Results which are known about ideals of spatial tensor product

I am studying about ideals of spatial (minimal) tensor product of $$C^{\ast}$$-algebras but I did not find any book/paper in which all the results are given.

What are some results or folklore which are well known about the ideals(primitive/prime/modular) of spatial tensor products of $$C^{\ast}$$-algebras.

To start with, if $$A$$ or $$B$$ is exact then closed ideals of spatial tensor product $$A \otimes B$$ are generated by tensor product of two sided closed ideals.

Well, one source I know which "considers ideals of tensor products of $$C^*$$-algebras" is David McConnell's thesis: $$C_0(X)$$-structure in $$C^*$$-algebras, multiplier algebras and tensor products.