Abstract
We address the expected supremum of a linear combination of shifts of the sinc kernel with random coefficients. When the coefficients are Gaussian, the expected supremum is of order √log n, where n is the number of shifts. When the coefficients are uniformly bounded, the expected supremum is of order loglogn. This is a noteworthy difference to orthonormal functions on the unit interval, where the expected supremum is of order √log n for all reasonable coefficient statistics.
Original language | English |
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Pages (from-to) | 790-802 |
Number of pages | 13 |
Journal | Journal of Fourier Analysis and Applications |
Volume | 18 |
Issue number | 4 |
DOIs | |
State | Published - Aug 2012 |
Keywords
- Gaussian and Bernoulli coefficients
- Sinc kernel
- Supremum