Publication | Open Access
Algebrability of the set of non-convergent Fourier series
93
Citations
9
References
2006
Year
Infinite Dimensional AnalysisMeasure ZeroNon-convergent Fourier SeriesFourier AnalysisE\subset \Mathbb TTopological AlgebraFunctional AnalysisFourier ExpansionInfinite Dimensional ProblemFourier Series Expansion
We show that, given a set $E\subset \mathbb T$ of measure zero, the set of continuous functions whose Fourier series expansion is divergent at any point $t\in E$ is <i>dense-algebrable</i>, i.e. there exists an infinite-dimensional, infinitely generated d
| Year | Citations | |
|---|---|---|
Page 1
Page 1