- Cet évènement est passé
Multiparametric Boltzmann tuning: on the crossroad of probability and convex optimisation
13 octobre 2021 @ 09:30 -10:30
Speakers: Sergey Dovgal (IMB)
Suppose that you want to randomly sample a complicated item
from a probability space, defined by a context-free grammar with given
fixed proportions of terminal letters. This problem is doable if the
number of letters is small, but turns out to be #P-complete when the
number of letters is unbounded (this is harder than NP-hard in the
current hierarchy). In fact, both enumeration and sampling problems
are computationally intractable in such a setting. However, by
slightly deforming the target probability distribution to the
so-called multiparametric Boltzmann distribution, you may get much
faster sampling algorithms, provided that there is a tuning oracle for
finding the good target weights. In this talk, I will guide you
through the concept of multiparametric Boltzmann samplers and will
show how we constructed a tuning oracle having a polynomial time-space
complexity using a convex optimisation procedure. If time permits, we
shall also discuss
* the complexity of the exact-sampling algorithm by reduction to #2-sat
* the notion of self-concordant barriers leading to a fine complexity
estimate of the tuning procedure
* numerous applications of Boltzmann samplers in combinatorics and beyond
* the link between Boltzmann tuning and maximum likelihood estimation
* the software package « Paganini » implementing our tuning concept.
This is a joint work with Maciej Bendkowski and Olivier Bodini,
accepted to publication in CPC in April 2021
The preprint is available at: https://arxiv.org/abs/2002.12771
Our software is on github: https://github.com/maciej-bendkowski/paganini
Tutorial: https://paganini.readthedocs.io/en/latest/tutorial.html
https://indico.math.cnrs.fr/event/7011/
- wpea_event_id:
- indico-event-7011@indico.math.cnrs.fr
- wpea_event_origin:
- ical
- wpea_event_link:
- https://indico.math.cnrs.fr/event/7011/