On boundedness of divisors computing minimal log discrepancies for surfaces

Abstract

Let be a finite set, and X x a fixed klt germ. For any lc germ (X x,B:=Σi biBi) such that bi∈ , Nakamura's conjecture, which is equivalent to the ACC conjecture for minimal log discrepancies for fixed germs, predicts that there always exists a prime divisor E over X x, such that a(E,X,B)=mld(X x,B), and a(E,X,0) is bounded from above. We extend Nakamura's conjecture to the setting that X x is not necessarily fixed and satisfies the DCC, and show it holds for surfaces. We also find some sufficient conditions for the boundedness of a(E,X,0) for any such E.