Sacha Friedli scite author profile

International audienceWe describe the scaling limit of the nearest neighbour prudent walk on the square lattice, which performs steps uniformly in directions in which it does not see sites already visited. We show that the process eventually settles in one of the quadrants, and derive its scaling limit, which can be expressed in terms of a pair of independent stable subordinators. We also show that the asymptotic speed of the walk is well-defined in the L_1 -norm and equals 3/7. This process possesses unusual properties: it is ballistic but does not have an asymptotic direction, and several natural observables display ageing

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On the Singularity of the Free Energy at a First Order Phase Transition

Friedli

Pfister²

2004

Communications in Mathematical Physics

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A note on the Bramson–Kalikow process

Friedli¹

2015

Braz. J. Probab. Stat.

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On the Truncation of Systems with Non-Summable Interactions

Friedli

Lima²

2006

J Stat Phys

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In this note we consider long range $q$-states Potts models on $\mathbf{Z}^d$, $d\geq 2$. For various families of non-summable ferromagnetic pair potentials $\phi(x)\geq 0$, we show that there exists, for all inverse temperature $\beta>0$, an integer $N$ such that the truncated model, in which all interactions between spins at distance larger than $N$ are suppressed, has at least $q$ distinct infinite-volume Gibbs states. This holds, in particular, for all potentials whose asymptotic behaviour is of the type $\phi(x)\sim \|x\|^{-\alpha}$, $0\leq\alpha\leq d$. These results are obtained using simple percolation arguments.Comment: 18 pages, 4 figure

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Sacha Friedli

Statistical Mechanics of Lattice Systems

Scaling Limit of the Prudent Walk

On the Singularity of the Free Energy at a First Order Phase Transition

A note on the Bramson–Kalikow process

On the Truncation of Systems with Non-Summable Interactions

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