Thomas Bauer, Carsten Bornträger
Published 2016-08-25Version 1
The nef cone volume appeared first in work of Peyre in a number-theoretic context on Del Pezzo surfaces, and it was studied by Derenthal and co-authors in a series of papers. The idea was subsequently extended to also measure the Zariski chambers of Del Pezzo surfaces. We start in this paper to explore the possibility to use this attractive concept to effectively measure the size of the nef cone on algebraic surfaces in general. This provides an interesting way of measuring in how big a space an ample line bundle can be moved without destroying its positivity. We give here complete results for simple abelian surfaces that admit a principal polarization and for products of elliptic curves.
Adjunction for varieties with $\mathbb{C}^*$ action
Seshadri Constants and Fujita's Conjecture via Positive Characteristic Methods
Rationality of Seshadri constants on general blow ups of $\mathbb{P}^2$
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