Modular invariant theory

In mathematics, a modular invariant of a group is an invariant of a finite group acting on a vector space of positive characteristic (usually dividing the order of the group). The study of modular invariants was originated in about 1914 by Dickson (2004).

Dickson invariant

When G is the finite general linear group GL_n(F_q) over the finite field F_q of order a prime power q acting on the ring F_q[X₁, ...,X_n] in the natural way, Dickson (1911) found a complete set of invariants as follows. Write [e₁, ...,e_n] for the determinant of the matrix whose entries are Xq^e_j
i, where e₁, ...,e_n are non-negative integers. For example, the Moore determinant [0,1,2] of order 3 is

{\begin{vmatrix}x_{1}&x_{1}^{q}&x_{1}^{q^{2}}\\x_{2}&x_{2}^{q}&x_{2}^{q^{2}}\\x_{3}&x_{3}^{q}&x_{3}^{q^{2}}\end{vmatrix}}

Then under the action of an element g of GL_n(F_q) these determinants are all multiplied by det(g), so they are all invariants of SL_n(F_q) and the ratios [e₁, ...,e_n]/[0, 1, ...,n − 1] are invariants of GL_n(F_q), called Dickson invariants. Dickson proved that the full ring of invariants F_q[X₁, ...,X_n]^GL_n(F_q) is a polynomial algebra over the n Dickson invariants [0, 1, ...,i − 1, i + 1, ..., n]/[0,1,...,n−1] for i = 0, 1, ..., n − 1. Steinberg (1987) gave a shorter proof of Dickson's theorem.

The matrices [e₁, ...,e_n] are divisible by all non-zero linear forms in the variables X_i with coefficients in the finite field F_q. In particular the Moore determinant [0, 1, ..., n − 1] is a product of such linear forms, taken over 1 + q + q² + ... + q^n – 1 representatives of (n – 1)-dimensional projective space over the field. This factorization is similar to the factorization of the Vandermonde determinant into linear factors.

References

Dickson, Leonard Eugene (1911), "A Fundamental System of Invariants of the General Modular Linear Group with a Solution of the Form Problem", Transactions of the American Mathematical Society, Providence, R.I.: American Mathematical Society, 12 (1): 75–98, doi:10.2307/1988736, ISSN 0002-9947, JSTOR 1988736
Dickson, Leonard Eugene (2004) [1914], On invariants and the theory of numbers, Dover Phoenix editions, New York: Dover Publications, ISBN 978-0-486-43828-3, MR 0201389
Rutherford, Daniel Edwin (2007) [1932], Modular invariants, Cambridge Tracts in Mathematics and Mathematical Physics, No. 27, Ramsay Press, ISBN 978-1-4067-3850-6, MR 0186665
Sanderson, Mildred (1913), "Formal Modular Invariants with Application to Binary Modular Covariants", Transactions of the American Mathematical Society, Providence, R.I.: American Mathematical Society, 14 (4): 489–500, doi:10.2307/1988702, ISSN 0002-9947, JSTOR 1988702
Steinberg, Robert (1987), "On Dickson's theorem on invariants" (PDF), Journal of the Faculty of Science. University of Tokyo. Section IA. Mathematics, 34 (3): 699–707, ISSN 0040-8980, MR 927606

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Modular invariant theory

Dickson invariant

See also

References