This chapter investigates an inverse problem for a diffusion equation involving fractional loaded terms and variable coefficients. The problem is equivalently reformulated as a system of loaded equations. Using this transformation, we establish the unique solvability of the inverse problem, emphasizing the identification of the multidimensional kernel associated with a loaded integro-differential heat conduction operator.
Inverse problem for the loaded heat conductivity equation with variable coefficients
Praveen Agarwal
;Clemente Cesarano
2026-01-01
Abstract
This chapter investigates an inverse problem for a diffusion equation involving fractional loaded terms and variable coefficients. The problem is equivalently reformulated as a system of loaded equations. Using this transformation, we establish the unique solvability of the inverse problem, emphasizing the identification of the multidimensional kernel associated with a loaded integro-differential heat conduction operator.File in questo prodotto:
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