<p>The foundation of spectral theory on the <i>S</i>-spectrum can be traced back to the quaternionic framework of quantum mechanics. The concept of <i>S</i>-spectrum for quaternionic operators emerged as the natural spectrum in slice hyperholomorphic functional calculi, known as the <i>S</i>-functional calculus and also utilized in the quaternionic spectral theorem. This spectral theory extends to Clifford operators. A key distinction from classical complex spectral theory lies in the definition of the <i>S</i>-spectrum, which is second order in the operator <i>T</i>, and in the <i>S</i>-resolvent operators that turns out to be the product of two different operators. This study delves into the analyticity of the <i>S</i>-resolvent operators under specified boundary conditions for the <i>S</i>-spectral problem. The spectral theory on the <i>S</i>-spectrum also provides deeper insights into classical spectral theory.</p>

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Slice Hyperholomorphicity of the S-resolvent Operators and Boundary Conditions

  • Francesco Mantovani

摘要

The foundation of spectral theory on the S-spectrum can be traced back to the quaternionic framework of quantum mechanics. The concept of S-spectrum for quaternionic operators emerged as the natural spectrum in slice hyperholomorphic functional calculi, known as the S-functional calculus and also utilized in the quaternionic spectral theorem. This spectral theory extends to Clifford operators. A key distinction from classical complex spectral theory lies in the definition of the S-spectrum, which is second order in the operator T, and in the S-resolvent operators that turns out to be the product of two different operators. This study delves into the analyticity of the S-resolvent operators under specified boundary conditions for the S-spectral problem. The spectral theory on the S-spectrum also provides deeper insights into classical spectral theory.