TY - JOUR
T1 - Lacunary Interpolation by Fractal Splines with Variable Scaling Parameters
JO - Numerical Mathematics: Theory, Methods and Applications
VL - 1
SP - 65
EP - 83
PY - 2017
DA - 2017/10
SN - 10
DO - http://doi.org/10.4208/nmtma.2017.m1514
UR - https://global-sci.org/intro/article_detail/nmtma/12336.html
KW - 
AB - <p style="text-align: justify;">For a prescribed set of lacunary data {($x_ν$, $f_ν$, $f^{&#39;&#39;}_ν$) : $ν = 0, 1, . . . , N$} with
equally spaced knot sequence in the unit interval, we show the existence of a family of fractal splines $S^α_b$ $∈$ $C^3$[0, 1] satisfying $S^α_b(x_ν)$ = $f_ν$, ($S^α_b$)$^{(2)}(x_ν)$ = $f^{′′}_ν$ for $ν = 0, 1, . . . , N$ and suitable boundary conditions. To this end, the unique quintic
spline introduced by A. Meir and A. Sharma [SIAM J. Numer. Anal. 10(3) 1973,
pp. 433-442] is generalized by using fractal functions with variable scaling parameters. The presence of scaling parameters that add extra &quot;degrees of freedom&quot;,
self-referentiality of the interpolant, and &quot;fractality&quot; of the third derivative of the interpolant are additional features in the fractal version, which may be advantageous
in applications. If the lacunary data is generated from a function $Φ$ satisfying certain
smoothness condition, then for suitable choices of scaling factors, the corresponding
fractal spline $S^α_b$ satisfies $‖Φ^r − (S^α_b)^{(r)}‖_∞ → 0$ for $0 ≤ r ≤ 3$, as the number of
partition points increases.</p>