Affine zipper fractal interpolation functions › Обзор исследований

Standard

Affine zipper fractal interpolation functions. / Chand, A. K.B.; Vijender, N.; Viswanathan, P. и др.

в: BIT Numerical Mathematics, Том 60, № 2, 01.06.2020, стр. 319-344.

Результаты исследований: Научные публикации в периодических изданиях › статья › Рецензирование

Harvard

Chand, AKB, Vijender, N, Viswanathan, P & Tetenov, AV 2020, 'Affine zipper fractal interpolation functions', BIT Numerical Mathematics, Том. 60, № 2, стр. 319-344. https://doi.org/10.1007/s10543-019-00774-3

APA

Chand, A. K. B., Vijender, N., Viswanathan, P., & Tetenov, A. V. (2020). Affine zipper fractal interpolation functions. BIT Numerical Mathematics, 60(2), 319-344. https://doi.org/10.1007/s10543-019-00774-3

Vancouver

Chand AKB, Vijender N, Viswanathan P, Tetenov AV. Affine zipper fractal interpolation functions. BIT Numerical Mathematics. 2020 июнь 1;60(2):319-344. doi: 10.1007/s10543-019-00774-3

Author

Chand, A. K.B. ; Vijender, N. ; Viswanathan, P. и др. / Affine zipper fractal interpolation functions. в: BIT Numerical Mathematics. 2020 ; Том 60, № 2. стр. 319-344.

BibTeX

@article{95e3942a8f11412eb548e0460f8e5edc,

title = "Affine zipper fractal interpolation functions",

abstract = "This paper introduces a univariate interpolation scheme using a binary parameter called signature such that the graph of the interpolant—which we refer to as affine zipper fractal interpolation function—is obtained as an attractor of a suitable affine zipper. The scaling vector function is identified so that the graph of the corresponding affine zipper fractal interpolation function can be inscribed within a prescribed rectangle. Convergence analysis of the proposed affine zipper fractal interpolant is carried out. It is observed that for a fixed choice of discrete scaling factors, the box counting dimension of the graph of an affine zipper fractal interpolant is independent of the choice of a signature. Several examples of affine zipper fractal interpolants are presented to supplement our theory.",

keywords = "Affine zipper fractal function, Box counting dimension, Fractal interpolation function, Integral equation, Zipper",

author = "Chand, {A. K.B.} and N. Vijender and P. Viswanathan and Tetenov, {A. V.}",

year = "2020",

month = jun,

day = "1",

doi = "10.1007/s10543-019-00774-3",

language = "English",

volume = "60",

pages = "319--344",

journal = "BIT Numerical Mathematics",

issn = "0006-3835",

publisher = "Springer Netherlands",

number = "2",

}

RIS

TY - JOUR

T1 - Affine zipper fractal interpolation functions

AU - Chand, A. K.B.

AU - Vijender, N.

AU - Viswanathan, P.

AU - Tetenov, A. V.

PY - 2020/6/1

Y1 - 2020/6/1

N2 - This paper introduces a univariate interpolation scheme using a binary parameter called signature such that the graph of the interpolant—which we refer to as affine zipper fractal interpolation function—is obtained as an attractor of a suitable affine zipper. The scaling vector function is identified so that the graph of the corresponding affine zipper fractal interpolation function can be inscribed within a prescribed rectangle. Convergence analysis of the proposed affine zipper fractal interpolant is carried out. It is observed that for a fixed choice of discrete scaling factors, the box counting dimension of the graph of an affine zipper fractal interpolant is independent of the choice of a signature. Several examples of affine zipper fractal interpolants are presented to supplement our theory.

AB - This paper introduces a univariate interpolation scheme using a binary parameter called signature such that the graph of the interpolant—which we refer to as affine zipper fractal interpolation function—is obtained as an attractor of a suitable affine zipper. The scaling vector function is identified so that the graph of the corresponding affine zipper fractal interpolation function can be inscribed within a prescribed rectangle. Convergence analysis of the proposed affine zipper fractal interpolant is carried out. It is observed that for a fixed choice of discrete scaling factors, the box counting dimension of the graph of an affine zipper fractal interpolant is independent of the choice of a signature. Several examples of affine zipper fractal interpolants are presented to supplement our theory.

KW - Affine zipper fractal function

KW - Box counting dimension

KW - Fractal interpolation function

KW - Integral equation

KW - Zipper

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UR - https://elibrary.ru/item.asp?id=43295044

U2 - 10.1007/s10543-019-00774-3

DO - 10.1007/s10543-019-00774-3

M3 - Article

AN - SCOPUS:85085961721

VL - 60

SP - 319

EP - 344

JO - BIT Numerical Mathematics

JF - BIT Numerical Mathematics

SN - 0006-3835

IS - 2

ER -

ID: 25329914