Golod–Shafarevich theorem mathematics , the Golod–Shafarevich theorem was proved in 1964 by Evgeny Golod and Igor Shafarevich . It is a result in non-commutative homological algebra which solves the class field tower problem field towers can be infinite .Let A = K ⟨x 1 ,..., x n free algebra over a field K in n = d + 1 non-commuting variables x i J be the 2-sided ideal of A generated by homogeneous elements f j A of degree d j d j r i d j i .B =A /J , a graded algebra . Let b j B j fundamental inequalityShafarevich states that B is infinite-dimensional if r i d 2 /4 for all i Applications If G is a nontrivial finite p-group , then r > d 2 /4 where d = dim H 1 and r = dim H 2 . In particular if G is a finite p-group with minimal number of generators d and has r relators in a given presentation, then r > d 2 /4. For each prime p , there is an infinite group G generated by three elements in which each element has order a power of p . The group G provides a counterexample to the generalised Burnside conjecture: it is a finitely generated infinite torsion group , although there is no uniform bound on the order of its elements. class field theory , the class field tower of a number field K is created by iterating the Hilbert class field construction . The class field tower problem asks whether this tower is always finite; attributed this question to Furtwangler, though Furtwangler said he had heard it from Schreier . Another consequence of the Golod–Shafarevich theorem is that such towers may be infinite. Specifically,
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