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References
K. Behnke. Infinitesimal deformations of cusp singularities. Math. Ann. 265, 407–422,1983.
K. Behnke, H. Knörrer. On infinitesimal deformations of rational surface singularities. Compositio Math. 61, 103–127,1987.
H. Laufer. On minimally elliptic singularities. Amer. Journal of Math. 99, 1257–1295, 1977.
H. Pinkham. Deformations of normal surface singularities with C* action. Math. Ann. 232, 65–84, 1978.
M. Schlessinger. Rigidity of quotient singularities. Inventiones Math. 14, 17–26,1971.
J. Wahl. Vanishing theorems for resolutions of singularities. Inventiones Math. 31, 17–41, 1975.
—. Simultaneous resolution and discriminantal loci. Duke Math. Journal 46, 341–375, 1979.
—. Derivations of negative weight and non-smoothability of certain singularities. Math. Ann. 258, 383–398, 1982.
—. A characterization of quasihomogeneous Gorenstein surface singularities. Compositio Math. 55, 3–32, 1984.
—. The Jacobian Algebra of a quasihomogeneous Gorenstein surface singularity. Duke Math. Journal 55, 843–871, 1987.
S. T. Yau. s (n-1)-invariant for isolated n-dimensional singularities and its applications to moduli problems. Amer. Journal of Math. 104, 829–841, 1982.
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Behnke, K. (1991). On infinitesimal deformations of minimally elliptic singularities. In: Mond, D., Montaldi, J. (eds) Singularity Theory and its Applications. Lecture Notes in Mathematics, vol 1462. Springer, Berlin, Heidelberg. https://doi.org/10.1007/BFb0086372
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DOI: https://doi.org/10.1007/BFb0086372
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