Study of the possibility to invert the following theorem of Bremerman: if $B$ and $D$ are two bounded domains in $C^n$ and $C^m$, respectively, and if $G=B\times D$, then $K_G=K_B{K}_D$ where $K$ is the Bergman kernel function. Introduce a class of domains into $C^{n+m}$ containing the Reinhardt and Hartogs domains, as well as different “corrective” functions which express the difference between the Bergman kernel function of the domain and the product of the Bergman kernels of its “basis” in $C^n$ and of its “fibres” in ${\mathbf{C}}^m$. Different ways of inverting the theorem of Bremerman are considered. Taking into account the fact that the corrective functions are invariable with respect to some biholomorphic maps, certain propositions on the biholomorphic equivalence of the Hartogs domains in ${\mathbf{C}}^2$ and the bicylinder are obtained. Finally, one can deduce some estimations concerning the Bergman metric of the studied domains.