Key points are not available for this paper at this time.
A general theory is given for the quenched dilute s-state Potts and n-vector models in any dimension d. It is shown that for T0 at the percolation threshold the Potts thermal exponent ₓ equals the percolation exponent , implying a crossover exponent =1, for any s and d. For the n-vector model (n>1), ₓ={}{ₑ}, where ₑ is a resistivity critical exponent. Agreement with recent experiments for two-dimensional dilute Ising and Heisenberg systems is excellent.
Antonio Coniglio (Mon,) studied this question.