REMINDER: ICTP Mathematics Seminar - Thursday 12 September, at 16:00 (Joao Pedro Ramos)

[ICTP Math Section]

Thursday 12 September, at 16:00 hrs.


Speaker: Joao Pedro Ramos (Universitaet Bonn)


Title: Fourier uncertainty principles, interpolation and uniqueness sets



Abstract: A classical result in the theory of entire functions of 
exponential type, Shannon’s interpolation formula, predicates that given 
a function whose Fourier transform vanishes outside the interval 
$[-1/2,1/2]$, it is possible to recover it from its values at the 
integers. More specifically, it holds, in a suitable sense of 
convergence, that
   $$ f(x) = \sum_{n \in \mathbb{Z}} f(n) \frac{\sin(\pi(x-n))}{\pi(x 
-n)}. $$
  This formula is unfortunately unavailable for arbitrary Schwartz 
functions on the real line, but a recent result of Radchenko and 
Viazovska provides us with an explicit construction of an interpolation 
basis for even Schwartz functions. It states, in a nutshell, that we can 
recover explicitly the function given its values at the squares of roots 
of integers.
In this expository talk, we will discuss a bit these two results, and 
explore, in connection to classical Fourier uncertainty results, the 
question of determining which pairs of sets $(A,B)$ satisfy that, if a 
Schwartz function $f$ vanishes on A and its Fourier transform vanishes 
on B, then $f \equiv 0.$


Venue:  Luigi Stasi Seminar Room (ICTP Leonardo da Vinci Building, first 
floor)