| Abstract [eng] |
One of the most important functions is the Riemann zeta function. For the complexity of zeta function value distribution a probabilistic method is applied, the essence of which is simple: take any sets which belong to sets of classes in the complex plane and analyze how often, for example, the zeta function values fall into these sets. These frequencies are controlled by strict laws, which are described by probabilistic terms and the results are called limit theorems. In this Master's thesis the multidimensional limit theorem for zeta functions of cusp forms are proven. |
