Approximation of Rough Functions
Abstract
For given p∈1,∞] and g∈ Lp(R), we establish the existence and uniqueness of solutions f∈ Lp(R), to the equation \[ f(x)-af(bx)=g(x), \] where a∈R, b∈R \0\, and a ≠ b 1/p. Solutions include well-known nowhere differentiable functions such as those of Bolzano, Weierstrass, Hardy, and many others. Connections and consequences in the theory of fractal interpolation, approximation theory, and Fourier analysis are established.
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