We study the interplay of the homotopy coniveau tower, the Rost–Schmid complex of a
strictly homotopy invariant sheaf, and homotopy modules. For a strictly homotopy invariant
sheaf
, smooth
–scheme
and
, we construct a new cycle
complex
and we prove
that in favorable cases,
is equivalent to the homotopy coniveau tower
. To do so
we establish moving lemmas for the Rost–Schmid complex. As an application we deduce a
cycle complex model for Milnor–Witt motivic cohomology. Furthermore we prove that if
is a strictly homotopy
invariant sheaf, then
is a homotopy module. Finally we conjecture that for
,
is a homotopy
module, explain the significance of this conjecture for studying conservativity properties of the
–stabilization
functor
,
and provide some evidence for the conjecture.
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