On syzygies of non-complete embedding of projective varieties |
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| Authors: | Youngook Choi Sijong Kwak Euisung Park |
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| Affiliation: | (1) Department of Mathematics Education, Yeungnam University, 214-1 Daedong Gyeongsan, 712-749 Gyeongsangbuk-do, Republic of Korea;(2) Department of Mathematical Sciences, Korea Advanced Institute of Science and Technology, Daejeon and Korea Institute for Advanced Study, Seoul, Republic of Korea;(3) School of Mathematics, Korea Institute for Advanced Study, 207-43 Cheongryangri-dong, Dongdaemun-gu, Seoul, 130-722, Republic of Korea |
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| Abstract: | Let X be a non-degenerate, not necessarily linearly normal projective variety in  . Recently the generalization of property N p to non-linearly normal projective varieties have been considered and its algebraic and geometric properties are studied extensively. One of the generalizations is the property N d,p for the saturated ideal I X (Eisenbud et al. in Compos Math 141: 1460–1478, 2005) and the other is the property  for the graded module of the twisted global sections of  (Kwak and Park in J Reine Angew Math 582: 87–105, 2005). In this paper, we are interested in the algebraic and geometric meaning of properties  for every p ≥ 0 and the syzygetic behaviors of isomorphic projections and hyperplane sections of a given variety with property  . Youngook Choi and Sijong Kwak were supported in part by KRF (grant No. 2005-070-C00005). |
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| Keywords: | 13D02 14N15 |
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