Litcius/Paper detail

Problem of Determining a Multidimensional Kernel in One Parabolic Integro–differential Equation

D. K. Durdiev, Zhavlon Z. Nuriddinov

2021Journal of Siberian Federal University Mathematics & Physics16 citationsDOIOpen Access PDF

Abstract

The multidimensional parabolic integro-differential equation with the time-convolution in- tegral on the right side is considered. The direct problem is represented by the Cauchy problem for this equation. In this paper it is studied the inverse problem consisting in finding of a time and spatial dependent kernel of the integrated member on known in a hyperplane xn = 0 for t > 0 to the solution of direct problem. With use of the resolvent of kernel this problem is reduced to the investigation of more convenient inverse problem. The last problem is replaced with the equivalent system of the integral equations with respect to unknown functions and on the bases of contractive mapping principle it is proved the unique solvability to the direct and inverse problems

Topics & Concepts

MathematicsKernel (algebra)ResolventInverse problemIntegro-differential equationMathematical analysisConvolution (computer science)Cauchy problemIntegral equationFredholm integral equationInverseDifferential equationApplied mathematicsInitial value problemPure mathematicsFirst-order partial differential equationGeometryArtificial neural networkComputer scienceMachine learningDifferential Equations and Boundary ProblemsNumerical methods in inverse problemsDifferential Equations and Numerical Methods
Problem of Determining a Multidimensional Kernel in One Parabolic Integro–differential Equation | Litcius