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We generalized the Perron-Frobenious theory by using a variational approach and extended it to sets of arbitrary matrices, including those that are not either irreducible or essentially positive. We introduce a new concept called a "quasi-eigenvalues of a matrix", which is invariant under orthogonal transformations of variables, and has various useful properties, including such as determining the largest of the real parts of eigenvalues of a matrix. Additionally, we establish new results on the continuity of the spectral radius, as well as obtain new types of estimates for the ranges of the sets of eigenvalues and their real parts.
Il’yasov et al. (Fri,) studied this question.
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