Decomposition of densities in individual contributions

1. Decomposition of densities in individual contributions M. P. Pato University of São Paulo (USP)

2. Tracy-Widom distributions

3. Applications: • Longest increasing subsequence in a random permutation follows F2, and also F1 and F4 • Growth processes F2and also F1 • Random tilings F2 • Queuing theory F2 • Universality: • TW hold if is replaced by • Impact: it is a distribution of extreme values of correlated sequences

4. Poisson process • For a i.i.d. sequence of density ρ(x) the probability of • the extreme value xmax be less than a value t is • F ~ exp [-exp (-y) ], (Gumbel) if ρ(x) decays fast (exponentially) • F ~ exp( - 1/yμ) , (Fréchet) if ρ(x) decays with power μ+1 • F ~ exp( y) , (Weibull) if ρ(x) is bounded • y is properly normalized • FN → F max-stability property → universality

21. Tracy-Widom distributions

23. Poisson process • For a i.i.d. sequence of density ρ(x) the probability of • the extreme value xmax be less than a value t is • F ~ exp [-exp (-y) ], (Gumbel) if ρ(x) decays fast (exponentially) • F ~ exp( - 1/yμ) , (Fréchet) if ρ(x) decays with power μ+1 • F ~ exp( y) , (Weibull) if ρ(x) is bounded • y is properly normalized • FN → F max-stability property → universality