On an unexpected symmetry of the Coulomb potential in the Debye-Smoluchowski equation

## A properly modified inner boundary condition is used in an analysis of the conditional reaction probability, &(ro I r). using the Debye-Smoluchowski equation\_ It is shown that the Coulomb potential modifies the reaction velocity at the boundary by the addition of a drift term. @(ro, t) is iden

The calculation of eigenvaln~ in a central field involve~ the matching, by Newton-Raph son or otherwise, of forw~d end backward trial soluttuns Of the r~dial Schr~dinger equation; the backward inlegration is commenced in a re~ion where the potential has assumed |t~ asymptotic form. For an asymptotic

Some features of the multipole expansion of the Coulomb potential V for a system of point charges are studied. It is shown that multipole expansion is convergent both locally in L,(R3) and weakly on some classes of functions. One-particle Hamiltonians H, = Ha + V,, where Ha is the kinetic energy ope

The operntor associated with the so-called "time derivative of the dipole acceleration" foorm;rlntloa of the oscillator strength has previously been found to be imalid for escitations to or from s-orbitats. It is shown that the use of n cut-off Coutomb potential teads to contributions of delta func