RG Analysis and Partial Differential Equations
V5B7: Selected Topics in Analysis - Introduction to Banach-valued analysis
Winter Semester 2020/2021
- Dr. Alex Amenta
- Instructor
- Prof. Dr. Christoph Thiele
- Instructor
Lectures
- Tu 10-12
- Th 10-12
Topics
Many results of the analysis of scalar-valued functions extend to functions valued in infinite-dimensional Banach spaces. Carrying out these extensions relies on (and reveals) subtle connections between Fourier analysis, probability, operator theory, and the geometry of Banach spaces. This course will cover some of the fundamental topics in the analysis of Banach-valued functions, including Bochner spaces, martingales, UMD Banach spaces, Fourier multipliers (including the Hilbert transform), and Rademacher type and cotype. Further topics will be announced as the course progresses. More information will be made available here.Prerequisites
Functional analysis (particularly Banach spaces) and measure theory. Experience with Fourier analysis and probability is recommended but not required.Administration
Link to page in BasisLiterature
- T. Hytonen, J. van Neerven, M. Veraar, and L. Weis, Analysis in Banach Spaces (volumes I and II)
- G. Pisier, Martingales in Banach Spaces.
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