Uniqueness for higher dimensional trigonometric series

J. Marshall Ash mash@math.depaul.edu

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Abstract

Five uniqueness questions for multiple trigonometric series are surveyed. If a multiple trigonometric series converges everywhere to zero in the sense of spherical convergence, of unrestricted rectangular convergence, or of iterated convergence, then that series must have every coefficient being zero. But the cases of square convergence and restricted rectangular convergence lead to open questions.

Keywords

Uniqueness , Multiple trigonometric series , Spherical convergence , unrestricted rectangular , restricted rectangular

J. Marshall Ash Department of Mathematics, Depaul University, Chicago, USA.

Pages: 93–121
Date Published: 2002-06-01
Vol. 4 No. 2 (2002): CUBO, Matemática Educacional

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Published

2002-06-01

How to Cite

[1]

J. Marshall Ash, “Uniqueness for higher dimensional trigonometric series”, CUBO, vol. 4, no. 2, pp. 93–121, Jun. 2002.

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Vol. 4 No. 2 (2002): CUBO, Matemática Educacional

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Articles

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