Questions tagged [anharmonic-oscillators]
Problems concerning oscillators that are not harmonic (i.e. for forces that are not linearly proportional to position).
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questions
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4answers
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Asymptotic frequency of nonlinear oscillator $\ddot x = -x-{\dot x}^3$ (speed cubed)
A particle oscillates according to the equation
$\ddot x = -x-{\dot x}^3.$ The positive positions of the particle when it changes direction, $\dot x = 0$, are $x_1,x_2,\ldots$.
I want to show that
$$\...
0
votes
1answer
42 views
Equations of the spherical pendulum in different coordinates [closed]
I am trying to derive the equations of motion of a spherical pendulum, but instead of using the angles of the spherical coordinate system $\theta$ and $\varphi$, I want to use the angles $\alpha$ and $...
1
vote
0answers
82 views
Solve nonlinear, forced and damped Duffing oscillator
I am trying to solve a Duffing type equation by using Van Der Paul's method:
\begin{align}
\ddot{x} + \omega^2 x + 2 \gamma \dot{x} + \beta x^3 = f \cos(\Omega t)
\end{align}
with $$x(t) = Re[A(t) \...
0
votes
1answer
52 views
Differential equation for the anharmonic oscillator
In my project me and my partner used the engine to constrain the system so we can see the anharmonic oscillations. In our first analysis we get only odd powers in differential equation, so there ...
4
votes
1answer
338 views
Why is a kalimba note anharmonic?
I play a kalimba, and have also recently written a toy program that helps me tune it using a "naively applied FFT" without any sophisticated DSP. The Nyquist frequency is 24 kHz.
The kalimba ...
4
votes
0answers
69 views
Compute probability current from WKB approximation
I struggle to reproduce a calculation from the Appendix of the paper "Anharmonic Oscillator: A Study of Perturbation Theory in Large Order", Physical Review D, 7 (6) 1973, link to abstract.
...
2
votes
1answer
59 views
Anharmonic oscillator without friction
My friend and I are doing a project on physics at the university. We want to describe the non-harmonic oscillator, so we built the system shown in the picture.
The problem is there is friction between ...
1
vote
0answers
36 views
What is the next higher order correction to Hooke's Law for a typical steel spring?
Near equilibrium the potential of a typical steel spring is well approximated by a quadratic function. I'm having trouble finding a reference for the what is the next-to-leading order contribution, ...
0
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1answer
45 views
Anharmonic field theory: pedagogical simplifications
Thank you all for so much help as I work through Zee's QFT book. Here I finally have a question about physics instead of math.
Zee makes several comments that the main thing left to do in QFT is find ...
1
vote
1answer
74 views
Landau-Lifshitz skips a step in anharmonic oscillations
In chapter 28 of Landau-Lifshitz Classical Mechanics textbook they try to explain how to get the motion of a particle with the Lagrangian:
$L=\frac{1}{2}m\dot{x}^{2}-\frac{1}{2}m w_{0}^{2}x^{2}-\frac{...
2
votes
2answers
623 views
What are quantum anharmonic oscillators?
I have just started studying about quantum computers (hardware side) and I am really confused about what is a quantum anharmonic oscillator. I have read somewhere that a qubit is the physical ...
2
votes
0answers
204 views
Deriving a model of a point-driven Chladni plate
Please note — this question considers a point-driven Chladni plate, not Chladni's classical experiment. I'm aware of various other questions concerning the latter here on Physics.SE.
As the title ...
5
votes
1answer
160 views
Divergent Energies and Analytical Continuation - Two questions on the inverted harmonic oscillator and the inverted double well
I have two questions on the general topic of energy potentials that diverge at infinity.
First of all, the inverted harmonic oscillator. I found this post on Physics SE, Inverted Harmonic oscillator.
...
0
votes
1answer
111 views
Approximating the energy levels of the anharmonic oscillator using WKB
I got stuck trying to solve this problem:
Given the potential $$V(x) = \frac{m\omega^2x^2}{2}-\beta x^4,\ \beta>0$$ I need to evaluate the deviation of the energy levels from the harmonic ...
4
votes
1answer
99 views
Ladder Operators for a nonlinear oscillator
I was wondering if there was a way to construct the ladder operators for a nonlinear oscillator given by the Hamiltonian $$H=x^2+p^2+\lambda x^4$$ If we were to just calculate scattering amplitudes, ...
4
votes
4answers
489 views
How to obtain large order perturbation series for cubic anharmonic oscillator?
Consider the potential
$$V(x)= \frac{x^2}{2} + gx^3.\tag{1}$$
Then the time-independent Schrödinger equation becomes
$$\left(-\frac{1}{2}\frac{d^2}{dx^2} + \frac{x^2}{2} + gx^3 \right)\psi = E(g) \...
0
votes
0answers
26 views
Why it is not possible to get exact solution for cubic potential perturbation for 1D SHO and we have to use perturbation theory? [duplicate]
Can anyone help me in providing the process of finding exact solution in case of cubic perturbation in 1D SHO, or any suitable resource?
4
votes
3answers
284 views
Why is the ground state energy of a linearly perturbed quantum oscillator always lower than its harmonic counterpart?
I am concerned with a QHO that is linearly perturbed in $x$, i.e.
$$ H = \hbar \omega \left(\hat{n} + \frac{1}{2}\right) + \lambda \underbrace{\left(\hat{b}+ \hat{b}^\dagger \right)}_{\propto \hat{x}}....
0
votes
1answer
54 views
A question about derivation of the potential energy around the stable equilibrium point
I'm learning about harmonic oscillators. In the last lecture my teacher derived the potential energy of a system that has a stable equilibrium point but not a harmonic oscillator.
At the beginning of ...
1
vote
1answer
693 views
How is a quartic oscillator solved in classical mechanics?
Quantum mechanically, a quartic anharmonic oscillator with potential $$V(x)=\frac{1}{2}m\omega^2x^2+\lambda x^4$$ is dealt with perturbation theory- the approximate energies $E_n$ and energy ...
2
votes
1answer
311 views
First-order correction to energy in perturbed harmonic oscillator [closed]
I know, from the perturbation theory, that, if I have the hamiltonian
$$ \hat H = \hat H_0 + \lambda \hat W$$
where $\hat H_0$ is the unperturbed hamiltonian of which I know its eigenvectors and ...
2
votes
1answer
81 views
Time period of an oscillatory motion [closed]
The question:
A particle of mass $m$ is executing oscillation on the $x$-axis. Its potential energy is $U(x)= K|x|^3$, where $K$ is a positive constant. If the amplitude of oscillations is $a$, ...
2
votes
1answer
250 views
Small oscillations in the given potential
The task is to find the period of small oscillations in the potential
$$U=U_0\tan^2{\Big(\frac{x^2}{a^2}\Big)}.$$
I started with finding the stable equilibrium points:
$\frac{dU}{dx}=0$
$2U_{0}\...
4
votes
3answers
346 views
Hooke's full unapproximated law
It is known that the Hooke's law relating the restoring force of a spring to the distance of retraction from the equilibrium position, is only an approximation.
That is, the equation $F=-kx$ is only ...
-1
votes
3answers
86 views
Solving ODE equation for classical field [closed]
I would like to solve the following homogeneous, ODE:
$$\left[\frac{d^2}{dt^2} + m^2\right]\phi(t) + \frac{1}{6}\lambda \phi^3(t)=0.$$
I know the solution is
$$\phi(t) = \frac{z(t)}{1-\frac{\lambda}...
0
votes
3answers
751 views
What are the possible limits for when SHM is not applicable for a vertical mass-spring system?
I am not sure if this is more of a maths problem than a physics if so could admin place in the math stack.
So my question is as follows. I have recently been looking at SHM in a spring-mass, as shown ...
-1
votes
2answers
56 views
How can a stiffness of a spring can be $k(x+x^3)$? Compute energy total of the system [closed]
Consider the motion of a particle of mass $m$ attached to a spring of stiffness $k(x+x^3)$ where $x$ is the displacement.
1) How can look such a spring? I thought that the stiffness of a spring ...
0
votes
1answer
110 views
Why should the $\phi^4$ term necessarily cause scattering while a $x^4$ term in anharmonic oscillator only causes correction of energy levels?
Consider an anharmonic oscillator in quantum mechanics, described by the Hamiltonian $$H=\frac{p^2}{2m}+\frac{1}{2}m\omega^2x^2+bx^4.$$ The $bx^4$ term doesn't cause scattering. The effect of this ...
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0answers
68 views
Asymptotic behavior of canonical perturbation theory for the classic anharmonic oscillator
What do we know about the asymptotic behavior of the perturbative expansion for the classical anharmonic oscillator?
The Hamiltonian is
$$
H = \frac{p^2}{2m}+\frac{1}{2}m\omega_0^2 q^2 +\mu q^4
$$
...
5
votes
2answers
859 views
Pendulum period [duplicate]
In plane pendulum problem, we can calculate its period using elliptic integration.
In SHO problem, we use approximation such that $\theta\ll 1$ and get the period, $2\pi\sqrt{l/g}$.
Is there another ...
0
votes
0answers
4k views
What is the difference between Non-harmonic oscillation, Anharmonic oscillation and Complex harmonic oscillation?
I am just wondering if the words Non-harmonic oscillation, Anharmonic oscillation and Complex harmonic oscillation mean the same thing. If not what exactly is the difference between them?
Since the ...
0
votes
1answer
22 views
Velocity changes due to crystal anharmonicity?
What is the effect of cubic and higher anharmonicities of a phonon hamiltonian on the velocity of phonons?
0
votes
1answer
397 views
Why is pendulum isochronic? [duplicate]
We all know that the pendulum is isochronic, i.e. that it takes the same time regardless of the amplitude is this is less than 20 degrees.
But how do we prove it mathematically?
What happens when the ...
0
votes
1answer
993 views
Why do large angular displacements affect the amplitude of a simple pendulum? [duplicate]
I was conducting an experiment involving the effect of large angular displacements (10°, 20°, ... 90°) on the amplitude of a simple pendulum. So far, I have found that the period of the pendulum ...
2
votes
1answer
1k views
Quantum pure quartic oscillator
It was recently brought to my attention, that there exist analytic solutions for the quantum pure-quartic oscillator with the hamiltonian
$$ \hat{H} = \frac{1}{2m} \hat{p}^2 + \frac{\lambda}{24} \hat{...
-1
votes
1answer
724 views
Simple pendulm motion for larger angular displacement? [duplicate]
What will be the nature of the motion of a simple pendulum for larger angular displacement? Will that be a periodic motion? If so, will the time period increase or decrease?
3
votes
1answer
694 views
A small error in Landau & Lifschitz “Mechanics” (3rd ed.)?
I think I found a small error in Landau & Lifschitz "Mechanics" (3rd ed.). In section 28 (Anharmonic oscillations), they are discussing how to solve the following anharmonic oscillator problem:
...
-1
votes
1answer
166 views
Does increasing the magnitude of the pendulum angle cause its time period to be underestimated? [duplicate]
The pendulum equation states that the time period $T=2π\sqrt{l/g}$. This is based on the small angle approximation where we approximate l
$$\frac{{\rm d}^2 θ}{{\rm d}t^2 }= -\frac{g}{l}\sin θ \...
5
votes
3answers
8k views
Does amplitude affect time period for spring mass system?
I know that with the formula $T=2\pi\sqrt{\frac{m}{k}}$ the time period is not related to the amplitude. However, would amplitude matter if i do this experiment in real life. Would a greater amplitude ...
0
votes
0answers
69 views
How to write classical Hamiltonian $H = \frac{I^{2}}{2}$ in $(p,q)$ variables?
Suppose I have a completely integrable $1$ degree of freedom Hamiltonian $H(I, \varphi) = \frac{I^{2}}{2}$ written in action-angle variables $(I, \varphi) \in \mathbb{R} \times \mathbb{S}$.
What ...
3
votes
0answers
98 views
Papers/books with theoretical data on anharmonic oscillators
I am trying to solve an-harmonic oscillator (with $x^4$ terms) and need theoretical data to compare with my numerical data. I have searched research papers on anharmonic oscillators and few ...
0
votes
2answers
400 views
Can there exist harmonic oscillator with asymmetric coupling?
In Classical Mechanics textbooks usually, for a coupled harmonic oscillator with two masses,
coupling is taken to be same in both directions (i.e coupling constant w.r.t to m1 is same as that with ...
9
votes
2answers
6k views
Nonlinear spring $F=-kx^3$
A nonlinear spring whose restoring force is given by $F=-kx^3$ where $x$ is the displacement from equilibrium , is stretched a distance $A$. Attached to its end is a mass $m$. Calculate....(I can do ...
1
vote
1answer
88 views
Why does harmonic oscillation propagate better?
I read that EM radiation can propagate forever only if it follows the harmonic pattern.
If that is true, can you explain why? Why doesn't a different oscillation propagate forever? What happens: is ...
26
votes
3answers
6k views
Why does a simple pendulum or a spring-mass system show simple harmonic motion only for small amplitudes?
I've been taught that in a simple pendulum, for small $x$, $\sin x \approx x$. We then derive the formula for the time period of the pendulum. But I still don't understand the Physics behind it. Also, ...
3
votes
1answer
565 views
QM anharmonic oscillator - Feynman diagrams, calculating free energy
I have the quantum anharmonic oscillator:
$$H = \frac{\hat{p}^2}{2m} + \frac{1}{2}m\omega^2 \hat{x}^2 + \frac{\lambda}{4!}\hat{x}^4$$
and I want to find the free energy (so essentially $\log Z(\beta)...
6
votes
1answer
246 views
How to solve the 10000th eigenvalue of the anharmonic oscillator?
Given a certain Hamiltonian, for example,
$$ H = -\frac{1}{2}\frac{\partial^2}{\partial x^2 } + x^4 . $$
, what methods can we use to approximate the $n$th eigenvalue, for very large $n$?
For ...
1
vote
1answer
638 views
Can quartic oscillator's energy eigenvalue, i.e. $(0+1)$-dim $\phi^4$ theory, be solved exactly?
For a potential of anharmonic oscillator like this:
$$V= \frac{1}{2}m \omega^2 x^2+\frac{\lambda}{4}x^4$$
Can eigenfunction and eigenvalue of Hamiltonian be solved non-perturbatively that is ...
1
vote
1answer
373 views
Using perturbation theory to solve classical anharmonic oscillations
A point mass $m$ is allowed to move in the $x-y$ plane.
Given $k$, $a$ to be the spring constant and springs' natural length respectively.
The springs are parallel to the $x$ axis.
$\hskip2in$
...
2
votes
1answer
686 views
Scaling the Time Independent Schrodinger Equation
What seems like a rather simple question is causing me a lot of difficulty as my base in mathematics is weak.
I want to know how I would scale the Schrodinger equation to find dependence on mass, $m$,...
