Daria Michalik

# Daria Michalik: Degree of homogeneity of connes over locally connected curves

16/11/16 09:14

Tuesday, November 22, 2016 17:15

\(X\) is \(1/n\)-homogeneous if \(X\) has exactly \(n\) orbits. In such a case we say that the degree of homogeneity of \(X\) equals \(n\). P. Pellicer Covarrubias, A. Santiago-Santos calculated the degree of homogeneity of connes over local dendrites depending on the degree of homogeneity of their bases. We will generalize above result on connes over locally connected curves.

*Room:*D1-215*Daria Michalik*

Speaker:Speaker:

*Title*: Degree of homogeneity of connes over locally connected curves*Abstract*. \(\mathcal{H}(X)\) denotes the group of self-homeomorphisms of \(X\). An orbit of a point \(x_0\) in \(X\)is the set: \(\mathcal{O}_X(x_0) = \{h(x_0) : h\in\mathcal{H}(X)\}.\)\(X\) is \(1/n\)-homogeneous if \(X\) has exactly \(n\) orbits. In such a case we say that the degree of homogeneity of \(X\) equals \(n\). P. Pellicer Covarrubias, A. Santiago-Santos calculated the degree of homogeneity of connes over local dendrites depending on the degree of homogeneity of their bases. We will generalize above result on connes over locally connected curves.