We study the ferromagnetic Ising model on thin films of random thickne
sses using Monte Carlo simulations. The films have a simple cubic latt
ice structure, length and width N, one hat surface and discretized Gau
ssian distributions of thicknesses with mean L and rms deviation Delta
L. We consider the cases of Delta L = Const for any L (type I) and De
lta L/L = const for any L (type II). A decrease of the critical temper
ature T-c(L, Delta L) for fixed L and increasing roughness (Delta L) i
s observed. The specific-heat peak of rough films of finite length is
reduced when compared to the uniform films. The susceptibility peak is
not reduced fur small roughness (Delta L less than or equal to 1), an
d decreases for larger roughness. This type of disorder is shown to be
irrelevant for the critical exponents, and two-dimensional finite-siz
e scaling relations tin the lateral length N) do not have remarkable c
orrections when compared to the uniform films. In films of type I, the
critical temperature shift t(L) = T-c(3D) - T-c(L, Delta L) scales wi
th L approximately as in the uniform films, and a small roughness beco
mes irrelevant for L>10, where three-dimensional scaling is attained.
In films of type II, t(L) decreases slowly with L, in disagreement wit
h both two- and three-dimensional behavior for L less than or equal to
10. We discuss the possible connections of our results and experiment
s in magnetic thin films. [S0163-1829(98)01922-5].