Cancellation theorem for framed motives of algebraic varieties

Abstract

The machinery of framed (pre)sheaves was developed by Voevodsky [V1]. Based on the theory, framed motives of algebraic varieties are introduced and studied in [GP1]. An analog of Voevodsky's Cancellation Theorem [V1] is proved in this paper for framed motives stating that a natural map of framed S1-spectra Mfr(X)(n)Hom( G,Mfr(X)(n+1)), n≥ 0, is a schemewise stable equivalence, where Mfr(X)(n) is the nth twisted framed motive of X. This result is also necessary for the proof of the main theorem of [GP1] computing fibrant resolutions of suspension P1-spectra ∞ P1X+ with X a smooth algebraic variety. The Cancellation Theorem for framed motives is reduced to the Cancellation Theorem for linear framed motives stating that the natural map of complexes of abelian groups \[ ZF( × X,Y) ZF(( × X) ( Gm,1),Y ( Gm,1)), X,Y∈ Sm/k, \] is a quasi-isomorphism, where ZF(X,Y) is the group of stable linear framed correspondences in the sense of [GP1].