On the C_r-sectional geometric genus of generalized polarized manifolds
スポンサーリンク
概要
著者
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Fukuma Yoshiaki
Department Of Natural Science Faculty Of Science Kochi University
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Fukuma Yoshiaki
Department Of Mathematics Faculty Of Science Kochi University
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FUKUMA Yoshiaki
Department of Mathematics College of Education Naruto University of Education
関連論文
- Cover and Partition of Pre-maximal Plane Graphs
- On the C_r-sectional geometric genus of generalized polarized manifolds
- On the sectional geometric genus of multi-polarized manifolds and its application (Higher Dimensional Algebraic Varieties and Vector Bundles)
- A lower bound for sectional genus of quasi-polarized manifolds
- A generalization of the *-genus of quasi-polarized varieties
- On invariants of polynomial functions
- A Numerical Characterization of Polarized Manifolds ($\mathit{X},\mathcal{L}$) with $\mathit{K_X=-(n-i)}\mathcal{L}$ by the $\mathit{i}$th Sectional Geometric Genus and the $i$th $\Delta$-genus
- ON SECTIONAL GENUS OF QUASI-POLARIZED MANIFOLDS $ (X,L) $ WITH $ h^0(L)=1 $
- A LOWER BOUND FOR $ K_x L^2 $ OF POLARIZED 3-FOLDS $ (X,L) $ OF GENERAL TYPE