| Abstract |
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A translation surface is a closed surface obtained by gluing edges of
a polygon by translations. The group \(GL_2(\mathbb R)\) acts on the
collection translation surfaces of a fixed genus \(g\). Eskin and
Mirzakhani classified probability measures that are invariant under
\(SL_2(\mathbb R)\) and, more generally, under the upper triangular
subgroup. In the talk we will discuss a new extension that describes
probability measures invariant under the horocyclic flow, conjectured
by Forni. We also present an application to billiards with rational
angles.
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