PHY 981 Nuclear Structure: Single-particle properties and nuclear data
Contents
Stability of matter
Drip lines
More on "Neutron-rich nuclei":"http://iopscience.iop.org/1402-4896/2013/T152"
Motivation
FRIB limits
Motivation and aims
Mean-field picture
Mean-field picture, which potential do we opt for?
Too simple?
Motivation, better mean-fields
Aims here
Aims of this course
Back to the stability of matter questions
Back to the stability of matter questions
Recent articles on Oxygen isotopes
Do we understand the physics of dripline systems?
Masses and Binding energies
Masses and Binding energies
Masses and Binding energies
Masses and Binding energies
Liquid drop model as a simple parametrization of binding energies
Liquid drop model as a simple parametrization of binding energies
Liquid drop model as a simple parametrization of binding energies, continues
Masses and Binding energies
Masses and Binding energies
Masses and Binding energies, the code
\( Q \)-values and separation energies
\( Q \)-values and separation energies
Motivation
\( Q \)-values and separation energies
\( Q \)-values and separation energies
Separation energies and energy gaps
Separation energies for oxygen isotopes
Energy gaps for oxygen isotopes
Features to be noted
Features to be noted, continues
Radii
Radii
Definitions
Definitions
Definitions
Definitions
Definitions
Definitions
Definitions
Definitions and notations
Definitions and notations
Definitions and notations
Definitions and notations, more complicated forces
A modified Hamiltonian
A modified Hamiltonian
A modified Hamiltonian
A modified Hamiltonian
A modified Hamiltonian, harmonic oscillator spectrum
The harmonic oscillator Hamiltonian
Translationally Invariant Hamiltonian
The harmonic oscillator Hamiltonian
The harmonic oscillator Hamiltonian
The harmonic oscillator Hamiltonian
Translationally Invariant Hamiltonian
The Woods-Saxon potential
The Woods-Saxon potential
Single-particle Hamiltonians and spin-orbit force
Single-particle Hamiltonians and spin-orbit force
Single-particle Hamiltonians and spin-orbit force
Single-particle Hamiltonians and spin-orbit force
Single-particle Hamiltonians and spin-orbit force
Numerical solution of the single-particle Schroedinger equation
Numerical solution of the single-particle Schroedinger equation
Numerical solution of the single-particle Schroedinger equation
Numerical solution of the single-particle Schroedinger equation
Numerical solution of the single-particle Schroedinger equation
Numerical solution of the single-particle Schroedinger equation
Numerical solution of the single-particle Schroedinger equation
Numerical solution of the single-particle Schroedinger equation
Numerical solution of the single-particle Schroedinger equation
Numerical solution of the single-particle Schroedinger equation
Numerical solution of the single-particle Schroedinger equation
Program to solve Schroedinger's equation
Program to solve Schroedinger's equation
Exercise 1: Masses and binding energies
Exercise 2: Eigenstates and eigenvalues of single-particle problems
Exercise 3: Operators and Slater determinants
Exercise 4: First simple shell-model calculation
Program to solve Schroedinger's equation
The code sets up the Hamiltonian matrix by defining the the minimun and maximum values of \( r \) with a maximum value of integration points. These are set in the initialization function. It plots the eigenfunctions of the three lowest eigenstates.
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