I´m trying to solve a problem of cancellation of reflexive finitely generated modules over normal noetherian domains. When R is regular domain with dim R less than or equal to 2, for finitely generated modules, reflexive is equivalent to projective.

Now I´m studying the case dim R=2 and R normal. In this hypothesis, reflexive modules are **maximal Cohen-Macaulay modules**.

I´m looking for **references about this topic**, with especial emphasis in *lifting of homomorphism* between factors of maximal CM modules: something like "... an homomorphism M/IM-->N/IN can be lift to an homomorphism M-->N..."; *indescomponibles* maximal CM modules are wellcome too.