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Digitale Medien

Locally constant dyadic derivatives (1982)

Wade, W. R.

Springer

Periodica mathematica Hungarica 13 (1982), S. 71-74

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Details

ISSN: 1588-2829

Schlagwort(e): Primary 42A56 ; Walsh functions ; dyadic derivatives ; Rademacher functions

Quelle: Springer Online Journal Archives 1860-2000

Thema: Mathematik

Notizen: Abstract We show that in order for a Walsh series to be locally constant it is necessary for certain blocks of that series to sum to zero. As a consequence, we show that a functionf with a somewhat sparse Walsh—Fourier series is necessarily a Walsh polynomial if its strong dyadic derivative is constant on an interval. In particular, if a Rademacher seriesR is strongly dyadically differentiable and if that derivative is constant on any open subset of [0, 1], thenR is a Rademacher polynomial.

Materialart: Digitale Medien

URL: http://dx.doi.org/10.1007/BF01848097

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