Abstract
By building on a method introduced by Kashiwara (Invent. Math. 38 (1976/77), 33–53) and refined by Lichtin (Ark. Mat. 27 (1989), 283–304), we give upper bounds for the roots of certain b -functions associated to a regular function f in terms of a log resolution of singularities. As applications, we recover with more elementary methods a result of Budur and Saito (J. Algebraic Geom. 14 (2005), 269–282) describing the multiplier ideals of f in terms of the V -filtration of f and a result of the second-named author with Popa (Forum Math. Sigma 8 (2020), Paper No. e19, 41) giving a lower bound for the minimal exponent of f in terms of a log resolution.
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