Behrend's function is constant on Hilb^n(C³)
classification
🧮 math.AG
math.AC
keywords
hilbbehrendconstantfunctioncalculationcharacteristiccorollarycurves
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We prove that Behrend's function is constant on Hilb^n(C^3). A calculation of motivic zeta functions shows the relevant Milnor fibers have zero Euler characteristic. As a corollary we see that Hilb^n(C^3) is generically reduced. These results extend to moduli schemes of points and curves on resolutions of ADE singularities C \times Y_G.
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