Optimal Multiscale Learning of Linear Operators
Chen, Jiaheng, Sanz-Alonso, Daniel
We study the statistical and computational limits of learning bounded linear operators between Sobolev spaces from noisy input-output data. In wavelet coordinates, the problem is recast as an infinite-dimensional matrix regression problem with a heterogeneous two-sided multiscale structure. We establish minimax rates under Sobolev operator-norm loss and construct a finite-resolution blockwise least-squares estimator attaining these rates. The analysis reveals a nonuniform local estimation difficulty across scales, which can be exploited algorithmically: by assigning scale-adaptive sample sizes, the estimator achieves the optimal computational cost among dense least-squares implementations.
Jun-16-2026
- Country:
- North America > United States > Illinois > Cook County > Chicago (0.40)
- Genre:
- Research Report (0.63)
- Technology: