Effective resistance in planar graphs and continued fractions
Abstract
For a simple graph G=(V,E) and edge e∈ E, the effective resistance is defined as a ratio τ(G/e)τ(G), where τ(G) denotes the number of spanning trees in G. We resolve the inverse problem for the effective resistance for planar graphs. Namely, we determine (up to a constant) the smallest size of a simple planar graph with a given effective resistance. The results are motivated and closely related to our previous work arXiv:2411.18782 on Sedl\'acek's inverse problem for the number of spanning trees.
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