| Interface | Description |
|---|---|
| CubicHermite.Tangent |
The method for computing the control tangent at a given index.
|
| Interpolation |
Interpolation is a method of constructing new data points within the range of a discrete set of
known data points.
|
| Class | Description |
|---|---|
| CubicHermite |
Cubic Hermite spline interpolation is a piecewise spline interpolation, in which each polynomial
is in Hermite form which consists of two control points and two control tangents.
|
| CubicSpline |
The cubic spline interpolation fits a cubic polynomial between each pair of
adjacent points such that adjacent cubics are continuous in their first and
second derivatives.
|
| DividedDifferences |
Divided differences is recursive division process for calculating the coefficients in the
interpolation polynomial in the Newton form.
|
| LinearInterpolation |
(Piecewise-)Linear interpolation fits a curve by interpolating linearly between two adjacent
data-points.
|
| NewtonPolynomial |
Newton polynomial is the interpolation polynomial for a given set of data points in the Newton
form.
|
| Enum | Description |
|---|---|
| CubicHermite.Tangents |
Copyright © 2010-2020 NM FinTech Ltd.. All Rights Reserved.