Examples of Hamiltonian in the following topics:
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- where $ H$ is the Hamiltonian operator.
- If the Hamiltonian is independent of time we can solve this equation by
- We can imagine the operator $H$ as a matrix that multiplies the state vector $\psi$, so this equation is an eigenvalue equation with $E$ as the eigenvalue and $\psi$ as an eigenvector (or eigenfunction) of the matrix (or operator) $H$.The Hamiltonian classically is the sum of the kinetic energy and the potential energy of the particles.
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- The Hamiltonian of an electron in a external electromagnetic field is given by
- Let's suppose that $H_0 \psi_f= E_f \psi_f$ and $H_0 \psi_i = E_i \psi_i $i.e. they are eigenstates of the unperturbed Hamiltonian) we have
- when and only when ${\bf d}$ operates on two eigenstates of the unperturbed Hamiltonian.
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- Formally, the dynamics of any quantum system are described by a quantum Hamiltonian (H) applied to the wave equation.
- There is one quantum number of the system corresponding to the energy—the eigenvalue of the Hamiltonian.
- There is also one quantum number for each operator (O) that commutes with the Hamiltonian (i.e. satisfies the relation HO = OH).
- For particles in a time-independent potential, per the Schrödinger equation, it also labels the nth eigenvalue of Hamiltonian (H) (i.e. the energy E with the contribution due to angular momentum, the term involving J2, left out).
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- This means quantum-mechanically that the Hamiltonian commutes with the angular momentum operator, and that the wavefunctions that satisfy the Hamiltonian also are eigenfunction of the angular momentum operator (${\bf L}={\bf r}\times {\bf p}$).We have
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- One can prove that the ground state eigenvalue $E$ of the Hamiltonian $H$
- We can substitute these trial wavefunctions into the Hamiltonian in the second equation in this section to find an upper limit on the value of $E_j({\bf R})$.
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- The eigenstates of the Hamiltonian (that is, the energy eigenstates) can be chosen as simultaneous eigenstates of the angular momentum operator.
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- For instance, Madison largely wrote the Constitution of 1789 and published prolifically on supporting ratification (the Federalist Papers), but began to vehemently oppose the program of the Hamiltonians and their new Federalist Party from 1789-1800.
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- With the support of Washington, the entire Hamiltonian economic program received the necessary support in Congress to be implemented.
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- The eigenstates of the Hamiltonian (that is, the energy eigenstates) can be chosen as simultaneous eigenstates of the angular momentum operator.
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- The "Hamiltonians who surround him," Democratic-Republican Vice President Thomas Jefferson soon remarked, "are only a little less hostile to him than to me."