Dade isometry

In mathematical finite group theory, the Dade isometry is an isometry from class function on a subgroup H with support on a subset K of H to class functions on a group G (Collins 1990, 6.1). It was introduced by Dade (1964) as a generalization and simplification of an isometry used by Feit & Thompson (1963) in their proof of the odd order theorem, and was used by Peterfalvi (2000) in his revision of the character theory of the odd order theorem.

Definitions[edit]

Suppose that H is a subgroup of a finite group G, K is an invariant subset of H such that if two elements in K are conjugate in G, then they are conjugate in H, and π a set of primes containing all prime divisors of the orders of elements of K. The Dade lifting is a linear map f → f^σ from class functions f of H with support on K to class functions f^σ of G, which is defined as follows: f^σ(x) is f(k) if there is an element k ∈ K conjugate to the π-part of x, and 0 otherwise. The Dade lifting is an isometry if for each k ∈ K, the centralizer C_G(k) is the semidirect product of a normal Hall π' subgroup I(K) with C_H(k).

Tamely embedded subsets in the Feit–Thompson proof[edit]

The Feit–Thompson proof of the odd-order theorem uses "tamely embedded subsets" and an isometry from class functions with support on a tamely embedded subset. If K₁ is a tamely embedded subset, then the subset K consisting of K₁ without the identity element 1 satisfies the conditions above, and in this case the isometry used by Feit and Thompson is the Dade isometry.

References[edit]

• Collins, Michael J. (1990), Representations and characters of finite groups, Cambridge Studies in Advanced Mathematics, vol. 22, Cambridge University Press, ISBN 978-0-521-23440-5, MR 1050762
• Dade, Everett C. (1964), "Lifting group characters", Annals of Mathematics, Second Series, 79 (3): 590–596, doi:10.2307/1970409, ISSN 0003-486X, JSTOR 1970409, MR 0160813
• Feit, Walter (1967), Characters of finite groups, W. A. Benjamin, Inc., New York-Amsterdam, ISBN 9780805324341, MR 0219636
• Feit, Walter; Thompson, John G. (1963), "Solvability of groups of odd order", Pacific Journal of Mathematics, 13: 775–1029, doi:10.2140/pjm.1963.13.775, ISSN 0030-8730, MR 0166261
• Peterfalvi, Thomas (2000), Character theory for the odd order theorem, London Mathematical Society Lecture Note Series, vol. 272, Cambridge University Press, doi:10.1017/CBO9780511565861, ISBN 978-0-521-64660-4, MR 1747393