In this thesis I consider two classes of stochastic optimization models: risk-averse mixed-integer recourse (MIR) models and distributionally robust MIR models. These classes of models can be used to support decision making in situations where uncertainty about the future plays an important role. For example, one might need to invest in a new production facility while future demand for the produced goods is uncertain. Typically, these two classes of MIR models are non-convex as a result of the integer restrictions in the model. This makes these models extremely hard to solve from a computational point of view. My aim is to overcome this issue and find efficient solution approaches.In this thesis, I propose pragmatic convex approaches for ri...