The connecting homomorphism for K-theory of generalized free products

Abstract: We interpret the connecting homomorphism of the long exact sequence of algebraic K -groups associated to a category with cofibrations and two notions of weak equivalence. One notion of weak equivalence is finer than the other and certain technical conditions involving mapping cylinders must also be satisfied. Such situations arise when one considers certain free product diagrams in the category of rings, such as those that arise in applications of the Seifert-van Kampen theorem where all fundamental group homo… Show more

“…In this appendix, we will give an explicit description of the connecting homomorphism d : K 1 (wW) → K 0 (vW w ) in terms of the 1-types of the Waldhausen categories, as defined in [MT07]. A similar description has also been derived in [Sta10,Theorem 4.1] (up to some obvious sign errors) using more sophisticated arguments.…”

On a noncommutative Iwasawa main conjecture for varieties over finite fields

“…In this appendix, we will give an explicit description of the connecting homomorphism d : K 1 (wW) → K 0 (vW w ) in terms of the 1-types of the Waldhausen categories, as defined in [MT07]. A similar description has also been derived in [Sta10,Theorem 4.1] (up to some obvious sign errors) using more sophisticated arguments.…”

On a noncommutative Iwasawa main conjecture for varieties over finite fields