On some invariants of hypersurface singularities

Abstract

Given a hypersurface defined by f in a smooth complex algebraic variety X, and a point P on this hypersurface, we consider the invariant βP(f) given by the log canonical threshold at P of mP· Jf, where mP is the ideal defining P and Jf is the Jacobian ideal of f. We show that this invariant satisfies most of the formal properties of the log canonical threshold of f and give some examples. Dano Kim asked whether this invariant always gives an upper bound for the minimal exponent of f at P. Motivated by this, we raise another question about minimal exponents, give a positive answer to a weaker version, and discuss some examples.

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