- #1
luisgml_2000
- 49
- 0
I've heard some people say that the wave function and its first derivative must be continuous because the probability to find the particle in the neighborhood of a point must be well defined; other people say that it's because it's the only way for the wave function to be physically significant. There is even another hypothesis, which states it's a consequence of the eigenvalue equation
H[tex]\Psi[/tex]=E[tex]\Psi[/tex]
Which idea is the right one?
H[tex]\Psi[/tex]=E[tex]\Psi[/tex]
Which idea is the right one?