On the supersaturation of oriented Turán problems
Abstract
The oriented Turán number of a given oriented graph F, denoted by (n,F), is the largest number of arcs in n-vertex F-free oriented graphs. This parameter could be seen as a natural oriented version of the classical Turán number. In this paper, we study the supersaturation phenomenon for oriented Turán problems, and prove oriented versions of the famous Erdős-Simonovits Supersaturation Theorem and Moon-Moser inequality, and supersaturation theorems for tournaments and antidirected complete bipartite graphs.
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