A transport approach to the cutoff phenomenon

Mathphys Analysis Seminar

Date: June 30, 2026 | 5:15 pm – 6:15 pm
Speaker: Francesco Pedrotti, ETH Zürich
Location: Office Bldg West / Ground floor / Heinzel Seminar Room (I21.EG.101)
Language: English

The cutoff phenomenon is a sharp transition in the convergence of high-dimensional Markov chains to equilibrium: the total variation distance remains close to 1 for a long time and then rapidly decreases to almost 0 over a much shorter time window.
It was initially discovered in the context of card shuffling by Diaconis and Shahshahani, and since then observed in a variety of different models. In spite of its ubiquity, it is still largely unexplained, and most proofs are model-specific.
In this talk, we discuss a high-level approach to establishing cutoff based on transport inequalities, and we illustrate it for a popular algorithm known as the Proximal Sampler.
Based on joint work with Justin Salez.

Francesco Pedrotti Office Bldg West / Ground floor / Heinzel Seminar Room (I21.EG.101) June 30, 2026 A transport approach to the cutoff phenomenon

More Information:

Date:
June 30, 2026
5:15 pm – 6:15 pm

Speaker:
Francesco Pedrotti, ETH Zürich

Location:
Office Bldg West / Ground floor / Heinzel Seminar Room (I21.EG.101)

Language:
English

Contact:

Oosthuizen-Noczil Birgit

Email:
boosthui@ist.ac.at

Downloads:

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A transport approach to the cutoff phenomenon

Mathphys Analysis Seminar

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