What is Bound states: Definition and 76 Discussions
In quantum physics, a bound state is a quantum state of a particle subject to a potential such that the particle has a tendency to remain localized in one or more regions of space. The potential may be external or it may be the result of the presence of another particle; in the latter case, one can equivalently define a bound state as a state representing two or more particles whose interaction energy exceeds the total energy of each separate particle. One consequence is that, given a potential vanishing at infinity, negative-energy states must be bound. In general, the energy spectrum of the set of bound states is discrete, unlike free particles, which have a continuous spectrum.
Although not bound states in the strict sense, metastable states with a net positive interaction energy, but long decay time, are often considered unstable bound states as well and are called "quasi-bound states". Examples include certain radionuclides and electrets.In relativistic quantum field theory, a stable bound state of n particles with masses
{
m
k
}
k
=
1
n
{\displaystyle \{m_{k}\}_{k=1}^{n}}
corresponds to a pole in the S-matrix with a center-of-mass energy less than
∑
k
m
k
{\displaystyle \textstyle \sum _{k}m_{k}}
. An unstable bound state shows up as a pole with a complex center-of-mass energy.
This is not a homework problem, just a question I encountered I thought I should figure out.
Homework Statement
....__... _______
..._____...|..|_ ..|-------------Energy
....|_|...|_|
...A...B.C.D..E...FEdited due to formatting of my picture. Please ignore the periods I had to use them to...
Hello all,
This may be my very first post on Physics Forums. I am a 1st year physics grad student and need some help on something that's been bugging me. Suppose we have two spin half particles in a bound state. The total spin will either be 0 or 1. The spin 0 state, for example, would be...
Homework Statement
How many bound states are there quantum mechanically ?
We are told to approach the problem semi classically.
Consider the Hamiltonian function
H : R 2n → R
(whose values are energies), and for E0 < E1 the set
{(p, x) ∈ R 2n |H(p, x) ∈ [E0 , E1 ]} ⊆ R 2n
...
Suppose a particle is subject to a spherically symmetric potential V(r) such that V(r) = -V_0, V_0 > 0, for 0\leq r \leq a and V(r) = 0 elsewhere. If we were considering a non-relativistic particle, we would have bound states for -V_0 < E < 0 (which I understand); however, since the particle is...
If I look at the energy of the hydrogen atom, the energy is proportional to the mass of the electron (or more precisely, the reduced mass). Does this mean that without a Higgs mechanism, there are no bound states of the hydrogen atom? (Or is it just an artifact of a non-relativistic theory that...
# bound states in a given system??
Homework Statement
An electron is confined to a potential well of finite depth and width, 10^-9 cm. The eigenstate of highest energy of this system corresponds to the value ¥=3.2.
a) How many bound states does the system have?
b) Estimate the energy...
Homework Statement
i have a finite square well and I have to calculate how many bound states exist in it. I have the depth and the width of the well but I cannot find an equation anywhere to help me calculate it?
Homework Statement
I have to show that the delta function bound state energies can be derived from the finite square well potential.
Homework Equations
The wave functions in the three regions for the finite square well. (See wikipedia)
The Attempt at a Solution
1. I start from the...
In all the possible potentials I have encountered so far, it seems that the bound states (i.e. E < [V(-infinity) and V(infinity)]) always results in a discrete spectrum of energies, whereas the scattering states (E > [V(-infinity) and V(infinity)]) always results in a continuous spectrum of...
Homework Statement
Find the solutions of even and odd parity from the transcendental equations then find the number of bound states that are possible for a potential such that p(max) = 4?
Homework Equations
p=ka/2 & p(max)^2 = (u(not)a^{2}/4), u(not) =...
Possible bound states of a one-dimensional square well... I'm Lost!
Homework Statement
Find the solutions of even and odd parity from the transcendental equations then find the number of bound states that are possible for a potential such that p(max) = 4?
Homework Equations
p=ka/2 &...
We have a potential that is (1/2)kx^2 for x>0 and is infinity for x<0 ( half harmonic oscillator.
Now i want to calculate the bound states of the system for given E. My question is this:
Do we apply
1. \int p(x) dx = (n - \frac{1}{4} ) h ( Since there is only one turning point that can...
Suppose I have Schroedinger equation in the form:
-u''(x)+V(x)u(x)=Eu(x)
The potential is such that as |x| -> Infinity, V(x) reaches a constant positive value. In this case can we have bound state/plane wave solutions for u(x) with E > 0 ?
Hello:
There is a well known theorem which asserts that every attractive 1D potential has at least one bound state; in addition, this theorem does not hold for the 2D or 3D cases. I've been looking for a proof in my textbooks on qm but I've been unable to find it. Can you help me out?
Thanks!
if i have a quantum well structure... and i am using infinite well approximations,
how do i get the maximum number of bound states supported inside each well
thnks
Homework Statement
I am confused about bound states in QM. My book defines bound states as those in which the particle cannot escape to infinite.
It then gives an example of a potential which is infinite when x is less than 0, -V_0 when x is between 0 and a, and 0 when x >= a.
But then...
Homework Statement
Hi I'm having difficulty in understanding how to calculate the radius for certain situations.
for example, I have a question that asks me to calculate the radius and binding energy of muonic hydrogen.
Homework Equations
The Attempt at a Solution
my first...
I have a question about bound states as they relate to a question on my homework...
From what I can see, bound states in quantum mechanics are associated with energies that are discrete, not continuous. I don't really understand why...
In my homework problem we are given a set of potential...
A recent preprint on Time in Quantum Theory
( http://www.rzuser.uni-heidelberg.de/~as3/TimeInQT.pdf ) by Dieter H Zeh has brought my attention to the question of the `speed of quantum changes'. While the classical discussions of nonlocality in Quantum Mechanics (QM) and consequences of Bell's...
Homework Statement
A particle of mass m moves in three dimensions in a potential energy field
V(r) = -V0 r< R
0 if r> R
where r is the distance from the origin. Its eigenfunctions psi(r) are governed by
\frac{\hbar^2}{2m} \nabla^2 \psi + V(r) \psi = E \psi
ALL in spherical coords...
I read somewhere that quantum field theory does not allow calculations and predictions of bound states in a satisfactory way. Is that true and how much is that a problem given that qft claims to be so fundamental?
Hi,
I'm working on an introductory qm project, hope somebody has the time to help me (despite the length of this post), it will be highly appreciated.
My goal is to determine the bound states and their energies for the potential
V_j(x) =...
To my understanding, when a particle is in a bound state, it is "stuck" because its total energy is less than the surrounding potential.
I am confused on how to prove a particular potential has no bound states. For example, in one problem, I am asked to show that there is no bound state in a...
Hello,I'm physics student.I'm from Vietnam and my English is not very good.
I was wondering if anyone could help me out with a question : what are scattered states and bound states ?
I'm interested in "Temperature-dependent Coulomb interation in hydrogenic systems".
In this...