Add to ORKGCoarse geometry is the study of the large scale properties of spaces. The interest in large scale properties is mainly motivated by applications to geometric group theory and index theory, as well as to important open problems such as the Novikov Conjecture. In this thesis, we introduce and study coarse versions of the following classical topological notions: connectedness, monotone-light factorizations, extension theorems, and quotients by properly discontinuous group actions. We will draw on the analogy between large scale geometry and topology as well as on the perspective of category theory using Roe\u27s coarse category. In the first of four research chapters, we look at a large scale connectedness condition arising from the coarse cat...