]. A. Anc78 and . Ancona, Principe de HarnackàHarnackà lafrontì ere et théorème de Fatou pour un opérateur elliptique dans un domaine Lipschitzien. Annales de l' Institut Fourier, pp.169-213, 1978.

]. A. Anc86 and . Ancona, On strong barriers and an inequality of Hardy for domains in R n The dimension of the SLE curves, Journal of the London Mathematical Society, vol.34, issue.2, pp.274-290, 1986.

]. C. Bis96 and . Bishop, Minkowski dimension and the Poincaré exponent, de Gennes. Scaling concepts in polymer physics, pp.231-246, 1979.

]. D. Gkl-+-06, K. Grebenkov, P. Kolwankar, B. Levitz, M. Sapoval et al., Brownian flights over a fractal nest and first-passage statistics on irregular surfaces, Phys. Rev. Lett, vol.96, 2006.

J. Heinonen, T. Kilpeläinen, and O. Martio, Nonlinear Potential Theory of Degenerate Elliptic Equations, 1993.

C. [. Jerison and . Kenig, Boundary behavior of harmonic functions in non-tangentially accessible domains, Advances in Mathematics, vol.46, issue.1, pp.80-147, 1982.
DOI : 10.1016/0001-8708(82)90055-X

T. [. Jones and . Wolff, Hausdorff dimension of harmonic measures in the plane, Acta Mathematica, vol.161, issue.0, pp.131-144, 1988.
DOI : 10.1007/BF02392296

T. Kennedy, A faster implementation of the pivot algorithm for self-avoiding walks, Journal of Statistical Physics, vol.106, issue.3/4, pp.407-429, 2002.
DOI : 10.1023/A:1013750203191

]. T. Ken05 and . Kennedy, A fast algorithm for simulating the Chordal Schramm-Loewner Evolution, p.508002, 2005.

G. [. Madras and . Slade, The self-avoiding walk. Probability and its Applications, Birkhäuser, 1993.

[. Rohde and O. Schramm, Basic properties of SLE, Annals of Mathematics, vol.161, issue.2, pp.883-924, 2005.
DOI : 10.4007/annals.2005.161.883