Humboldt-Universität zu Berlin - Mathematisch-Naturwissenschaftliche Fakultät - Institut für Mathematik

Für den Bereich Statistik

A. Carpentier, S. Greven, W. Härdle, M. Reiß, V. Spokoiny

Ort

Weierstrass-Institut für Angewandte Analysis und Stochastik
ESH, 
Mohrenstrasse 39
10117 Berlin

Zeit

mittwochs, 10.00 - 12.00 Uhr

Programm

 

 

22. April 2026

 Eddi Aamari & Arthur Stephanovich (École normale supérieure u. ENSAE-CREST, Paris)

Regularity of the score and convergence rates of generative diffusion models

Abstract: 

We show that diffusion-based generative models adapt to the smoothness of the target distribution: the score function inherits the target’s regularity. Leveraging this adaptivity, we obtain a concise proof that diffusion models achieve minimax-optimal rates for density estimation

29. April 2026

 Nicola Gnecco (Imperial College London) 

Extremes of Structural Causal Models

Abstract: The behaviour of extreme observations is well-understood for time series or spatial data, but little is known if the data generating process is a structural causal model (SCM). We study the behavior of extremes in this model class, both for the observational distribution and under extremal interventions. We show that under suitable regularity conditions on the structure functions, the extremal behavior is described by a multivariate Pareto distribution, which can be represented as a new SCM on an extremal graph. Importantly, the latter is a sub-graph of the graph in the original SCM, which means that causal links can disappear in the tails. We further introduce a directed version of extremal graphical models and show that an extremal SCM satisfies the corresponding Markov properties. Based on a new test of extremal conditional independence, we propose two algorithms for learning the extremal causal structure from data. The first is an extremal version of the PC-algorithm, and the second is a pruning algorithm that removes edges from the original graph to consistently recover the extremal graph. The methods are illustrated on river data with known causal ground truth.

05. Mai 2026

     Vladimir Spokoiny (WIAS)

13. Mai 2026

 Holger Dette (RUB)

Multiple change point detection in functional data with applications to biomechanical fatigue data

Abstract: 

Injuries to the lower extremity joints are often debilitating, particularly for professional athletes. Understanding the onset of stressful conditions on these joints is therefore important in order to ensure prevention of injuries as well as individualised training for enhanced athletic performance. We study the biomechanical joint angles from the hip, knee and ankle for runners who are experiencing fatigue. The data is cyclic in nature and densely collected by body worn sensors, which makes it ideal to work with in the functional data analysis (FDA) framework. 

We develop a new method for multiple change point detection for functional data, which improves the state of the art  with respect to at least two  novel aspects. First, the curves are compared with respect to their maximum  absolute deviation, which leads to a better interpretation of local changes in the functional data compared to classical $L^2$-approaches. Secondly, as slight aberrations are to be often expected in a human movement data, our method will not detect arbitrarily small changes but hunts for relevant changes, where maximum absolute deviation between the curves exceeds a specified threshold, say $\Delta >0$. We recover multiple changes in a long functional time series of biomechanical knee angle data, which are larger than the desired threshold $\Delta$, allowing us to identify changes purely due to fatigue. In this work, we analyse data from both controlled indoor as well as from an uncontrolled outdoor (marathon) setting.

 

20. Mai 2026

Johannes Schmidt-Hieber (Twente)

 

 

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27. Mai 2026    

 Alexander Meister (Rostock)

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03. Juni 2026

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10. Juni 2026

     Michael Soerense (Copenhagen)

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17. Juni 2026

      Anna Calissano ( University College London)

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24. Juni 2026

      Bertrand Even (LMO, Orsay)

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01. Juli 2026

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08. Juli 2026

      Gilles Blanchard (Paris Orsay)

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15. Juli 2026

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Für Rückfragen wenden Sie sich bitte an:

Frau Marina Filatova

Mail: marina.filatova@hu-berlin.de
Telefon: +49-30-2093-45460
Humboldt-Universität zu Berlin
Institut für Mathematik
Unter den Linden 6
10099 Berlin, Germany