We now look at the corresponding heat
wave function. According to our analysis it must satisfy
(11) Essentially, this approach is based on the idea that only a conscious observer can collapse a
wave function.
A dampened
wave function described by equation (4) was studied.
An important aspect of the HT is that it not need explicitly the
wave function, it uses only the potential V and the corresponding energy levels En.
This is what quantum physicists call the 'collapse of the
wave function.'
The classical time of irreversible moments emerges from the reversible time implicit in the
wave function.
Now begins the calculation of the
wave function [psi] resulting from the continuous interaction of the free-electron
wave function [phi] with the perturbed vacuum state.
One of the main problems concerning quantum physics is how to interpret Schrodinger's
wave function and the way it describes the physical world.
Point canonical transformation [2-4], dynamical group [5,6], factorization method [7], supersymmetric quantum mechanics, and shape invariance [8-10] are methods among many which were used in the search for exact solutions of
wave function. Also, there are a lot of investigations that show how methods used to obtain analytical solutions of the Schroodinger equation can be extended to Dirac case [11-15].
where [mu] is the reduced mass, and the normalized
wave function for harmonic oscillators is defined as