Mathematics of the quantum many–body problem and condensed matter physics
Date: Tue, Jun 2 2009
Location: Bizkaia Technology Park, Building 500 E-48160 DERIO - Basque Country- Spain
Speakers: J.-B. Bru
The understanding of quantum phenomena in condensed matter physics, like superfluidity or Bose-Einstein condensation (see Figure 1.), represents one of the most challenging problems in modern physics, requiring new experimental and mathematical studies. Rigorous quantum many-body theory is however, a notoriously difficult subject. The hurdles that have to be overcome in order to arrive at important new mathematical results involve many different fields of mathematics such as probability theory, operator algebras, differential equations or functional analysis. I will therefore present a synthetic view of the mathematics of the quantum many-body problem in relation to my findings from the past 10 years. In particular, I will give an overview of the mathematics of ultra-cold quantum systems related to Brownian motions, large deviations, variational problems and C*-algebras. I will also provide a record of new mathematical tools I am developing with my co-authors to analyze complex phenomena (for instance, the flow equations for unbounded operators).
Figure1. Bose-Einstein condensation for temperatures <<10-5 K performed for 23Na in the MIT by the group of Wolfgang Ketterle (Nobel Prize Physics). The colours indicate the number of atoms at each velocity (red is the lowest velocity).
Non-self-adjoint operators and their spectra
9:00 - 11:00
BCAM COURSE | Semigroups generated by integro differential operators in Stochastics and Mathematical Physics
PD Dr. Yana Kinderknecht (Butko)