On a noncommutative Iwasawa main conjecture for varieties over finite fields

“…This is a crucial step in the proof of our main results. Note that determinant functors on Waldhausen categories have already been successfully applied in non-commutative Iwasawa theory [Wit08,Wit10], and in A 1 -homotopy theory [Eri09]. They have also been discussed in the University of Chicago's Geometric Langlands Seminar [Boy], see Remark 1.2.8.…”

On determinant functors and $K$-theory

“…This is a crucial step in the proof of our main results. Note that determinant functors on Waldhausen categories have already been successfully applied in non-commutative Iwasawa theory [Wit08,Wit10], and in A 1 -homotopy theory [Eri09]. They have also been discussed in the University of Chicago's Geometric Langlands Seminar [Boy], see Remark 1.2.8.…”

On determinant functors and $K$-theory

“…For example, in [22], the authors study the structure of Selmer groups using syntomic cohomology for p-adic Lie extensions of fields of characteristic p containing the unique Z p -extension of the constant field. Moreover [37] provides a comprehensive study of the whole theory (including a proof of the main conjecture) in the language of schemes, for ℓ-adic extensions of a separated scheme X of finite type over the field F p e ; his proof uses K-theory, Waldhausen categories (and higher K-groups) and other cohomological tools. Another approach to the main conjecture (for Z d ℓ -extensions) is provided in [15].…”

On Selmer groups of abelian varieties over ℓ-adic Lie extensions of global function fields