On Hypersurface Quotient Singularity of Dimension 4

Abstract

We consider geometrical problems on Gorenstein hypersurface orbifolds of dimension n ≥ 4 through the theory of Hilbert scheme of group orbits. For a linear special group G acting on n, we study the G-Hilbert scheme, G(n), and crepant resolutions of n/G for G=the A-type abelian group Ar(n). For n=4, we obtain the explicit structure of Ar(4)(4). The crepant resolutions of 4/Ar(4) are constructed through their relation with Ar(4)(4), and the connections between these crepant resolutions are found by the "flop" procedure of 4-folds. We also make some primitive discussion on G(n) for the G= alternating group An+1 of degree n+1 with the standard representation on n; the detailed structure of A4(3) is explicitly constructed.

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