Cauchy Problem for an Abstract Evolution Equation of Fractional Order

Cauchy Problem for an Abstract Evolution Equation of Fractional Order

In this paper, we define an operator function as a series of operators corresponding to the Taylor series representing the function of the complex variable. In previous papers, we considered the case when a function has a decomposition in the Laurent series with the infinite principal part and finit...

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Veröffentlicht in:Fractal and fractional 2023-01, Vol.7 (2), p.111
1. Verfasser: Kukushkin, Maksim V.
Format: Artikel
Sprache:eng
Schlagworte:
Abel–Lidskii basis property
Cauchy problems
Complex variables
Entire functions
Environmental impact
Evolution
evolution equations
Ferroelectrics
Fractals
fractional differential equations
Hilbert space
Inequality
operator function
Operators (mathematics)
Phase transitions
Schatten–von Neumann class
Taylor series
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Beschreibung
Zusammenfassung:In this paper, we define an operator function as a series of operators corresponding to the Taylor series representing the function of the complex variable. In previous papers, we considered the case when a function has a decomposition in the Laurent series with the infinite principal part and finite regular part. Our central challenge is to improve this result having considered as a regular part an entire function satisfying the special condition of the growth regularity. As an application, we consider an opportunity to broaden the conditions imposed upon the second term not containing the time variable of the evolution equation in the abstract Hilbert space.
ISSN:2504-3110
2504-3110
DOI:10.3390/fractalfract7020111