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'''How does the Moonshine Theory relate to Monster Groups?''' <br><hr><br>
 
'''How does the Moonshine Theory relate to Monster Groups?''' <br><hr><br>
In mathematics, monstrous moonshine, or moonshine theory, is a term devised by John Conway and Simon P. Norton in<br>
+
The moonshine theory, also referred to as "monstrous moonshine", is a term coined by the brilliant mathematicians<br>
1979, used to describe the unexpected connection between the monster group M and modular functions, in particular,<br>
+
John Conway and Simon P. Norton back in 1979.  They used this to describe the unexpected connection between the<br>
the j function. It is now known that lying behind monstrous moonshine is a certain conformal field theory having<br>
+
monster group M, along with other sporadic finite groups, and the seemingly-unrelated modular functions.  While much<br>
the Monster group as symmetries.<br>
+
of their research was purely conjectural at the time, many of these conjectures have since been proven. Their research<br> formed the basis upon which the knowledge of this subject has grown, and since then all of the connections between modular<br> forms and the monster group, along with most of the other finite simple sporatic groups, have collectively become known<br>
 +
as "moonshine".<br>
  
 
'''References and Links''' <br><hr><br>
 
'''References and Links''' <br><hr><br>

Revision as of 12:39, 29 November 2013

Monster Groups and Other Sporadic Groups


Jill Horsfield (jbhorse@purdue.edu)
Colin Mills (cwmills@purdue.edu)
Andy Nelson (nelson70@purdue.edu)

What is a monster group?


-Definition: A monster group is a simple, sporadic group of finite order and contains all but 6 of the other sporadic groups
as subgroups. Its order is:

    $  \left\vert \mathrm{M} \right\vert = 2^{46} \times 3^{20} \times 5^9 \times 7^6 \times 11^2 \times 13^3 \times 17 \times 19 \times 23 \times 29 \times 31 \times 41 \times 47 \times 59 \times 71  $
$ = 808,017,424,794,512,875,886,459,904,961,710,757,005,754,368,000,000,000 $
$ \approx 8 \times 10^{53} $

-Background: How did monster groups come about? When, who, and how did they reach this discovery?
In 1973, Bernd Fischer and Robert Griess predicted that monster group was a simple group containing baby monster groups.
Robert Griess discovered the order of this monster group only a couple months after the original discovery.
-What makes monster groups sporadic groups?
Sporadic groups are the finite simple groups (26) that don't fit into infinite families.
The largest sporadic group is the monster group.

Are there subgroups?


Yes, there are subgroups. Since the monster group is a simple group, it does not have any proper non-trivial normal subgroups.
-What is the subgroup structure?
There are at least 44 conjugacy classes of maximal subgroups, as well as non-abelian simple groups of about 60 isomorphism
types are either subgroups or quotients of subgroups. The monster grip contains 20 of the 26 sporadic groups as subquotients.
The following diagram shows how they all fit together.
[1] From Symmetry and the monster by Mark Ronan.
-What are its primes and supersingular primes?
The supersingular primes are the set of prime numbers that divide the group order of the Monster group,
namely 2, 3, 5, 7, 11, 13, 17, 19, 23, 29, 31, 41, 47, 59, and 71. -What is a baby monster group?
-How does existence and uniqueness relate?

How does the Moonshine Theory relate to Monster Groups?


The moonshine theory, also referred to as "monstrous moonshine", is a term coined by the brilliant mathematicians

John Conway and Simon P. Norton back in 1979.  They used this to describe the unexpected connection between the
monster group M, along with other sporadic finite groups, and the seemingly-unrelated modular functions. While much
of their research was purely conjectural at the time, many of these conjectures have since been proven. Their research
formed the basis upon which the knowledge of this subject has grown, and since then all of the connections between modular
forms and the monster group, along with most of the other finite simple sporatic groups, have collectively become known
as "moonshine".
References and Links


[[2]] [[3]] [[4]]

Alumni Liaison

Correspondence Chess Grandmaster and Purdue Alumni

Prof. Dan Fleetwood