About non-differentiable functions

Quantum derivatives and the Schrödinger equation ⋮ Some notes on conformable fractional Sturm-Liouville problems ⋮ The fractional differential polynomial neural network for approximation of functions ⋮ Fractional embedding of differential operators and Lagrangian systems ⋮ On the exact solution of wave equations on Cantor sets ⋮ Generalizations of Hölder's and some related integral inequalities on fractal space ⋮ Local generalizations of the derivatives on the real line ⋮ Exact local fractional differential equations ⋮ Scale calculus and the Schrödinger equation ⋮ General conformable fractional derivative and its physical interpretation ⋮ Conditions for continuity of fractional velocity and existence of fractional Taylor expansions ⋮ A modification of \(\mathsf {WKB}\) method for fractional differential operators of Schrödinger's type ⋮ Lagrangian and Hamiltonian mechanics on fractals subset of real-line ⋮ Local fractional Fourier series with application to wave equation in fractal vibrating string ⋮ Fractional complex transform method for wave equations on Cantor sets within local fractional differential operator ⋮ On chain rule for fractional derivatives ⋮ Approximation of functions by complex conformable derivative bases in Fréchet spaces ⋮ Comments on various extensions of the Riemann-Liouville fractional derivatives: about the Leibniz and chain rule properties ⋮ No nonlocality. No fractional derivative ⋮ A Local Fractional Taylor Expansion and Its Computation for Insufficiently Smooth Functions ⋮ The fractional complex step method ⋮ Local fractional variational iteration and decomposition methods for wave equation on Cantor sets within local fractional operators ⋮ Mathematical models arising in the fractal forest gap via local fractional calculus ⋮ A local fractional integral inequality on fractal space analogous to Anderson's inequality ⋮ Solution of nonlinear space-time fractional differential equations using the fractional Riccati expansion method ⋮ Consistency of the Duhem model with hysteresis ⋮ On the mixed fractional Brownian motion ⋮ CALCULUS ON FRACTAL CURVES IN Rⁿ ⋮ A new computational approach for solving nonlinear local fractional PDEs ⋮ The fractional quadratic-form identity and Hamiltonian structure of an integrable coupling of the fractional Ablowitz-Kaup-Newell-Segur hierarchy ⋮ Approximation solutions for local fractional Schrödinger equation in the one-dimensional Cantorian system ⋮ Helmholtz and diffusion equations associated with local fractional derivative operators involving the Cantorian and Cantor-type cylindrical coordinates ⋮ Mathematical aspects of the Heisenberg uncertainty principle within local fractional Fourier analysis ⋮ On the local fractional derivative of everywhere non-differentiable continuous functions on intervals ⋮ Fractional differential equations and the Schrödinger equation ⋮ Corrigendum to ``About non-differentiable functions ⋮ Non-differentiable variational principles ⋮ Application of the local fractional series expansion method and the variational iteration method to the Helmholtz equation involving local fractional derivative operators ⋮ Local fractional series expansion method for solving wave and diffusion equations on Cantor sets ⋮ Selected topics in the generalized mixed set-indexed fractional Brownian motion ⋮ CALCULUS ON FRACTAL SUBSETS OF REAL LINE — I: FORMULATION ⋮ Gamma Kernels and BSS/LSS Processes ⋮ CALCULUS ON FRACTAL SUBSETS OF REAL LINE — II: CONJUGACY WITH ORDINARY CALCULUS ⋮ On the local fractional derivative ⋮ Local fractional derivatives of differentiable functions are integer-order derivatives or zero ⋮ Some results on the generalized Brownian bridge ⋮ The asymptotic expansion and extrapolation of trapezoidal rule for integrals with fractional order singularities ⋮ Application of the Local Fractional Fourier Series to Fractal Signals ⋮ Fractional variation of Hölderian functions ⋮ About Schrödinger equation on fractals curves imbedding in \(\mathbb R^{3}\) ⋮ Scale relativity theory for one-dimensional non-differentiable manifolds ⋮ Some applications of fractional velocities

• Fractional differential equations. An introduction to fractional derivatives, fractional differential equations, to methods of their solution and some of their applications
• Functions that have no first order derivative might have fractional derivatives of all orders less than one
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