Non exponential relaxation in complex macromolecular systems may be the con
sequence of dispersedness giving rise to different free energy barriers for
different molecules. An approximate analytic formula that relates the time
derivative of the decaying function to a probability distribution for the
barrier is derived. From this, so called stretched exponentials, e(-t beta)
,are obtained from barrier distributions with width k(B)T/beta in energy an
d some asymmetry towards low energies. They may be represented as double ex
ponential functions. An exact general formula that relates the Fourier tran
sforms of the barrier height distribution and the time decaying function is
also derived. This is gives a much more stable method for the numerical de
termination of the barrier height distribution than direct inversion of the
Laplace transform. (C) 2000 Elsevier Science B.V. All rights reserved.