Some analytical properties of the dilated SCF Equations

We prove that the Mayer-Montroll equation with a nonnegative potential in a finite volume has a unique solution for all values of chemical activity except for a discrete set. This solution is a meromorphic function of the chemical activity.

Some properties of solutions of initial value problems and mixed initialboundary value problems of a class of wave equations are discussed. Wave modes are defined and it is shown that for the given class of wave equations there is a one to one correspondence with the roots coi(k) or kj(~o) of the di

In this paper, we consider the one-dimensional heat conduction equation on the interval [0, 1]. We investigate the integrals of the solution u with respect to the space and time variables and the equivalents of the integrals in the numerical solution. We give the properties of the functions E : R+O