On fractal dimension of the graph of nonstationary fractal interpolation function
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Publication:6494704
DOI10.1090/CONM/797/15953MaRDI QIDQ6494704
Publication date: 30 April 2024
Hausdorff dimensionbox dimensionHölder spaceoscillation spacesconvex-Lipschitz spacenonstationary fractal interpolation functions
Fractals (28A80) Other special orthogonal polynomials and functions (33C47) Approximation by other special function classes (41A30)
Cites Work
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- Box dimensions of Riemann-Liouville fractional integrals of continuous functions of bounded variation
- Fractal functions and interpolation
- Geometrical dimension versus smoothness
- A note on Katugampola fractional calculus and fractal dimensions
- Box dimension of mixed Katugampola fractional integral of two-dimensional continuous functions
- Dimensional analysis of \(\alpha\)-fractal functions
- Attractors of trees of maps and of sequences of maps between spaces with applications to subdivision
- The relationship between the fractal dimensions of a type of fractal functions and the order of their fractional calculus
- Box dimension, oscillation and smoothness in function spaces
- Non-stationary versions of fixed-point theory, with applications to fractals and subdivision
- Non-stationary \(\alpha\)-fractal surfaces
- On the Hausdorff Dimension of Some Graphs
- The Hausdorff dimension of graphs of Weierstrass functions
- ON FRACTAL DIMENSIONS OF FRACTAL FUNCTIONS USING FUNCTION SPACES
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