Algebraic K-theory of Special Groups
نویسندگان
چکیده
Following the introduction of an algebraic K-theory of special groups in [6], generalizing Milnor’s mod 2 K-theory for fields, the aim of this paper is to compute the K-theory of Boolean algebras, inductive limits, finite products, extensions, SG-sums and (finitely) filtered Boolean powers of special groups. A parallel theme is the preservation by these constructions of property [SMC], an analog for the K-theory of special groups of the property “multiplication by l(−1) is injective” in Milnor’s mod 2 K-theory (see [20]). 2000 Mathematics Subject Classification: 11E81, 11E70, 12D15, 06E99
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تاریخ انتشار 2003