D-decomposition technique is targeted to describe the stability domain in parameter space for linear systems, depending on parameters. The technique is very simple and effective for the case of one or two parameters. However the geometry of the arising parameter space decomposition into root invariant regions has not been studied in detail it is the purpose of the present paper. We prove that the number of stability intervals for one real parameter is no more than n/2 (n being the degree of the characteristic polynomial) and provide an example, where this number is achieved. For one complex or two real parameters we estimate the number of root invariant regions (equal n^2-2n+3 for complex and 2n^2-2n+3 for real case) and demonstrate that this upper bound is tight. The example with n-1 simply connected stability regions in 2D parameter plane is analyzed.