Alfred Müller scite author profile

We consider probability metrics of the following type: for a class of functions and probability measures P, Q we define A unified study of such integral probability metrics is given. We characterize the maximal class of functions that generates such a metric. Further, we show how some interesting properties of these probability metrics arise directly from conditions on the generating class of functions. The results are illustrated by several examples, including the Kolmogorov metric, the Dudley metric and the stop-loss metric.

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Photoexcitation of a Volume Plasmon inC60Ions

Scully

et al. 2005

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Neutral C60 is well known to exhibit a giant resonance in its photon absorption spectrum near 20 eV. This is associated with a surface plasmon, where delocalized electrons oscillate as a whole relative to the ionic cage. Absolute photoionization cross-section measurements for C+60, C2+60, and C3+60 ions in the 17-75 eV energy range show an additional resonance near 40 eV. Time-dependent density functional calculations confirm the collective nature of this feature, which is characterized as a dipole-excited volume plasmon made possible by the special fullerene geometry.

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High-resolution measurement of dielectronic recombination of lithiumlikeCu26+

et al. 1992

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Generalized Quantiles as Risk Measures

et al. 2013

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Generalized quantiles as risk measures

Bellini

Klar

Müller

et al. 2014

Insurance: Mathematics and Economics

189

114

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Alfred Müller

Integral Probability Metrics and Their Generating Classes of Functions

Photoexcitation of a Volume Plasmon inC60Ions

High-resolution measurement of dielectronic recombination of lithiumlikeCu26+

Generalized Quantiles as Risk Measures

Generalized quantiles as risk measures

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