The discussion centers around the physical nature of the non-zero component of the wave function outside a finite square well for bound eigenstates. Participants explore the implications of this non-zero component, its relation to probability, and the challenges of measuring an electron's position when it is in a bound state.
Participants express differing views on the implications of finding an electron outside the well while in a bound state. There is no consensus on how to reconcile the observations with the principles of quantum mechanics, particularly regarding energy conservation and the nature of measurements.
The discussion highlights limitations in understanding the relationship between position measurements and energy states, particularly in the context of quantum mechanics where non-commuting variables complicate the interpretation of measurements.
Out side the well, for a bound state, the wave function isn't zero, but is a decaying exponential because the wave number is imaginary.Mentz114 said:I'm not sure if I understand the problem.
The square of the wave function gives the probability of finding the electron at at particular place. So the non-zero component outside the well represents a probability of finding the electron outside the barrier. If it did escape, it would no longer be in an eigenstate of the bound electron.
Atomos said:ok, suppose you are certain it is in some energy eigenstate, and you know that that eigenstate is a bound state. All of those states oscillate inside the well, and decay exponetially outside of it, so there is some probability of finding it outside the well. If you make a second observation and find it outside of the well, how is that possible? Its kinetic energy would have to be negative.
malawi_glenn said:nope its kinetic energy would be p^2/2m (non relativistic particle)
How did you reason to get negative kin E ?