On a Kirchhoff Diffusion Equation With Integral Condition
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Date
2020
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Springer
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GOLD
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Abstract
This paper is devoted to Kirchhoff-type parabolic problem with nonlocal integral condition. Our problem has many applications in modeling physical and biological phenomena. The first part of our paper concerns the local existence of the mild solution in Hilbert scales. Our results can be studied into two cases: homogeneous case and inhomogeneous case. In order to overcome difficulties, we applied Banach fixed point theorem and some new techniques on Sobolev spaces. The second part of the paper is to derive the ill-posedness of the mild solution in the sense of Hadamard.
Description
Keywords
Kirchhoff-Type Problems, Nonlocal Problem, Well-Posedness, Regularization, 35R11, 35B65, 26A33, Mathematical analysis, Engineering, Differential equation, Banach fixed-point theorem, Regularization, QA1-939, FOS: Mathematics, Multiscale Methods for Heterogeneous Systems, Homogeneous, Fixed-point theorem, Hadamard transform, Kirchhoff-type problems, Applied Mathematics, Partial differential equation, Sobolev space, Applied mathematics, Nonlocal Partial Differential Equations and Boundary Value Problems, Well-posedness, Computational Theory and Mathematics, Parabolic Equations, Control and Systems Engineering, Combinatorics, Physical Sciences, Computer Science, Analysis and Control of Distributed Parameter Systems, Nonlocal problem, Mathematics, Ordinary differential equation, nonlocal problem, well-posedness, Initial-boundary value problems for second-order parabolic equations, Nonlinear parabolic equations, Applications of operator theory to differential and integral equations, Asymptotic behavior of solutions to PDEs, regularization
Fields of Science
01 natural sciences, 0101 mathematics
Citation
Nam, Danh Hua Quoc...et al. (2020). "On a Kirchhoff diffusion equation with integral condition", Advances in Difference Equations, Vol. 2020, No. 1.
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Q1
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OpenCitations Citation Count
3
Source
Advances in Difference Equations
Volume
2020
Issue
1
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Citations
Scopus : 3
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