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How to prove that there is a bound state in the potential $U(x) = -A e^{-a |x|}$, where for all $a \in \mathbb{R}$ and $A>0$. I heard that we can say something to the minimum of this form $ \left( \psi \right| H \left| \psi \right)$ for some vector of hilbert space, but that it will give us?

So i want to know, why if there is $\psi$ such that $\left( \psi \right| H \left| \psi \right) < 0$ then there is bound state?

Thank you!

Ann
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  • Your a>0 if you are to have a sensible potential bounded below. So you accept the RR principle, no? – Cosmas Zachos Feb 13 '18 at 02:24
  • @Cosmas Zachos, I understand that any self-adjoint operator has an expansion of unity, that is, a complete set of functions, but we do not know if there are bound states. Therefore, I can not understand why it is not proved the existence of a minimum of the functional in RR principle. – Ann Feb 13 '18 at 06:41
  • $a$ can be negative?? Then the potential (and spectrum) is unbounded from below, i.e. there is no stable ground state. – Qmechanic Feb 13 '18 at 07:04
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    Anyway, if we overlook this pathology, it is essentially a duplicate of https://physics.stackexchange.com/q/143630/2451. I gave a general 1D proof in my answer. – Qmechanic Feb 13 '18 at 07:11

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The potential energy can have any reference energy without change in the outcome. Thus a negative energy is relative to the assumed reference energy. If you take a large enough negative reference, you will only have positive bound energy states.

freecharly
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  • Hi, i found Rayleigh–Ritz variational theorem: If $U(x) < 0$ for any $x \in \mathbb{R}$ and there is $\psi \in H$ such that $ \left(\psi, \psi \right) = 1$ and $ \left( \psi \right| H \left| \psi \right) < 0$. Then there is at least 1 solution of schroedinger equation. But I could not find proof of this. – Ann Feb 13 '18 at 01:31
  • It is important for me to understand why it exists. https://physics.stackexchange.com/q/143630/ – Ann Feb 13 '18 at 01:42