What is the name of this Hamiltonian?

  • Thread starter Thread starter kinichi
  • Start date Start date
  • Tags Tags
    Hamiltonian
AI Thread Summary
The discussion centers on identifying a specific Hamiltonian, expressed as H = (p² + q²)/2)². The original poster seeks its name in scientific literature, not the broader Hamiltonian theory. A connection is made to the Heisenberg group and Sub-Riemannian manifolds, suggesting a potential classification. Additionally, a comparison is drawn to the Hamiltonian of the harmonic oscillator squared, indicating subtle differences between the two. The conversation highlights the complexity of Hamiltonians in relation to chaotic and regular behaviors in dynamical systems.
kinichi
Messages
3
Reaction score
0
Hello (and sorry for this stupid question),

Could someone tell me the name of this Hamiltonian

H = \left(\dfrac{p^2+q^2}{2}\right)^2

Thanks in advance
 
Physics news on Phys.org
I'm just looking for the name that is called in the scientific literature. I am not looking for the Hamiltonian theory.
 
kinichi said:
I'm just looking for the name that is called in the scientific literature. I am not looking for the Hamiltonian theory.

In the article, it shows a specific hamiltonian similar to yours and relates it to a "Heisenberg group" under the topic Sub-Riemannian manifolds.

Its unfortunate that the URL didn't directly jump there as expected.
 
Or maybe this one:

Example 5 (Henon–Heiles problem)
The polynomial Hamiltonian in two degrees of freedom
is a Hamiltonian differential equation that can have chaotic solutions.

Figure 1 shows a regular behaviour of solutions when the value of the Hamiltonian is small,and a chaotic behaviour for large Hamiltonian.

http://www.unige.ch/~hairer/poly_geoint/week1.pdf
 
Ok, Thank you jedishrfu.

However, there are subtle differences between these two Hamiltonians. "My" can be thought of as the Hamiltonian of the harmonic oscillator squared:

H = H_{HO}^2

where

H_{HO} = \dfrac{1}{2}(p^2+q^2).
 
Last edited:

Thread 'Why can't Solar panels be hemispherical, or a curved strip type?'

comparing a flat solar panel of area 2π r² and a hemisphere of the same area, the hemispherical solar panel would only occupy the area π r² of while the flat panel would occupy an entire 2π r² of land. wouldn't the hemispherical version have the same area of panel exposed to the sun, occupy less land space and can therefore increase the number of panels one land can have fitted? this would increase the power output proportionally as well. when I searched it up I wasn't satisfied with...
View full post »

Similar threads

I The Hamiltonian and Galilean transformations
Replies
8
Views
2K
Hamiltonian: Definition, Equations & Explanation
Replies
1
Views
2K
I Continuity of Hamiltonian at separatrix in action-angle variables
Replies
1
Views
1K
Recommendation for a book on Hamiltonian Mechanics
Replies
12
Views
4K
I Hamiltonian of the bead rotating on a horizontal stick
Replies
3
Views
2K
I Effective Hamiltonian to Rotational Term Values
Replies
0
Views
3K
I How do canonical transformations relate to Hamiltonians?
Replies
4
Views
1K
A Calculating geodesic equation from Hamiltonian in presence of EM
Replies
5
Views
1K
I Energy in the Hamiltonian formalism from phase space evolution
Replies
1
Views
1K
I Hamiltonian of a particle in a magnetic field
Replies
10
Views
4K

Hot Threads

Recent Insights

Back
Top