Abstract
We explore covering spaces — spaces that locally look like the “repetitions” of a base space. A key insight is, that we can gain hyperbolic geometry by looking at the universal cover of a surface of genus \(g \geq 2\).
Abstract
We explore covering spaces — spaces that locally look like the “repetitions” of a base space. A key insight is, that we can gain hyperbolic geometry by looking at the universal cover of a surface of genus \(g \geq 2\).