# Department of Pure Mathematics and Mathematical Statistics

## Publications

Cluster capacity functionals and isomorphism theorems for Gaussian free fields
A Drewitz, A Prévost, PF Rodriguez
– Probability Theory and Related Fields
(2021)
1
The Sign Clusters of the Massless Gaussian Free Field Percolate on ${\mathbb{Z}^{d}, d \geqslant 3}$ Z d , d ⩾ 3 (and more)
A Drewitz, A Prévost, PF Rodriguez
– Communications in Mathematical Physics
(2018)
362,
513
Geometry of Gaussian free field sign clusters and random interlacements
A Drewitz, A Prévost, P-F Rodriguez
Critical exponents for a percolation model on transient graphs
A Drewitz, A Prévost, P-F Rodriguez
Percolation for the Gaussian free field on the cable system: counterexamples
A Prévost
First passage percolation with long-range correlations and applications to random Schrödinger operators
S Andres, A Prévost

D2.08

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