We consider a class of problems modeling the process of determining the temperature and density of nonlocal sub-diffusion sources given by initial and finite temperature. Their mathematical statements involve inverse problems for the fractional-time heat equation in which, solving the equation, we have to find the an unknown right-hand side depending only on the space variable. The results on existence and uniqueness of solutions of these problems are presented
Main goal of the paper is to present the algorithm serving to solve the heat conduction inverse prob...
In this paper, two inverse problems for the fractional diffusion-wave equation that use final data a...
Applying properties of the Laplace transform, the transient heat diffusion equation can be transform...
We consider a class of problems modeling the process of determining the temperature and density of n...
We consider a linear heat equation involving a fractional derivative in time, with a nonlocal bound...
An inverse source identification problem for a time fractional diffusion equation is discussed. The ...
AbstractIn this paper, we consider an inverse problem for a time-fractional diffusion equation in a ...
International audienceThis paper is concerned with an inverse source problem for a space-time fracti...
This paper is devoted to identify a space-dependent source function in a multiterm time-fractional d...
The ill-posed problem of attempting to recover the temperature functions from one measured transient...
summary:We consider the problem of determining the unknown source term $ f=f(x,t) $ in a space fract...
In this contribution, we investigate an inverse source problem for a fractional diffusion and wave e...
In this contribution, we investigate an inverse source problem for a fractional diffusion and wave e...
This research determines an unknown source term in the fractional diffusion equation with the Rieman...
International audienceThis paper is concerned with the inverse problem of determining the time and s...
Main goal of the paper is to present the algorithm serving to solve the heat conduction inverse prob...
In this paper, two inverse problems for the fractional diffusion-wave equation that use final data a...
Applying properties of the Laplace transform, the transient heat diffusion equation can be transform...
We consider a class of problems modeling the process of determining the temperature and density of n...
We consider a linear heat equation involving a fractional derivative in time, with a nonlocal bound...
An inverse source identification problem for a time fractional diffusion equation is discussed. The ...
AbstractIn this paper, we consider an inverse problem for a time-fractional diffusion equation in a ...
International audienceThis paper is concerned with an inverse source problem for a space-time fracti...
This paper is devoted to identify a space-dependent source function in a multiterm time-fractional d...
The ill-posed problem of attempting to recover the temperature functions from one measured transient...
summary:We consider the problem of determining the unknown source term $ f=f(x,t) $ in a space fract...
In this contribution, we investigate an inverse source problem for a fractional diffusion and wave e...
In this contribution, we investigate an inverse source problem for a fractional diffusion and wave e...
This research determines an unknown source term in the fractional diffusion equation with the Rieman...
International audienceThis paper is concerned with the inverse problem of determining the time and s...
Main goal of the paper is to present the algorithm serving to solve the heat conduction inverse prob...
In this paper, two inverse problems for the fractional diffusion-wave equation that use final data a...
Applying properties of the Laplace transform, the transient heat diffusion equation can be transform...
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