In many situations, most prominently in quantum mechanics, it is important to understand well the eigenvalues and associated eigenfunctions of certain self-adjoint differential operators. The goal of this workshop was to study the strong link between spectral properties of such operators and the underlying geometry which might be randomly generated. By combining ideas and methods from spectral geometry and probability theory, we hope to stimulate new research including important topics such as Bose–Einstein condensation in random environments
The Bose gas in a box with Neumann boundary conditions / C. Boccato. - In: OBERWOLFACH REPORTS. - ISSN 1660-8933. - (2023), pp. 26-29. [Epub ahead of print] ((Intervento presentato al convegno Mini-Workshop: A Geometric Fairytale full of Spectral Gaps and Random Fruit tenutosi a Mathematisches Forschungsinstitut Oberwolfach nel 2022.
The Bose gas in a box with Neumann boundary conditions
C. Boccato
2023
Abstract
In many situations, most prominently in quantum mechanics, it is important to understand well the eigenvalues and associated eigenfunctions of certain self-adjoint differential operators. The goal of this workshop was to study the strong link between spectral properties of such operators and the underlying geometry which might be randomly generated. By combining ideas and methods from spectral geometry and probability theory, we hope to stimulate new research including important topics such as Bose–Einstein condensation in random environmentsFile | Dimensione | Formato | |
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