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Gons and holes in point sets have been extensively studied in the literature. For simple drawings of the complete graph a generalization of the Erdos--Szekeres theorem is known and empty triangles have been investigated. We introduce a notion of k-holes for simple drawings and study their existence with respect to the convexity hierarchy. We present a family of simple drawings without 4-holes and prove a generalization of Gerken's empty hexagon theorem for convex drawings. A crucial intermediate step will be the structural investigation of pseudolinear subdrawings in convex~drawings.
Bergold et al. (Tue,) studied this question.