SPLINTERP function

Syntax: mout = SPLINTERP(x,y,n)

The SPLINTERP function interpolates the data contained in vector x, the independent variable, and vector y, the dependent variable. There are no restrictions on x, it doesn't even need to be increasing. The number of interpolant locations is given in scalar n, which must be greater than 1. The output of the SPLINTERP function is a matrix with n rows and 2 columns. The first column will contain the output locations and the second column the interpolated values.

Method

The points are first parameterized in terms of normalized arc length. The normalized length of x is the real length divided by the range of x, that is, the maximum value minus the minimum value. The arclength at a point is approximated by the sum of the lengths of straight line segments connecting all points up to that point. A spline under tension is calculated for x versus arc length and y versus arc length. The x and y values are interpolated separately and then combined to form the output interpolant.

Tension

The interpolant is calculated by the method of cubic splines under tension. The tension factor corresponds to the curviness, and must be greater than zero. If it is close to zero, each interpolated function is almost a cubic spline and the resulting curve is quite loose. If the tension is large, then the resultant is almost linear. The tension used is the current value of TENSION, which may be changed with the SET TENSION command.

  Fritch-Carlson interpolation
  2D interpolation