Spectral functions of products of selfadjoint operators
classification
🧮 math.SP
keywords
operatorsoperatorselfadjointspectraldefinitizableexistsfunctionfunctions
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Given two possibly unbounded selfadjoint operators A and G such that the resolvent sets of AG and GA are non-empty, it is shown that the operator AG has a spectral function on IR with singularities if there exists a non-zero polynomial p such that the symmetric operator Gp(AG) is non-negative. This result generalizes a well-known theorem for definitizable operators in Krein spaces.
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