The topological holonomy group and the complexity of horizontality
Abstract
Based on [1], we study the complexity of horizontality in each twistor space E associated with an oriented vector bundle E of rank 4 with a positive-definite metric over the 2-torus T2, and obtain classification of the topological holonomy groups in SO(3). We observe that there exist many topological holonomy groups in SO(3) generated by two finite order elements and equipped with noncommutative pairs which consist of infinite order elements. We find topological holonomy groups which are dense in SO(4).
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