Reducibility of Cartesian product quantum graph equipped with group action
Abstract
We consider a Cartesian product quantum graph n1n2 with standard vertex conditions, and complete the decomposition of Hilbert space L2(n1n2) and the Laplacian H on it by employing the relevant theories of group representation. The concept of n1n2 equipped with the action of the cyclic group Gn1× Gn2 is defined through the introduction of periodic quantum graph and cyclic groups. We also constructed its quotient graph and accomplish the decomposition of its secular determinant. Furthermore, under the condition that (n1,n2)=1, it can be regarded as equivalent to a circulant graph Cn1n2(n1,n2). This work also provides a new method for the construction of isospectral graphs.
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