Non-stable $K$-theory for $QB$-rings

Pere Ara; Francesc Perera

doi:10.7146/math.scand.a-15024

Authors

Pere Ara
Francesc Perera

DOI:

https://doi.org/10.7146/math.scand.a-15024

Abstract

We study the class of

$QB$ -rings that satisfy the weak cancellation condition of separativity for finitely generated projective modules. This property turns out to be crucial for proving that all (quasi-)invertible matrices over a

$QB$ -ring can be diagonalised using row and column operations. The main two consequences of this fact are: (i) The natural map

$(\mathrm{GL}_1(R)\to K_1(R)$ is surjective, and (ii) the only obstruction to lift invertible elements from a quotient is of

$K$ -theoretical nature. We also show that for a reasonably large class of

$QB$ -rings that includes the prime ones, separativity always holds.

Non-stable $K$ -theory for $QB$ -rings

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Non-stable KK-theory for QBQB-rings

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Non-stable $K$ -theory for $QB$ -rings