Physics
752 (Prof. Agashe) – Spring 2014
Topics
(and reading material) for term paper
You are to write (and present) sometime during finals week a term
paper (at least 10 pages
long). The basic idea of this term
paper is that you should explore some topic beyond what is
done in lecture, either an extension
of the standard model (SM) itself (e.g., topics 1-4 listed
below) or some detail of SM that we
didn't have time to cover (e.g, topic 6). And,
you
should try to focus more on theory aspect
of that topic than on the relevant
experimental issues, since that's the
feature of
this course.
I have listed some possible topics below, including suggestions for
background reading material (which can,
at the least, serve as starting point for writing the paper - of course you
should, if possible, explore further).
(You should also feel free to suggest topics - I can discuss them with you
before I
approve of them for the term paper.)
(1) Theory of
neutrino masses [including Dirac mass just like for charged fermions;
Majorana mass from
SU(2)_L triplet VEV or see-saw mechanism]: see section 13.2 of Cheng
and Li or a review here.
(2) Supersymmetry (SUSY): see here
In particular, this can be sub-divided into
(a) more formal/abstract topic
of how to build a supersymmetric model/break SUSY as
in
sections 3, 4 and 6 of above review and
(b) applying these general principles to build the minimal supersymmetric
SM (MSSM) as in
section 5 , 7 (and possibly 8).
If you wish, some of you can form a "team" to cover this topic.
(3) Extra
dimensions: see lecture notes here
In particular, the eventual goal of term paper (again, if you wish, two
of you can work together
on this topic) could be to solve
one (or more) of exercises in appendices of above lectures.
(More lecture notes on this topic are in references of above.)
(4) Grand
Unified Theories: for general reviews, see here;
"Grand Unified Theories and
Proton Decay" by P. Langacker, Phys.
Rept. 72, 185 (1981), QC1.P6563 and "Grand Unified
Theories" by G. G. Ross, QC794.6.G7 R67 1985.
This can be sub-divided into
(a) based on SU(5) group: see chapter 14 of Cheng and Li.
(b) based on SO(10) group
(5) Direct
detection of Dark Matter: for general reviews of (particle physics candidates
for)
dark matter, see here and here.
For the term paper, I suggest understanding/re-doing part of the analysis of
direct detection of
dark matter done here. For
example, why a Majorana fermion gives spin-dependent
cross-
section for scattering off of nuclei by
exchanging a Z boson in t-channel: see analysis of
diagram 3a starting on page 13 vs.
Dirac fermion which also gives spin-INdependent
effect:
see analysis of diagram 2a on page
9 onwards.
(6) Phenomenology
of CP violation [including connecting the theory calculation of 4-quark
flavor-violating operators to hadronic data]: see section XIV-3 to XIV-6 of Donoghue,
Golowich and
and Li, mainly for Kaons.
(We will do some analysis of Fig. 12.5 in Cheng and Li - at quark level - in
lecture.)
Also, see the reviews here and here.