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In this thesis, we cover two intimately related objects in combinatorics, namely random constraint satisfaction problems and random matrices. First we solve a classic constraint satisfaction problem, 2-SAT using the graph structure and a message passing algorithm called Belief Propagation. We also explore another message passing algorithm called Warning Propagation and prove a useful result that can be employed to analyze various type of random graphs. In particular, we use this Warning Propagation to study a Bernoulli sparse parity matrix and reveal a unique phase transition regarding replica symmetry. Lastly, we use variational methods and a version of local limit theorem to prove a sufficient condition for a general random matrix to be of full rank.
Although everyone is familiar with using algorithms on a daily basis, formulating, understanding and analysing them rigorously has been (and will remain) a challenging task for decades. Therefore, one way of making steps towards their understanding is the formulation of models that are portraying reality, but also remain easy to analyse. In this thesis we take a step towards this way by analyzing one particular problem, the so-called group testing problem. R. Dorfman introduced the problem in 1943. We assume a large population and in this population we find a infected group of individuals. Instead of testing everybody individually, we can test group (for instance by mixing blood samples). In this thesis we look for the minimum number of tests needed such that we can say something meaningful about the infection status. Furthermore we assume various versions of this problem to analyze at what point and why this problem is hard, easy or impossible to solve.