Probabilistic Approach to Black-Box Binary Optimization with Budget Constraints: Application to Sensor Placement

This paper presents a fully probabilistic approach for solving optimal experimental design problems under budget constraints.

The experimental design is viewed as a random variable and is associated with a parametric conditional distribution that inherently models the budget constraints.

The original optimization problem is replaced with an optimization over the expected value of the original objective, which is then optimized over the distribution parameters.

The resulting optimal parameter (policy) is used to sample the feasible region of binary space to produce estimates of the optimal solution(s) of the original optimization problem.

In this work we extend the family of conditional Bernoulli models to model the random variable conditioned by the total number of nonzero entries, that is, the budget constraint.

This approach (a) is generally applicable to binary optimization problems with nonstochastic black-box objective functions and budget constraints; (b) employs conditional probabilities to model and sample only the feasible region and thus considerably reduces the computational cost compared with employing soft constraints; and (c) does not employ soft constraints and thus does not require tuning of a regularization parameter, for example to promote sparsity, which is generally challenging.

The proposed approach is verified numerically using an optimal sensor placement experiment based on an advection-diffusion forward model in a parameter identification setup.