Invited Plenary Speakers
DTU, Lyngby, Denmark
Frames and bases in Hilbert spaces
One of the key issues in harmonic analysis is to consider
expansions of functions or signals in terms of simple "building blocks"
with desirable features. Classically this has been done using orthonormal
bases in Hilbert spaces (or Schauder bases in Banach spaces). However,
much more flexibility and much more appealing constructions can be
obtained using the modern theory for frame decompositions. The lectures
will give an overview of the general theory of frames in Hilbert spaces,
as well as a detailed discussion of concrete frames in L2 (Gabor frames
and wavelet frames).
Yamaguchi University, Ube, Japan
Sampling sparse signals with an effective reconstruction algorithm and its application to image processing
Universidade do Algarve, Portugal
Operators of Harmonic Analysis in Some Non-Standard Function Spaces
DePaul University, Chicago, IL, U.S.A.
- 02 Feb 2012