An Ambarzumian type theorem on graphs with odd cycles
Abstract
We consider an inverse problem for Schr\"odinger operators on a connected equilateral graph G with standard matching conditions. The graph G consists of at least two odd cycles glued together at a common vertex. We prove an Ambarzumian type result, i.e., if a specific part of the spectrum is the same as in the case of zero potential, then the potential has to be zero.
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