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An Identification Problem of Nonlinear Lowest Term Coefficient in the Special Form for Two-Dimensional Semilinear Parabolic Equation
An Identification Problem of Nonlinear Lowest Term Coefficient in the Special Form for Two-Dimensional Semilinear Parabolic Equation
In this paper we investigate an identification problem of a coefficient at the nonlinear lowest term in a 2D semilinear parabolic equation with overdetermination conditions given on a smooth curve. The unknown coefficient has the form of a product of two functions each depending on time and a spatial variable. We prove solvability of the problem in classes of smooth bounded functions. We present an example of input data satisfying the conditions of the theorem and the corresponding solution.
Авторы
Тэги
inverse problem
semilinear parabolic equation
Cauchy problem
lowest term coefficient
weak approximation method
local solvability
overdetermination conditions on a smooth curve.
Тематические рубрики
Предметные рубрики
В этом же номере:
On Solvability of Systems of Symbolic Polynomial Equations,
Probability Distribution Functions of the Sum of Squares of Random Variables in the Non-zero Mathematical Expectations,
...
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