Frobenius determinant theorem

In mathematics, the Frobenius determinant theorem was a conjecture made in 1896 by the mathematician Richard Dedekind, who wrote a letter to F. G. Frobenius about it (reproduced in (Dedekind 1968), with an English translation in (Curtis 2003, p. 51)).

If one takes the multiplication table of a finite group G and replaces each entry g with the variable x_g, and subsequently takes the determinant, then the determinant factors as a product of n irreducible polynomials, where n is the number of conjugacy classes. Moreover, each polynomial is raised to a power equal to its degree. Frobenius proved this surprising conjecture, and it became known as the Frobenius determinant theorem.

Formal statement

Let a finite group ${\displaystyle G}$  have elements ${\displaystyle g_{1},g_{2},\dots ,g_{n}}$ , and let ${\displaystyle x_{g_{i}}}$  be associated with each element of ${\displaystyle G}$ . Define the matrix ${\displaystyle X_{G}}$  with entries ${\displaystyle a_{ij}=x_{g_{i}g_{j}}}$ . Then

${\displaystyle \det X_{G}=\prod _{j=1}^{r}P_{j}(x_{g_{1}},x_{g_{2}},\dots ,x_{g_{n}})^{\deg P_{j}}}$ 

where the ${\displaystyle P_{j}}$ 's are pairwise non-proportional irreducible polynomials and ${\displaystyle r}$  is the number of conjugacy classes of G.^[1]

References

1. Etingof 2005, Theorem 5.4.

• Curtis, Charles W. (2003), Pioneers of Representation Theory: Frobenius, Burnside, Schur, and Brauer, History of Mathematics, Providence, R.I.: American Mathematical Society, doi:10.1090/S0273-0979-00-00867-3, ISBN 978-0-8218-2677-5, MR 1715145 Review
• Dedekind, Richard (1968) [1931], Fricke, Robert; Noether, Emmy; Ore, öystein (eds.), Gesammelte mathematische Werke. Bände I–III, New York: Chelsea Publishing Co., JFM 56.0024.05, MR 0237282
• Etingof, Pavel (2005). "Lectures on Representation Theory" (PDF).
• Frobenius, Ferdinand Georg (1968), Serre, J.-P. (ed.), Gesammelte Abhandlungen. Bände I, II, III, Berlin, New York: Springer-Verlag, ISBN 978-3-540-04120-7, MR 0235974