A note on exponents of \(K\)-groups of rings of algebraic integers (Q1185145)

Let \(\ell\) be an odd prime number and \(m\) a positive integer. Using Iwasawa theory, the author constructs rings of algebraic integers \({\mathcal O}\) such that the (finite abelian) Quillen \(K\)-groups \(K_{2\nu}({\mathcal O})\), \(\nu\) odd, all have \(\ell\)-exponent at least \(\ell^ m\).