Bertini Theorems for F-signature and Hilbert-Kunz multiplicity
Abstract
We show that Bertini theorems hold for F-signature and Hilbert--Kunz multiplicity. In particular, if X ⊂eq Pn is normal and quasi-projective with F-signature greater than λ (respectively the Hilbert--Kunz multiplicity is less than λ) at all points x ∈ X, then for a general hyperplane H ⊂eq Pn the F-signature (respectively Hilbert--Kunz multiplicity) of X H is greater than λ (respectively less than λ) at all points x ∈ X H.
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