Spline Curves

Figure 5.2: Fitting with different degrees of the polynomial.

• There are times when fitting an interpolating polynomial to data points is very difficult.
• Figure 5.2a is plot of $f(x)=cos^{10}(x)$ on the interval $[-2, 2]$.
• It is a nice, smooth curve but has a pronounced maximum at $x=0$ and is near to the $x$-axis for $\vert x\vert > 1$.
• The curves of Figure 5.2b,c, d, and e are for polynomials of degrees $-2, -4, -6,$ and $-8$ that match the function at evenly spaced points.
• None of the polynomials is a good representation of the function.

Figure 5.3: Fitting with quadratic in subinterval.

• One might think that a solution to the problem would be to break up the interval $[-2, 2]$ into subintervals
• and fit separate polynomials to the function in these smaller intervals.
• Figure 5.3 shows a much better fit if we use a quadratic between $x=-0.65$ and $x=0.65$, with $P(x)=0$ outside that interval.
• That is better but there are discontinuities in the slope where the separate polynomials join.
• This solution is known as spline curves.

• Suppose that we have a set of $n + 1$ points (which do not have to be evenly spaced):
  $$(x_i,y_i), with i=0,1,2,\ldots,n.$$

• A spline fits a set of $n^{th}$-degree polynomials, $g_i(x)$, between each pair of points, from $x_i$ to $x_{i+1}$.
• The points at which the splines join are called knots.

  Figure 5.4: Linear spline.

  
• If the polynomials are all of degree-1, we have a linear spline and the curve would appear as in the Fig. 5.4.
• The slopes are discontinuous where the segments join.