Fourier Analysis Meets Quantum Groupoids
摘要
Operator algebraic quantum groups and operator algebraic quantum groupoids offer powerful frameworks for generalising classical notions of groups and groupoids within the realms of analysis, geometry and representation theory. This work provides an expository survey of the extension of Fourier theory from the classic setting of abelian groups to these quantum contexts, with particular emphasis on the reformulation of classical constructions to accommodate noncommutative structures.