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Learning Trigonometric Polynomials from Random Samples and Exponential Inequalities for Eigenvalues of Random Matrices

Probability 2010-11-10 v2 Statistics Theory Statistics Theory

Abstract

Motivated by problems arising in random sampling of trigonometric polynomials, we derive exponential inequalities for the operator norm of the difference between the sample second moment matrix n1UUn^{-1}U^*U and its expectation where UU is a complex random n×Dn\times D matrix with independent rows. These results immediately imply deviation inequalities for the largest (smallest) eigenvalues of the sample second moment matrix, which in turn lead to results on the condition number of the sample second moment matrix. We also show that trigonometric polynomials in several variables can be learned from constDlnDconst \cdot D \ln D random samples.

Keywords

Cite

@article{arxiv.math/0701781,
  title  = {Learning Trigonometric Polynomials from Random Samples and Exponential Inequalities for Eigenvalues of Random Matrices},
  author = {Karlheinz Groechenig and Benedikt M. Poetscher and Holger Rauhut},
  journal= {arXiv preprint arXiv:math/0701781},
  year   = {2010}
}

Comments

revised version