We investigate the low temperature phase of three-dimensional Edwards-Anderson model with Bernoulli random couplings. We show that at a fixed value Q of the overlap the model fulfills the clustering property: the connected correlation functions between two local overlaps decay as a power whose exponent is independent of Q for all 0 = |Q| <qEA. Our findings are in agreement with the RSB theory and show that the overlap is a good order parameter.
|Number of pages||5|
|Publication status||Published - 2009|