Discrete mollification and automatic numerical differentiation

A new approach to numerical differentiation, A wavelet-Galerkin method for high order numerical differentiation, On the Laplacian operation with applications in magnetic resonance electrical impedance imaging, Fourier truncation method for high order numerical derivatives, A modified method for high order numerical derivatives, Recognition of a time-dependent source in a time-fractional wave equation, Numerical recovery of a time-dependent potential in subdiffusion ^*, On complex-valued 2D eikonals. IV: continuation past a caustic, Differentiation by integration with Jacobi polynomials, Error analysis of Jacobi derivative estimators for noisy signals, Parameter estimation in the 1-D transport equation with advection., Hermite spectral and pseudospectral methods for numerical differentiation, Surface fitting and numerical gradient computations by discrete mollification, A perturbation method for numerical differentiation, On the uniqueness and reconstruction for an inverse problem of the fractional diffusion process, Numerical identification of a nonlinear diffusion coefficient by discrete mollification, A Hermite extension method for numerical differentiation, Reconstruction of high order derivatives by new mollification methods, Wavelet-based filters for accurate computation of derivatives, An inverse source problem in a semilinear time-fractional diffusion equation, Parameter estimation for a drying system in a porous medium, On the stable numerical evaluation of Caputo fractional derivatives, Numerical solutions of inverse spatial Lotka-Volterra systems, Identification of source terms in 2-D IHCP, Source term identification in 1-D IHCP, Parameter identification using mollification for predator-prey models in spatially heterogeneous environments, Automatic numerical solution of generalized 2-D IHCP by discrete mollification, Reconstruction of the time-dependent source term in a stochastic fractional diffusion equation, Numerical differentiation for periodic functions, Stable numerical evaluation of Grünwald–Letnikov fractional derivatives applied to a fractional IHCP, Stabilization of explicit methods for convection diffusion equations by discrete mollification, Determination of an unknown time-dependent heat source from a nonlocal measurement by finite difference method, Filtered spectral differentiation method for numerical differentiation of periodic functions with application to heat flux estimation, Data smoothing with applications to edge detection, Identification of parameters in the 2-D IHCP, Simultaneous space diffusivity and source term reconstruction in 2D IHCP

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• Automatic numerical differentiation by discrete mollification
• Discrete stability analysis of the mollification method for numerical differentiation
• An efficient method for calculating smoothing splines using orthogonal transformations
• Smoothing noisy data with spline functions: Estimating the correct degree of smoothing by the method of generalized cross-validation
• Mollified hyperbolic method for coefficient identification problems
• Numerical solution of generalized IHCP by discrete mollification
• Stable nunerical fractional differentiation by mollification