Lq estimates for rearrangements of Fourier series
| Data(s) |
1966
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|---|---|
| Resumo |
<p>This work is concerned with estimating the upper envelopes S* of the absolute values of the partial sums of rearranged trigonometric sums. A.M. Garsia [Annals of Math. 79 (1964), 634-9] gave an estimate for the L<sub>2</sub> norms of the S*, averaged over all rearrangements of the original (finite) sum. This estimate enabled him to prove that the Fourier series of any function in L<sub>2</sub> can be rearranged so that it converges a.e. The main result of this thesis is a similar estimate of the L<sub>q</sub> norms of the S*, for all even integers q. This holds for finite linear combinations of functions which satisfy a condition which is a generalization of orthonormality in the L<sub>2</sub> case. This estimate for finite sums is extended to Fourier series of L<sub>q</sub> functions; it is shown that there are functions to which the Men’shov-Paley Theorem does not apply, but whose Fourier series can nevertheless be rearranged so that the S* of the rearranged series is in L<sub>q</sub>. </p> |
| Formato |
application/pdf |
| Identificador |
http://thesis.library.caltech.edu/9199/1/Greenhall_ca_1966.pdf Greenhall, Charles August (1966) Lq estimates for rearrangements of Fourier series. Dissertation (Ph.D.), California Institute of Technology. http://resolver.caltech.edu/CaltechTHESIS:10052015-134053571 <http://resolver.caltech.edu/CaltechTHESIS:10052015-134053571> |
| Relação |
http://resolver.caltech.edu/CaltechTHESIS:10052015-134053571 http://thesis.library.caltech.edu/9199/ |
| Tipo |
Thesis NonPeerReviewed |
