Derived equivalences via Tate resolutions

Abstract

For any finite sequence of elements s1, … , sd in a commutative noetherian ring R, we show that for n 0, the natural map from the Koszul complex K(s1n, … , sdn) to the Koszul complex K(s1, … , sd) factors through the Tate resolution on s1n, … , sdn. Using this, for any resolving subcategory A of mod(R) and any ideal I such that it has a filtration \ In \ which is equivalent to the I-adic filtration and dim A(R/In) < ∞, we show a derived equivalence between the bounded derived category of finitely generated modules supported on V(I) having finite A-dimension and the bounded derived category of A with homologies supported on V(I). As a special case, when R is of prime characteristic and I is of finite projective dimension, we obtain a derived equivalence between the bounded derived category of finite projective dimension modules supported on V(I) and the bounded derived category of projective modules with homologies supported on V(I).