Torsion-free simple linear group

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SUMMARY

The discussion centers on the feasibility of selecting the topic of torsion-free simple linear groups for an undergraduate math thesis. Participants express concerns about the complexity of the topic, with one user noting that it may be overly challenging for a graduating student. Key references mentioned include works by Wehrfritz, Humphreys, and Shafarevich-Kostrikin, which are essential for understanding the subject. The conversation highlights the importance of considering both algebraic and topological aspects of groups in this context.

PREREQUISITES
  • Understanding of group theory and its fundamental concepts
  • Familiarity with algebraic groups and their properties
  • Knowledge of topological groups and their significance
  • Ability to analyze mathematical literature, particularly advanced texts
NEXT STEPS
  • Study Wehrfritz's work on algebraic groups for foundational knowledge
  • Explore Humphreys' insights on almost simple algebraic groups
  • Investigate Shafarevich-Kostrikin's contributions to group theory
  • Research the implications of torsion-free conditions in group structures
USEFUL FOR

This discussion is beneficial for undergraduate mathematics students, particularly those interested in advanced group theory, as well as educators guiding students in thesis topics related to algebraic and topological groups.

kimkibun
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im having my undergrad math thesis right now, and the topic that i want to choose is the existence of torsion-free simple linear groups. (which i found here: http:///www.sci.ccny.cuny.edu/~shpil/gworld/problems/probmat.html)

i just want to know if this topic is recommended for undergrad?
 
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kimkibun said:
im having my undergrad math thesis right now, and the topic that i want to choose is the existence of torsion-free simple linear groups. (which i found here: http:///www.sci.ccny.cuny.edu/~shpil/gworld/problems/probmat.html)

i just want to know if this topic is recommended for undergrad?



The link is broken\doesn't exist. Check it, please

About the subject: it sounds interesting but difficult. Right now I can't think of one single example that fulfills all the conditions, so I guess any such must be a rather vicious one.

Anyway, the books by Wehrfritz, Humphreys, Shafarevich-Kostrikin or Springer are important to check. In particular, and since you may also want to consider topological groups and not merely abstract, discrete ones, Humphreys makes a nice observation: an almost simple algebraic group G (i.e., without closed connected normal subgroups except the trivial ones) is such that G/Z(G) is ALWAYS simple in the usual, abstract sense.

DonAntonio
 
DonAntonio said:
The link is broken\doesn't exist. Check it, please

here's the link sir

http://www.sci.ccny.cuny.edu/~shpil/gworld/problems/probmat.html

i agree with you sir when it comes to difficulty. my professor said that its a suicide for a graduating student to choose such topic. well anyway, thank you sir for your reply. btw, i enjoy reading the book of Shafarevich-Kostrikin.
 

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