Dear colleagues,
I would like to announce the following online seminar organized by the Probability group of the University of Pisa:
Tuesday, Sept. 29, 14:00 on Microsoft Teams (the link will be sent in a forthcoming email)
Speaker: Tyler Helmuth
Title: Random spanning forests and hyperbolic symmetry
Abstract: The arboreal gas is the probability measure that arises from conditioning the random subgraph given by Bernoulli(p) bond percolation to be a spanning forest, i.e., to contain no cycles. This conditioning makes sense on any finite graph G, and in the case p=1/2 gives the uniform measure on spanning forests. The arboreal gas also arises as a q—> 0 limit of the q-state random cluster model.
What are the percolative properties of these forests? This turns out to be a surprisingly rich question, and I will discuss what is known and conjectured. I will also describe a tool for studying connection probabilities, the magic formula, which arises due to an important connection between the arboreal gas and spin systems with hyperbolic symmetry.
Based on joint work with Roland Bauerschmidt, Nick Crawford, and Andrew Swan.
Best regards,
Giacomo
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Giacomo Di Gesù
Dipartimento di Matematica
Università di Pisa
Largo Bruno Pontecorvo 5
56127 - Pisa, Italy
giacomo.digesu(a)unipi.it