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On $\varepsilon$-regular solutions to differential equations with a small parameter
V. I. Kachalov National Research University "Moscow Power Engineering Institute"
Abstract:
We consider some nonlinear evolution equation with an unbounded operator depending on a small parameter on the right-hand side and study the existence of solutions holomorphically depending on a parameter. We introduce the notion of $\varepsilon$-regular solution and establish the conditions for the $\varepsilon$-regular solution to coincide with a solution to this equation.
Keywords:
evolution problem, strongly continuous semigroup, $\varepsilon$-regular solution.
Received: 09.09.2021 Revised: 19.09.2022 Accepted: 10.10.2022
Citation:
V. I. Kachalov, “On $\varepsilon$-regular solutions to differential equations with a small parameter”, Sibirsk. Mat. Zh., 64:1 (2023), 113–122; Siberian Math. J., 64:1 (2023), 94–102
Linking options:
https://www.mathnet.ru/eng/smj7750 https://www.mathnet.ru/eng/smj/v64/i1/p113
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