Ma. Nunez, GENERAL CRITERIA FOR ASSESSING THE ACCURACY OF APPROXIMATE WAVE-FUNCTIONS AND THEIR DENSITIES, International journal of quantum chemistry, 53(1), 1995, pp. 27-35
By means of examples, Lowdin showed that L(2) convergence of approxima
te wave functions psi(n) to the exact psi using the single limit lim(n
-->infinity)[psi(n), A psi(n)] = [psi, A psi] is not sufficient to com
pute accurate expectation values. It is shown that L(2) convergence is
indeed a sufficient condition to compute accurate expectation values
using iterated limits lim(m-->x) lim(n-->x) [psi(n), A psi(m)] = [psi,
A psi] instead of a single limit. Practical conditions that guarantee
the stability of single-limit calculations are given. It is also show
n that the L(2) convergence of wave functions implies the convergence
in the L(1)(R(3))-norm of their corresponding densities. This permits
us to prove Weinhold's conjecture that the rate of convergence of dens
ities are greater than that of wave functions. The results are extende
d to the momentum space, and their equivalence with those of position
space is shown. Properties of L(p) spaces are used to introduce the Ca
uchy criterion that permits us to check the convergence in norm of app
roximate wave functions and their densities, as well as to estimate ex
act errors. This is illustrated by a numerical example. (C) 1995 John
Wiley and Sons, Inc.