Big Cohen-Macaulay test ideals in equal characteristic zero via ultraproducts
Abstract
Utilizing ultraproducts, Schoutens constructed a big Cohen-Macaulay algebra B(R) over a local domain R essentially of finite type over C. We show that if R is normal and is an effective Q-Weil divisor on Spec R such that KR+ is Q-Cartier, then the BCM test ideal τB(R)(R,) of (R,) with respect to B(R) coincides with the multiplier ideal J(R,) of (R,), where R and B(R) are the m-adic completions of R and B(R), respectively, and is the flat pullback of by the canonical morphism Spec R Spec R. As an application, we obtain a result on the behavior of multiplier ideals under pure ring extensions.
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