Аннотация:
The problem of finding eigenvalue estimates for the Schrödinger operator turns out to be most complicated for the dimension 2. Some important results for this case have been obtained recently. In the paper, these results are discussed, and their counterparts are established for the operator on the combinatorial and metric graphs corresponding to the lattice $\mathbb Z^2$.
Ключевые слова:eigenvalue estimates, Schrödinger operator, metric graphs, local dimension.