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Backward semi-linear parabolic equations with time-dependent coefficients and local Lipschitz source
Authors: Dinh Nho Hao, Nguyen Van Duc, Nguyen Van Thang
390    0
Inverse Problems
:     :
: https://iopscience.iop.org/article/10.1088/1361-6420/aab8cb
Publishing year: 2018
A non-local boundary value problem method for semi-linear parabolic equations backward in time.Stability estimates for Burgers-type equations backward in timeA mollification method for semi-linear heat equations backward in time in the Banach space Lp(R)Analysis IStability Results for Semi-linear Parabolic Equations Backward in TimeAn a posteriori mollifcation method for the heat equation backward in timeA REGULARIZATION METHOD FOR BACKWARD PARABOLIC EQUATIONS WITH TIME-DEPENDENT COEFFICIENTSStability results for backward time-fractional parabolic equationsA Mollification Method for Backward Time-Fractional Heat EquationIdentifying an unknown source term in a time-space fractional parabolic equationRegularization of backward time-fractional parabolic equations by Sobolev-type equationsStability results for weak solutions to backward one-dimensional semi-linear parabolic equations with locally Lipschitz sourceIdentifying an unknown source term in a heat equation with time-dependent coefficientsStability results for backward heat equations with time-dependent coefficient in the Banach space Lp(R )Identifying an unknown source term of a parabolic equation in Banach spacesFractal GeometryTextbook of Measures and IntegralThe quasi-reversibility method for an inverse source problem for time-space fractional parabolic equationsA coefficient identification problem for a system of advection-reaction equations in water quality modelingA regularization method for Caputo fractional derivatives in the Banach space L∞[0, T]Regularization of backward parabolic equations in Banach spaces by generalized Sobolev equations