1 - 10 of 20 articles
We determine necessary and sufficient conditions for nonspecial line bundles of degree 2% - 4 and 2g - 5 being not normally generated. Furthermore, we also determine necessary and suffcient conditions for speciality 1 line bundles of degree 2g -7,2% - 8, and 2g - 9 being not normally generated.
In this paper we prove that if a compact Kähler-Einstein manifold(M, ω with integral Kahler form satisfies a compatibility condition between the domain of definition of the Bochner coordinates and of the diastasis potential, then c1(M) ω0.
For holomorphic modular forms on tube domains, there are two types of known Fourier expansions, i.e. the classical Fourier expansion and the Fourier-Jacobi expansion. Either of them is along a maximal parabolic subgroup. In this paper, we discuss Fourier expansion of holomorphic modular forms on...
We give a formula connecting the Saito duals of the reduced zeta functions of the monodromies of defining equations of a quasihomogeneous complete intersection, the Poincaré series of its coordinate ring, and orbit invariants with respect to the natural ℂ*-action.
In this article we introduce a new regulator for arbitrary number fields, related to Gross’s regulator defined for CM-extensions. More precisely, this regulator is linked to the arithmetic of logarithmic classes, so that its non-triviality is equivalent to Gross’s generalized conjecture. As an...
Smooth, complex, ruled surfaces embedded in ℙ5 as linearly normal scrolls, such that they are contained in a quadric cone, are considered. Rational scrolls and some elliptic scrolls are shown to be the only ones contained in cones of rank 5. Results on scrolls contained in cones of lower ranks...
Read and print from thousands of top scholarly journals.
Already have an account? Log in
Bookmark this article. You can see your Bookmarks on your DeepDyve Library.
To save an article, log in first, or sign up for a DeepDyve account if you don’t already have one.
Sign Up Log In
To subscribe to email alerts, please log in first, or sign up for a DeepDyve account if you don’t already have one.
To get new article updates from a journal on your personalized homepage, please log in first, or sign up for a DeepDyve account if you don’t already have one.