1.15.2 Shell Structure Nuclear Mode

1.15.2 Shell Structure Nuclear Model
Experiments have shown that the number of nucleons the nucleus contains
affects the stability of nuclei. The general trend in binding energy per nucleon
EB/A, as shown in Fig. 1.3, provides the EB/A maximum at around A = 60
and then drops for smaller and larger A. However, there are also considerable
variations in stability of nuclei depending on the parity in the number of
protons and neutrons forming a nucleus.
In nature there are approximately 275 nuclides that are considered stable
with respect to radioactive decay. Some 60% of these stable nuclei have an
even number of protons and an even number of neutrons (even-even nuclei);
some 20% have an even-odd configuration and a further 20% have and odd
even configuration. Only 5 stable nuclei are known to have an odd-odd con-
figuration. A conclusion may thus be made that an even number of protons
or even number of neutrons promotes stability of nuclear configurations.
When the number of protons is: 2, 8, 20, 28, 50, 82 or the number of
neutrons is: 2, 8, 20, 28, 50, 82, 126, the nucleus is observed particularly
stable and these numbers are referred to as magic numbers. Nuclei in which
the number of protons as well as the number of neutrons is equal to a magic
number belong to the most stable group of nuclei.
The existence of magic numbers stimulated a nuclear model containing a
nuclear shell structure in analogy with the atomic shell structure configuration
of electrons. In the nuclear shell model, often also called the independent
particle model, the nucleons are assumed to move in well-defined orbits within
the nucleus in a field produced by all other nucleons. The nucleons exist in
quantized energy states of discrete energy that can be described by a set of
quantum numbers, similarly to the situation with electronic states in atoms.
The ground state of a nucleus constitutes the lowest of the entire set of
energy levels and, in contrast to atomic physics where electronic energy levels
are negative, in nuclear physics the nuclear ground state is set at zero and the
excitation energies of the respective higher bound states are shown positive
with respect to the ground state.
To raise the nucleus to an excited state an appropriate amount of energy
must be supplied. On de-excitation of a nucleus from an excited state back
to the ground state a discrete amount of energy will be emitted.
1.16 Physics of Small Dimensions and Large Velocities
At the end of the 19-th century physics was considered a completed discipline
within which most of the natural physical phenomena were satisfactorily explained.
However, as physicists broadened their interests and refined their
experimental techniques, it became apparent that classical physics suffers
severe limitations in two areas:
1.17 Planck’s Energy Quantization 21
1. Dealing with dimensions comparable to small atomic dimensions.
2. Dealing with velocities comparable to the speed of light in vacuum.
Modern physics handles these limitations in two distinct, yet related, subspecialties:
quantum physics and relativistic physics.
1. Quantum physics extends the range of application of physical laws to
small atomic dimensions of the order of 10−10 m (radius of atom a),
includes classical laws as special cases when dimension  a, and introduces
the Planck’s constant h as a universal constant of fundamental
significance. Erwin Schr¨odinger, Werner Heisenberg and Max Born are
credited with developing quantum physics in the mid 1920s.
2. Relativistic physics extends the range of application of physical laws to
large velocities υ of the order of the speed of light c (3 × 108 m/s),
includes classical laws as special cases when υ  c, and introduces c as a
universal physical constant of fundamental significance. The protagonist
of relativistic physics was Albert Einstein who formulated the special
theory of relativity in 1905.
1.17 Planck’s Energy Quantization
Modern physics was born in 1900 when Max Planck presented his revolutionary
idea of energy quantization of physical systems that undergo simple
harmonic oscillations. Planck’s energy ε quantization is expressed as
ε = nhν , (1.17)
where
n is the quantum number (n = 0,1,2,3. . . ),
h is a universal constant referred to as the Planck’s constant,
ν is the frequency of oscillation.
The allowed energy states in a system oscillating harmonically are continuous
in classical models, while in the Planck’s model they consist of discrete
allowed quantum states with values nhν, where n is a non-negative integer
quantum number. Planck used his model to explain the spectral distribution
of thermal radiation emitted by a blackbody (an entity that absorbs all radiant
energy incident upon it). All bodies emit thermal radiation to their
surroundings and absorb thermal radiation from their surroundings; in thermal
equilibrium the rates of thermal emission and thermal absorption are
equal.
• Planck assumed that sources of thermal radiation are harmonically oscillating
atoms possessing discrete vibrational energy states. When an
oscillator jumps from one discrete quantum energy state E1 to another
energy state E2 where E1 > E2, the energy difference ∆E = E1 − E2 is