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Uniqueness for multiple trigonometric and Walsh series with convergent rearranged square partial sums |
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| Authors: | J Marshall Ash Sh T Tetunashvili |
| Institution: | Department of Mathematical Sciences, DePaul University, Chicago, Illinois 60614-3504 ; Department of Mathematics, Georgian Technical University, Kostava str. 77, 0175 Tbilisi, Republic of Georgia |
| Abstract: | If at each point of a set of positive Lebesgue measure every rearrangement of a multiple trigonometric series square converges to a finite value, then that series is the Fourier series of a function to which it converges uniformly. If there is at least one point at which every rearrangement of a multiple Walsh series square converges to a finite value, then that series is the Walsh-Fourier series of a function to which it converges uniformly. |
| Keywords: | Uniqueness multiple trigonometric series multiple Walsh series rearrangements |
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