (P-11)-360 | 8 | |
| Constrained Optimal Control | P-20 | Computation Time (s)9.23 | 8 | |
| Optimal Control | P-17 | Computation Time (s)640.7 | 8 | |
| Analytic Function Optimization | P-01 | Computation Time (s)3.28 | 8 | |
| Analytic Function Optimization | P-02 | Computation Time (s)2.25 | 8 |
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