Let $X$ be a singular variety. Define the (triangulated) category of singularities (as in Orlov's paper) as the Verdier quotient of the derived category of coherent sheaves on $X$ modulo the full subcategory of perfect complexes.
For example, there is a quiver description in the case of ADE surface singularities: http://arxiv.org/abs/math/0511155
Are there any other cases do we have results for the category of singularities? In particular, for higher codimension varieties?
A student of Orlov is working on one case. He will give a talk in two weeks in Padova, here is the abstract:
Abstract: Derived categories of singularities measure how far is an algebraic variety from being smooth. They appear on the algebraic side of the Homological Mirror Symmetry (HMS) for the Landau-Ginzburg models. The talk will be dedicated to the case when the superpotential is given by the so called invertible polynomial. In the case of small dimensions, I will give the description of mentioned categories in terms of full strongly exceptional collections of good kind. I will also recall several conjectures concerning HMS for the current case and will show how the constructed collections help to assert
