On Monotone and Convex Spline Interpolation

Costantini, Paolo

doi:10.2307/2008224

Cited by 34 publications

(32 citation statements)

References 5 publications

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“…As discussed in Section 1, these examples include those introduced in [3,10] for tension methods for shape-preserving interpolation.…”

Section: Condition (H N+2mentioning

confidence: 99%

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Blossoming beyond Extended Chebyshev Spaces

Goodman¹,

Mazure²

2001

Journal of Approximation Theory

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In a previous series of papers a theory of blossoming was developed for spaces of functions on an interval I spanned by the constant functions and functions 8 1 , ..., 8 n , where 8$ 1 , ..., 8$ n span an extended Chebyshev space. This theory was then used to construct a generalisation of the Bernstein basis and the de Casteljau algorithm. Also considered were functions defined to be piecewise in such spaces, leading to generalisations of B-splines and the de Boor algorithm. Here we relax the condition that 8$ 1 , ..., 8$ n span an extended Chebyshev space, while retaining all the nice properties of the earlier theory. This allows us to include a large variety of new spaces, including spaces of polynomials which have been found to be successful for tension methods for shape-preserving interpolation. Academic Press

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“…As discussed in Section 1, these examples include those introduced in [3,10] for tension methods for shape-preserving interpolation.…”

Section: Condition (H N+2mentioning

confidence: 99%

“…A different type of generalisation of P n was considered first by Costantini in [3], then by Kaklis and Pandelis in [10]. Motivated by tension methods for shape-preserving interpolation, they considered the space spanned by the functions [1, x, x 2+m , (1&x) 2+m ] on [0, 1], where m is any positive integer.…”

Section: Introductionmentioning

confidence: 99%

Blossoming beyond Extended Chebyshev Spaces

Goodman¹,

Mazure²

2001

Journal of Approximation Theory

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“…In contrast, the schemes 5, 6 achieve the required shape of data by inserting extra knots in the interval where the functions lose convexity. (iv) The present scheme is tested through several numerical examples and it is found to be local in comparison with global schemes 9 , time saving and computational economical due to second degree of denominator in rational function in comparison the function 3 has cubic denominator and produces smooth and visually pleasing surfaces than existing schemes 4 .…”

Section: Introductionmentioning

confidence: 91%

“…In contrast, firstly, a piecewise cubic Bernstein-Bézier polynomial function 5 , quadratic spline interpolation 6 , a piecewise quadratic polynomial 7 , and cubic Hermite interpolation 8 have been used to solve the problem of interpolating monotone and convex data in the sense of monotonicity and convexity preserving schemes which were very economical but the methods generally inserted extra knots in the interval to visualize and conserve the shape of data. Secondly, Costantini 9 developed a global scheme for preservation of convex surfaces on rectangular grid. The scheme 10 has some research gaps like the degree of interpolant in some rectangular patches which was too large, and the resulting surfaces were not visually pleasing and smooth.…”

Section: Introductionmentioning

confidence: 99%

Convex data modelling using rational bi-cubic spline function

Abbas

Majid²,

Awang³

et al. 2014

ScienceAsia

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A piecewise rational cubic function in the form of a cubic/quadratic has been extended to a rational bicubic blended function to visualize 3D convex data. It involves twelve shape parameters in each rectangular mesh for its representation. Simple data-dependent constraints are imposed on four shape parameters to conserve convexity of convex data. The remaining shape parameters are left up to the user for modification of convex surfaces. Several numerical examples are presented to show the visually pleasing convexity preserving surfaces as compared to existing interpolants.

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“…There exists a lot of literature on shape-preserving (mostly cubic) spline interpolation. However, methods for constructing monotone polynomials that interpolate monotone points are rather complicated (e.g., Costantini [1986]). Thus we have decided to use a rather simple technique and only check the monotonicity at the points F −1 a (t i ) that we already use in (7) for estimating the u-error.…”

mentioning

confidence: 99%

Random variate generation by numerical inversion when only the density is known

Derflinger

Hörmann²,

Leydold

2010

ACM Trans. Model. Comput. Simul.

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We present a numerical inversion method for generating random variates from continuous distributions when only the density function is given. The algorithm is based on polynomial interpolation of the inverse CDF and Gauss-Lobatto integration. The user can select the required precision which may be close to machine precision for smooth, bounded densities; the necessary tables have moderate size. Our computational experiments with the classical standard distributions (normal, beta, gamma, t-distributions) and with the noncentral chi-square, hyperbolic, generalized hyperbolic and stable distributions showed that our algorithm always reaches the required precision. The setup time is moderate and the marginal execution time is very fast and nearly the same for all distributions. Thus for the case that large samples with fixed parameters are required the proposed algorithm is the fastest inversion method known. Speed-up factors up to 1000 are obtained when compared to inversion algorithms developed for the specific distributions. This makes our algorithm especially attractive for the simulation of copulas and for quasi-Monte Carlo applications.

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On Monotone and Convex Spline Interpolation

Cited by 34 publications

References 5 publications

Blossoming beyond Extended Chebyshev Spaces

Blossoming beyond Extended Chebyshev Spaces

Convex data modelling using rational bi-cubic spline function

Random variate generation by numerical inversion when only the density is known

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