In algebraic number theory, a reflection theorem or Spiegelungssatz (German for reflection theorem â see Spiegel and Satz) is one of a collection of theorems linking the sizes of different ideal class groups (or ray class groups), or the sizes of different isotypic components of a class group. The original example is due to Ernst Eduard Kummer, who showed that the class number of the cyclotomic field , with p a prime number, will be divisible by p if the class number of the maximal real subfield is. Another example is due to Scholz. A simplified version of his theorem states that if 3 divides the class number of a real quadratic field , then 3 also divides the class number of the imaginary quadratic field .
Both of the above results are generalized by Leopoldt's "Spiegelungssatz", which relates the p-ranks of different isotypic components of the class group of a number field considered as a module over the Galois group of a Galois extension.
Let L/K be a finite Galois extension of number fields, with group G, degree prime to p and L containing the p-th roots of unity. Let A be the p-Sylow subgroup of the class group of L. Let ÃÂ run over the irreducible characters of the group ring Q<sub>p</sub>[G] and let A<sub>ÃÂ</sub> denote the corresponding direct summands of A. For any ÃÂ let q = p<sup>ÃÂ(1)</sup> and let the G-rank e<sub>ÃÂ</sub> be the exponent in the index
Let ÃÂ be the character of G
The reflection (Spiegelung) ÃÂ<sup>*</sup> is defined by
Let E be the unit group of K. We say that õ is "primary" if is unramified, and let E<sub>0</sub> denote the group of primary units modulo E<sup>p</sup>. Let ô<sub>ÃÂ</sub> denote the G-rank of the àcomponent of E<sub>0</sub>.
The Spiegelungssatz states that
Extensions of this Spiegelungssatz were given by Oriat and Oriat-Satge, where class groups were no longer associated with characters of the Galois group of K/k, but rather by ideals in a group ring over the Galois group of K/k. Leopoldt's Spiegelungssatz was generalized in a different direction by Kuroda, who extended it to a statement about ray class groups. This was further developed into the very general "T-S reflection theorem" of Georges Gras. Kenkichi Iwasawa also provided an Iwasawa-theoretic reflection theorem.