For the diffusion-controlled A + B --> products reaction in d-dimensio
nal tubular spaces, with length L and width W, where L >> W, we show t
hat the Ovchinnikov-Zeldovich reactant segregation has no upper critic
al dimension and that the reciprocal density rho(-1) scales asymptotic
ally with W(d-1/2)t(1/4). This is consistent with Li's scaling ansatz
for d = 2, 3 and with Monte Carlo simulations. For the crossover time
t(c) this gives a scaling relation t(c) similar to W-alpha provided th
at W is wide enough to allow segregation at t < t(c). Similar scaling
arguments are used to derive the scaling relations between rho(-1) and
W and between t(c) and W for the A + A --> 0 and A + C --> C reaction
s in d-dimensional tubular lattices. We also extend these scaling rela
tions to square slab spaces of volume L-2 X Wd-2 and to tubular or squ
are-slab spaces with fractal cross sections. (C) 1997 Elsevier Science
B.V.