Personal tools
You are here: Home Publications On the construction problem for Hodge numbers

On the construction problem for Hodge numbers

Stefan Schreieder

Number 19
Author Stefan Schreieder
Year 2013

For any symmetric collection of natural numbers h^{p,q} with p+q=k, we construct a smooth complex projective variety whose weight k Hodge structure has these Hodge numbers; if k=2m is even, then we have to impose that h^{m,m} is bigger than some quadratic bound in m. Combining these results for different weights, we solve the construction problem for the truncated Hodge diamond under two additional assumptions. Our results lead to a complete classification of all nontrivial dominations among Hodge numbers of Kaehler manifolds.

More information about this publication…

Document Actions
« May 2020 »
May
MoTuWeThFrSaSu
123
45678910
11121314151617
18192021222324
25262728293031