Possible canonical distributions for finite systems with nonadditive energy

## S y n o p s i s A method is presented which enables one to obtain density expansions for the distribution functions for finite systems from integro-differential equations involving derivatives of these distribution functions with respect to density. I t is shown t h a t the ~tth coefficient in

We derive an expression for direct non-radiative electronic energy transfer which accommodates the possibility of a distribution of donor environments. At present we deal with situations in which the sample has a plane of symmetry for the concentration profiles. The relation enables one to evaluate

We have recently shown that the dispersion and the energy square relative uctuations of a ÿnite system in contact with a ÿnite heat bath depends on the number of degrees of freedom of the system and of the bath. In this paper, we present numerical simulations which support this result.