This repository was archived by the owner on Jul 24, 2024. It is now read-only.
This repository was archived by the owner on Jul 24, 2024. It is now read-only.
Basics of tempered distributions #16386
Description
This is another tracking issue for me, but if anyone is interested in helping out, then I would be very happy.
The goal is to get tempered distributions and the Fourier transform going and this needs several independent results:
- An efficient characterization of continuity for Fréchet spaces
Strictly speaking we don't need Fréchet spaces, but only pseudometrizable locally convex spaces.
- [Merged by Bors] - feat(analysis/locally_convex): locally bounded implies continuous #16550
- [Merged by Bors] - feat(analysis/locally_convex): first countable topologies from countable families of seminorms #16595
- Basic facts about Schwartz functions
- [Merged by Bors] - feat(analysis/schwartz_space): Multiplication of Schwartz function and functions of temperate growth #18649
- [Merged by Bors] - feat(analysis/schwartz_space): the derivative of Schwartz functions #16756
- Multiplication of Schwartz functions as a bilinear map
- Convolution
- 1-d Gaussian (would be nice to have Define Hermite polynomials #15566 for that)
- Compactly supported smooth functions
- Definition of tempered distributions
- [Merged by Bors] - feat(topology/algebra/module/strong_operator, analysis/normed_space/operator_norm): strong operator topology #16053
- Definition of tempered distributions
- [Merged by Bors] - feat(analysis/schwartz_space): Delta distribution #16638
- Fourier transform
- Definition
- [Merged by Bors] - feat(analysis/special_functions): the japanese bracket #16491
- As a continuous map on Schwartz space
- The inverse Fourier transform
- Relationship of derivatives and multiplication operators under FT