Quantum Mechanics

kvantove grafyThe beauty of quantum mechanics is founded on the fact that it is a mathematically rigorous theory that can be built from a few axioms. Based on these axioms, a complete theory can be obtained by applying ideas of functional analysis and spectral theory. For many applications, it is not necessary to deal with the nuances and details of this mathematical description. However, for more complicated systems or some interesting effects, it is necessary to take these details into account, otherwise the model would lead to incorrect predictions.

We study the properties of various approximate models describing real physical situations. These models can explain and predict various physical phenomena. The advantage of these models is very often analytical solvability, which is not possible for a real system. The stability of quantum systems is related to the existence of bound states and the description of their properties is also a major issue. Within the scope of rigorous results on the stability of matter, there are still many open questions that deserve to be answered.

 

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Staff

NameEmailRoomTel.
prof. RNDr. Pavel Exner DrSc.This email address is being protected from spambots. You need JavaScript enabled to view it.420776154823
RNDr. Ing. Michal Jex Ph.D.This email address is being protected from spambots. You need JavaScript enabled to view it.Břehová, 13420771276625