Entropy compression is a proof technique used to show that some random algorithm terminates in finite time. We present an algorithm that compresses in a lossless manner a random input string into a string of history records at each step. With this algorithm, we can guarantee termination if the number of entropy bits read from the random input increases faster than the number of information bits stored in our history record. In our work we first define some necessary basic concepts from information theory and present the notion of computable problems. We show that Kolmogorov complexity of a structure is not computable. Next we present and prove the Lovasz local lemma and use it for a proof that a certain subclass of satisfiability problem k-SAT is positively solvable. The very same problem is then positively solved with the entropy compression argument which uses a Kolmogorov random structure as its probability source. An analogous approach, albeit with further technical complications, is then used to study a pair of graph theoretical problems — acyclic edge colorings and nonrepetitive colorings.