Intersection K-theory

Abstract

For a proper map f:X S between varieties over C with X smooth, we introduce increasing filtrations P≤ ·f⊂ P≤ ·f on gr· K·(X), the associated graded on K-theory with respect to the codimension filtration, both sent by the cycle map to the perverse filtration on cohomology pH≤ ·f(X). The filtrations P≤ ·f and P≤ ·f are functorial with respect to proper pushforward; P≤ ·f is functorial with respect to pullback. We use the above filtrations to propose two definitions of (graded) intersection K-theory gr· IK·(S) and gr· IK·(S). Both have cycle maps to intersection cohomology IH·(S). We conjecture a version of the decomposition theorem for semismall surjective maps and prove it in some particular cases.