On ∞-Complex Symmetric Operators

Abstract: Abstract. In this paper, we study spectral properties and local spectral properties of ∞-complex symmetric operators T. In particular, we prove that if T is an ∞-complex symmetric operator, then T has the decomposition property (δ) if and only if T is decomposable. Moreover, we show that if T and S are ∞-complex symmetric operators, then so is T ⊗ S.

“…Several applications of this approach deal with Schrodinger operators with spectral gaps and scaled Hamiltonians appearing in the complex scaling theory of resonances [19,20]. In the numerous studies considering the concepts of m-complex symmetric transformations [21][22][23], [m]-complex symmetric transformations, skew m-complex symmetric transformations [24], and skew [m]-complex symmetric transformations [25], it was natural to introduce the concept of n-quasi-m-complex symmetric transformations. This was our goal in this study.…”

n-Quasi-m-Complex Symmetric Transformations

“…Several applications of this approach deal with Schrodinger operators with spectral gaps and scaled Hamiltonians appearing in the complex scaling theory of resonances [19,20]. In the numerous studies considering the concepts of m-complex symmetric transformations [21][22][23], [m]-complex symmetric transformations, skew m-complex symmetric transformations [24], and skew [m]-complex symmetric transformations [25], it was natural to introduce the concept of n-quasi-m-complex symmetric transformations. This was our goal in this study.…”

n-Quasi-m-Complex Symmetric Transformations

A Class of Operators Related to Skew m-Complex Symmetric Operators

On m-complex symmetric weighted shift operators on Cn