A multivariate cryptograpic instance in practice is a multivariate polynomial system. So the security of a protocol rely on the complexity of solving a multivariate polynomial system. In this paper there is an overview on a general algorithm used to solve a multivariate system and the quantity to which the complexity of this algorithm depends on: the solving degree. Unfortunately, it is hard to compute. For this reason, it is introduced an invariant: the degree of regularity. This invariant, under certain condition, give us an upper bound on the solving degree. Then we speak about random polynomial systems and in particular what "random" means to us. Finally, we give an upper bound on both the degree of regularity and the solving degree of such random systems.
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