# Does there exist a notion of Chern classes in intersection cohomology?

First of all: I apologize for my mistakes, I'm a freshman in intersection cohomology.

Let $$X$$ be a (compact) complex analytic space, let $$L$$ be a line bundle over $$X$$.

Can one define a notion of first Chern class $$c_1(L)\in IH^2(X)$$ for $$L$$? Does there exist a such construction? Any reference?