Asymptotics solutions of a singularly perturbed integro-differential fractional order derivative equation with rapidly oscillating coefficients
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KU Publ.
Abstract
In this paper, the regularization method of S.A.Lomov is generalized to the singularly perturbed integrodifferential
fractional-order derivative equation with rapidly oscillating coefficients. The main goal of the
work is to reveal the influence of the oscillating components on the structure of the asymptotics of the
solution to this problem. The case of the absence of resonance is considered, i.e. the case when an integer
linear combination of a rapidly oscillating inhomogeneity does not coincide with a point in the spectrum of
the limiting operator at all points of the considered time interval. The case of coincidence of the frequency
of a rapidly oscillating inhomogeneity with a point in the spectrum of the limiting operator is called
the resonance case. This case is supposed to be studied in our subsequent works. More complex cases of
resonance (for example, point resonance) require more careful analysis and are not considered in this work.
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Bobodzhanova M.A. Asymptotics solutions of a singularly perturbed integro-differential fractional order derivative equation with rapidly oscillating coefficients/M.A. Bobodzhanova, B.T. Kalimbetov, G.M. Bekmakhanbet//Қарағанды университетінің хабаршысы. Математика сериясы.= Вестник Карагандинского университета. Серия Математика. = Bulletin of the Karaganda University. Mathematics Series. -2021. №4. Р.56-67.