Add to ORKG4 pages, no figuresWe establish a connection between the level density of a gas of non-interacting bosons and the theory of extreme value statistics. Depending on the exponent that characterizes the growth of the underlying single-particle spectrum, we show that at a given excitation energy the limiting distribution function for the number of excited particles follows the three universal distribution laws of extreme value statistics, namely Gumbel, Weibull and Fréchet. Implications of this result, as well as general properties of the level density at different energies, are discussed
International audienceWe present a descriptive review of physical problems dealing with extreme valu...
We study the extremal dynamics emerging in an out-of-equilibrium one-dimensional Jepsen gas of $(N+1...
We review a progress in understanding of statistical properties of a quantum degenerate Bose gas. We...
4 pages, 1 figureWe present a theory that accurately describes the counting of excited states of a n...
We present a theory that accurately describes the counting of excited states of a noninteracting fer...
18 pages, 15 figuresInternational audienceMotivated by the role that spectral properties play for th...
We discuss recent results on the relation between the strongly interacting one-dimensional Bose gas ...
15 pages, 2 figuresInternational audienceWe consider the statistics of volume fluctuations in a one-...
We study the extreme value distribution of stochastic processes modeled by superstatistics. Classica...
It has been recently shown numerically that the transition from integrability to chaos in quantum sy...
RevTex, 13 pages, 6 pdf figuresInternational audienceWe study statistical properties of $N$ non-inte...
The knowledge of the level density as a function of excitation energy and nuclear spin is necessary ...
Summary of standard extreme-value statistics: • Let z1,..., zN be i.i.d. random variables with proba...
We present a complete theory for the full particle statistics of the positions of bulk and extremal ...
We compute the level density of a two--component Fermi gas as a function of the number of particles,...
International audienceWe present a descriptive review of physical problems dealing with extreme valu...
We study the extremal dynamics emerging in an out-of-equilibrium one-dimensional Jepsen gas of $(N+1...
We review a progress in understanding of statistical properties of a quantum degenerate Bose gas. We...
4 pages, 1 figureWe present a theory that accurately describes the counting of excited states of a n...
We present a theory that accurately describes the counting of excited states of a noninteracting fer...
18 pages, 15 figuresInternational audienceMotivated by the role that spectral properties play for th...
We discuss recent results on the relation between the strongly interacting one-dimensional Bose gas ...
15 pages, 2 figuresInternational audienceWe consider the statistics of volume fluctuations in a one-...
We study the extreme value distribution of stochastic processes modeled by superstatistics. Classica...
It has been recently shown numerically that the transition from integrability to chaos in quantum sy...
RevTex, 13 pages, 6 pdf figuresInternational audienceWe study statistical properties of $N$ non-inte...
The knowledge of the level density as a function of excitation energy and nuclear spin is necessary ...
Summary of standard extreme-value statistics: • Let z1,..., zN be i.i.d. random variables with proba...
We present a complete theory for the full particle statistics of the positions of bulk and extremal ...
We compute the level density of a two--component Fermi gas as a function of the number of particles,...
International audienceWe present a descriptive review of physical problems dealing with extreme valu...
We study the extremal dynamics emerging in an out-of-equilibrium one-dimensional Jepsen gas of $(N+1...
We review a progress in understanding of statistical properties of a quantum degenerate Bose gas. We...