Feit-Thompson conjecture

Statement

The conjecture states that if ${\displaystyle p,q}$ are distinct primes, then ${\displaystyle \Phi _{p}(q)=(q^{p}-1)/(q-1)}$ does not divide ${\displaystyle \Phi _{q}(p)=(p^{q}-1)/(p-1)}$.

The stronger conjecture that ${\displaystyle \Phi _{p}(q)}$ and ${\displaystyle \Phi _{q}(p)}$ are relatively prime is false. The smallest counterexample is ${\displaystyle p=17,q=3313}$.

Related facts

• Feit-Thompson theorem: The proof of the theorem by Feit and Thompson that every group of odd order is solvable can be simplified considerably if the Feit-Thompson conjecture is true.

References

Journal references

• A solvability criterion for finite groups and some consequences by Walter Feit and John Griggs Thompson, Proceedings of the National Academy of Sciences, Volume 48, Page 968 - 970(Year 1962): ^{More info}
• Solvability of groups of odd order by Walter Feit and John Griggs Thompson, Pacific Journal of Mathematics, Volume 13, Page 775 - 1029(Year 1963): This 255-page long paper gives a proof that odd-order implies solvable: any odd-order group (i.e., any finite group whose order is odd) is a solvable group.^{Project Euclid pageMore info}
• On the Feit-Thompson conjecture by N. M. Stephens, Mathematics of Computation, Volume 25,Number 115, Page 625 - 625(July 1971): ^{JSTOR linkWeblinkMore info}

External links

Subject wiki links

• Number:Feit-Thompson conjecture