On the normalization of wave functions for bound states in a single-well potential when certain phase-integral approximations of arbitrary order are used: Per Olof Fröman. Institute of Theoretical Physics, University of Uppsala, Uppsala, Sweden

Simple final formulae are obtained for the normalization factors of wavefunctions for bound states in a one-dimensional, single-well potential, when use is made of certain arbitrary-order phase-integral approximations, which may be modified in a convenient way.

Following the approach of Jones, Low, and Young, a generalized O(2,l) expansion is developed for amplitudes that have a power bounded growth asymptotically. The expansion, set up in an 0(1, 1) basis, holds in a new kinematical region, where all the incoming and outgoing clusters have space-like 0(2,

Onemole samples of all three hydrogen isotopes in liquid form have been employed to obtain complete angular distributions of the absolute differential cross sections for n-D scattering at neutron energies of 5.6,7.0, 8.0,9.0, 18.55,20.5, and 23.0 MeV, for n-T scattering at 6.0,9.0,18.0, 19.5, 21.0,

An exact formula for quanta1 expectation values associated with bound states in a general potential is derived. The formula does not contain wavefunctions, but is expressed in terms of derivatives, with respect to an auxiliary parameter and with respect to the energy, of a function appearing in an e