High-temperature series expansions are derived for the magnetic susceptibil
ity and two-spin correlation functions for a Heisenberg ferromagnetic model
on the B-spinel lattice, The calculations are developed in the framework o
f the random phase approximation and are given for both nearest and next-ne
arest neighbour exchange integrals J(1) and J(2), respectively. Our results
are given up to order 6 in beta = (k(B)T)(-1) and are used to study the pa
ramagnetic region of the ferromagnetic spinel CdCr2S4(1-x)Se4x. The critica
l temperature T-c and the critical exponents y and v associated with the ma
gnetic susceptibility chi (T) and the correlation length xi (T) respectivel
y are deduced by applying the Pade approximant methods, The results as a fu
nction of the dilution x obtained by the present approach are found to be i
n excellent agreement with the experimental ones. (C) 2001 Elsevier Science
B.V. All rights reserved.