A note on Gorenstein monomial curves
Abstract
Let k be an arbitrary field. In this note, we show that if a sequence of relatively prime positive integers a=(a1,a2,a3,a4) defines a Gorenstein non complete intersection monomial curve C( a) in Ak4, then there exist two vectors u and v such that C( a+t u) and C( a+t v) are also Gorenstein non complete intersection affine monomial curves for almost all t≥ 0.
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