Depinning of an interface from a rough self-affine wall delimiting an
attractive substrate is described in terms of directed paths on a squa
re lattice. Short range interactions are assumed and the phase diagram
is determined by transfer matrix methods For several values of zeta(W
), the roughness exponent of the wall. For all zeta(W) the Following s
cenario is observed. Ar a very low-temperature T, the interface is not
pinned for wall attraction energies below a certain zeta(W)-dependent
, nonzero threshold. This contrasts with the case of smooth walls, for
which the threshold is zero. In a range of attraction energies just b
elow the threshold, a pinning transition first occurs, as T increases,
followed by a depinning one (reentrant depinning). This unusual reent
rance phenomenon, in which; upon increasing T, dewetting is followed b
y wetting, is peculiar of self-affine roughness and does not occur, e.
g., with a periodic substrate corrugation, The nature of both wetting
and dewetting transitions is determined by the value of zeta(W). As fo
und in related work, the two transitions are both continuous or both f
irst-order, according to whether zeta(W)<1/2, or zeta(W)>1/2, respecti
vely. The border value zeta(0) = 1/2 coincides with the intrinsic roug
hness of the interface in the bulk.