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S BLOCH An Example in the Theory of Algebraic Cycles
B DAYTON SK of Conrnutative Normed Algebras
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A-module abelian group acts trivially algebraic K-theory An(X arrow assume automorphisms characteristic classes cobordism coefficients cohomology coker column complex construction Corollary corresponding cycles defined definition denote Department of Mathematics dimension direct sum elements exact sequence exponential characteristic class fibration finite field finite groups finitely presented functor given Grothendieck hence hermitian higher Witt homology spheres homomorphism homotopy equivalence hyperbolic induces isomorphisms injective integers intermediate jacobian invertible involution isomorphism Karoubi kernel lattice Lecture Notes linear group matrix Mayer-Vietoris sequence module monoid morphism multiplication natural map noetherian nonsingular normed algebra notation obtained orthogonal p-adic prime projective projective modules proof Proposition prove quadratic Quillen representations resp satisfies semi-local rings space spectral sequence split Springer St(I St(n stability subalgebra subgroup Suppose surgery surjective theorem theory Topology torsion unimodular unitary University Witt groups X-form zero