NUCE 304: Evaluative Methods for Nuclear Non-proliferation and Security PDF

Summary

These lecture notes, titled "NUCE 304: Evaluative Methods for Nuclear Non-proliferation and Security", provide an overview of neutron interactions, scattering, absorption, and fission. The document covers various types of neutron interactions, including elastic and inelastic scattering, radiative capture, charged-particle reactions, and neutron-producing reactions. The notes also discuss macroscopic cross-sections and mean free path, which are crucial for analyzing and describing the behavior of neutrons within a reactor environment.

Full Transcript

NUCE 304: Evaluative Methods for Nuclear
Non-proliferation and Security

Neutron Interactions

Dr. Ahmed Alkaabi

1
 Learning Objectives

Nuclear and Reactor Physics

Objectives:
Be able to explain how nuclear power
produces electrical power
Be able to explain how and why nuclear power
works
Be able to explain why fission products and
radiation are major issues for nuclear power
Be able to explain the role of neutron
interactions in nuclear power

2
 Primary Learning Objective

Know the different ways neutrons interact with
matter
Understand how neutron interactions enable
nuclear reactors to function in a controllable
fashion

Take away from this lecture:

Main ways neutrons interact with matter

3
 Lecture Outline
1. Neutron Interactions
Scattering
Absorption
Fission

2. Cross Sections and
neutron interaction
rates

4
 Neutron Interactions

Neutrons have zero net electrical charge.
They pass through electron clouds and
interact with atomic nuclei.

Types of neutron interactions:
– Scattering
Elastic Scattering – the most important
process of slowing down neutrons in nuclear
reactors
Inelastic Scattering

– Absorption
Radiative Capture
Charged-Particle Reactions
Neutron-Producing Reactions
Fission

Image from US NRC (http://www.flickr.com/photos/nrcgov/)
5
 Elastic Scattering (n, n’)

A neutron strikes a nucleus;
the target nucleus is almost
BEFORE nʹ
always in its ground state. n A
Z X
A
Z X
AFTER

Some kinetic energy is transferred from the neutron to the
target nucleus.

The neutron reappears (the initial and final neutrons are not
necessarily the same). The target nucleus is left in its ground
state – there is no energy transferred into nuclear excitation.

Total kinetic energy is conserved!

6
 Inelastic Scattering (n, n’)

The target nucleus absorbs
the incident neutron: nʹ
a compound nucleus is
formed.
n A
Z X A
X
Z
The compound nucleus emits a
neutron of lower kinetic g
energy; the target nucleus is
left in an excited state. A
Z X
The target nucleus will reach its
ground state by emitting one
or more gamma rays.

Total energy is conserved (but not the kinetic energy!):
Initial kinetic energy = Kinetic energy of the emitted neutron +
of incident neutron kinetic energy of the target nucleus +
energy of all emitted gamma rays
7
 Radiative Capture (n, γ)

The target nucleus absorbs the incident
neutron
a compound nucleus is formed.

The compound nucleus immediately emits a
gamma ray.
g
n
A A1
Z X Z
X

In this case, nuclide X can be called a
“neutron poison”

8
 Charged-Particle Reactions
(n,α), (n, p), (n, d), (n, t)

The target nucleus absorbs the incident neutron
A compound nucleus is formed.

The compound nucleus possess relatively high
excitation energy: it ejects a charged particle
(e.g. proton, alpha particle, etc.)

n
A A3
Z X Y
Z 2

a
9
 Neutron-Producing Reactions
(n,2n), (n,3n), (n,xn)

These reactions occur with energetic neutrons.

The (n, 2n) reaction is important in reactors
containing heavy water or beryllium.

Be-9 undergoes an (n,2n) neutron reaction to
become Be-8.
nʹ
n
A A1
Z X Z
X
nʺ

10
 Nuclear Fission

Nuclear Fission is a process in which an atomic nucleus
splits and a large amount of energy is released in the
form of radiation and energetic fission products.

A1 n
n A A1 * W
Z1 n
Z X Z
X A2
Z2
Y n

Typical nuclear fission reaction:

1
0
n 
235
92
U  236
92

*
U Cs 
140
55
Rb  3 n
93
37
  1
0

11
 Nomenclature

Spontaneous Fission:
– when a nucleus spontaneously decays by fission.

Neutron-Induced Fission:
– when a fission reaction is induced by the absorption
of a neutron into a nucleus.

Thermal Fission:
– when a fission reaction is induced by the absorption
of a room-temperature thermal neutron into a
nucleus.

Fast Fission:
– when a fission reaction is induced by the absorption
of a fast (around 1-MeV) neutron into a nucleus.

12
 Neutron Interactions

To safely and efficiently operate a nuclear
reactor we need to be able to predict and
control the neutron population over time and
space

Neutron populations can change for lots of
reasons… (scattering, absorption, fission,
capture, other.).

Our ability to calculate (predict) and control
the reactor’s neutron population depends on
our ability to calculate what fraction of all the
neutron interactions are of which type.

We also need to know the rate at which each
type of neutron interaction occurs.

13
 Types of Neutron Interactions

Scattering: neutron collides with an atomic nucleus
– Elastic Scattering (n, n)
– Inelastic Scattering (n, n’)

Absorption

– Radiative Capture (n, γ)

– Charged-Particle Reactions (n,α), (n, p), (n, d), (n, t)
– Neutron-Producing Reactions (n,2n), (n,3n), (n,xn)
– Fission

How can we compute the rate at which
each of these interactions occur?

14
 Number of Interactions per unit time

In entire target,
N [atoms/cm3]
Number
A [cm2]
of interactions =  N A dx I
per second
dx [cm]

 is called the
microscopic cross-section
n [neutrons/cm3] v [cm/s]

I = n ∙ v [neuts/cm2-sec]
 is the proportionality constant that
depends on (1) the speed (energy) of
the incident particles and on (2)
characteristics of the target nuclei.
Author: Dr. Charlton, NUEN, TAMU

15
 Microscopic Cross Section Symbols

Microscopic cross section () is the probability of a
particular interaction occurring between a neutron
and a target nucleus.

Microscopic cross sections are expressed in units of
barns, where 1 barn = 10-24 cm2.

Each of the types of interactions discussed previously
has a characteristic microscopic cross section
– e : Elastic scattering cross section
– I : Inelastic scattering cross section
– γ : Radiative capture cross section
– f : Fission cross section
– α : (n, α) cross section
– 2n : (n,2n) cross section
16
 Microscopic Cross Section Symbols
(continued)

The sum of all cross sections is known as the total cross
section (σt)
 t   e  i  g  f  a 

The sum of all absorption reaction cross sections is
known as the absorption cross section (σa)
 a   g   f   p   d  a  

The sum of all scattering reaction cross sections is
known as the total scattering cross section (σs)
 s   e  i

17
 Microscopic Cross Sections Dependencies

The microscopic cross section is a function of
– The target nuclide
– The incident particle
– The relative speed between the incident particle and the
target nuclide

We will often assume the target nuclide is at rest

Then the microscopic cross section is a function of
– The target nuclide
– The incident particle
– The energy of incident particle.

18
 Where to get cross section data?

The cross sections for most isotopes have already been
measured/calculated:
– Chart of the Nuclides
– Online: ∙ http://www.nndc.bnl.gov/nudat2/index.jsp
http://sutekh.nd.rl.ac.uk/CoN/
http://wwwndc.tokai.jaeri.go.jp/CN03/index.html
http://atom.kaeri.re.kr/ton/

The microscopic cross sections provided on most charts
and tables are measured for a standard neutron velocity
of 2200 meters/second (ambient temperature of 68F).

Cross sections must be corrected for the temperature of
the target material.

19
 Elastic Scattering Cross Section
Versus Energy of Incident Neutron

12
C Elastic Scattering Cross Section Versus
Energy
Cross Section (b)

10

1

Resonance
Potential scattering region
region
0.1
1.E-05 1.E-02 1.E+01 1.E+04 1.E+07

Energy (eV)
Author: Dr. Charlton, NUEN, TAMU
20
 235U
Fission and Radiative
Capture Cross Sections

f : U-235
585
barns

fission

radiative
capture
0.025eV 1 MeV

From NUEN-611 lecture notes. 10 MeV

21
 238U
Fission and Radiative
Capture Cross Sections

U-238

fission
c :
2.66
barns

radiative
0.025eV capture

From NUEN-611 lecture notes. 10 MeV

22
 Cross Sections Versus Temperature

Cross sections can vary with
material temperature

Temperature is related to the
relative motion of the nuclei
within a material

These temperature changes
mainly affect the resonances
– Resonances broaden at
higher temperatures

The temperature effect on
resonances is called Doppler Author: Dr. Charlton, NUEN, TAMU
broadening

23
 Collision Density

Recall: the number of interactions N [atoms/cm3]
per unit time (in the target):
A [cm2]
interactio ns
  t N A dx I
second dx [cm]

n [neutrons/cm3]
Collision density (F ) is the number of v [cm/s]
interactions per unit volume per unit time:
N [atoms/cm3]
interactio ns
F  t N I
s  cm 3
A [1 cm2]

The product of the atom density N and X [1 cm]
a microscopic cross-section is called
the macroscopic cross-section, Sigma.

Σ = N
24
 Macroscopic Cross-section

Macroscopic cross-section (Σ) is the probability of
an interaction per unit length of travel of an incident
particle.
Macroscopic cross-section Σ has units of cm-1.
The macroscopic cross-section depends on
– The target atom density N (a macroscopic quantity)
– Interaction type (i.e., the microscopic cross-section)
– Projectile energy

Macroscopic total cross section Σt = N t

Macroscopic scattering cross section Σs = N s
Macroscopic absorption cross section Σa = N a , etc.

25
 Example Solution

The fractional abundance of 235U is 0.0072. f(235U)
Atomic weight of U is 238.0289; density of U is 19.1 g/cm3.

The microscopic absorption cross-section for 235U is 680.8 b.

Avogadro number NA = 0.6022 × 1024 mol-1

Recall: number of atoms per unit volume, N = ρNA/M

Then the macroscopic absorption cross-section for 235U is

a  
U  N f
235
 
U  a
235
 235
U 
3
19.1 gm/cm * (0.6022  10 atoms/gm-mole)
24

 (0.0072) * 680.8  10
24 2
cm /atom
238.0289 gms/gm-mole
1
 0.237 cm

26
 Mean Free Path

The average distance a neutron travels without an
interaction is called a mean free path (λ)

1

t

Example 1. Suppose Σt for Example 2. Suppose Σ a for
thermal neutrons in a research thermal neutrons in a research
reactor is 10 cm-1. On average, reactor is 4 cm-1. On average,
how far do thermal neutrons how far do thermal neutrons
travel between collisions? travel before they are absorbed?

1 1
   0.1  cm   0.25  cm
t a

27
 Several Neutron Beams Bombard a Small Target

I2
Consider an experiment in which several n2, v
neutron beams bombard a small target
– The intensities of the beams are different
– The neutrons in all the beams have the same I3
speed (same energy) n 3, v

Then the total collision density is given by I1
n1, v

Ftotal  t I1  I 2  I 3    t n1v  n2v  n3v  
 t n1  n2  n3  v  t nv
where n is the total density of neutrons striking
the target, n = n1 + n2 + n3 + …

28
 Neutron Flux

The situation at any point in a reactor is a generalization
of this experiment with a very small sample and beams
from all directions; thus, our equation F = Σt nv is valid
for any point in a reactor.

The quantity nv is called the neutron flux and denoted
by the symbol f
f  nv
The units of neutron flux are the same as the units of
beam intensity: neutrons/cm2-s

Then the collision density is

F   t n v   tf

29
 Neutron Flux (continued)

Neutron fluxes can be
conceptually viewed as
– Related to the overall population of
neutrons in a volume
– The number of neutron track lengths per
unit volume per unit time
– The number of neutrons passing through a
unit area per unit time

30