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Axially Harmonic Functions and the Harmonic Functional Calculus on the S-spectrum

Fabrizio Colombo, Antonino De Martino, Stefano Pinton, Irene Sabadini

2022Journal of Geometric Analysis16 citationsDOIOpen Access PDF

Abstract

Abstract The spectral theory on the S -spectrum was introduced to give an appropriate mathematical setting to quaternionic quantum mechanics, but it was soon realized that there were different applications of this theory, for example, to fractional heat diffusion and to the spectral theory for the Dirac operator on manifolds. In this seminal paper we introduce the harmonic functional calculus based on the S -spectrum and on an integral representation of axially harmonic functions. This calculus can be seen as a bridge between harmonic analysis and the spectral theory. The resolvent operator of the harmonic functional calculus is the commutative version of the pseudo S -resolvent operator. This new calculus also appears, in a natural way, in the product rule for the F -functional calculus.

Topics & Concepts

Functional calculusMathematicsSpectral theoryFractional calculusDirac operatorCalculus (dental)Time-scale calculusDifferential calculusSpectrum (functional analysis)Operator (biology)HarmonicHolomorphic functional calculusResolvent formalismAlgebra over a fieldHarmonic functionMathematical analysisPure mathematicsQuantum mechanicsMultivariable calculusHilbert spacePhysicsFinite-rank operatorChemistryBiochemistryDentistryMedicineControl engineeringTranscription factorEngineeringRepressorGeneBanach spaceAlgebraic and Geometric AnalysisMathematical Analysis and Transform MethodsAdvanced Topics in Algebra
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