Module for Hermite polynomial interpolation

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Background for the Hermite Interpolation Polynomial. The cubic Hermite polynomial  p(x)  has the interpolative properties          and    both the function values and their derivatives are known at the endpoints of the interval  .  Hermite polynomials were studied by the French Mathematician Charles Hermite (1822-1901), and are referred to as a "clamped cubic," where "clamped" refers to the slope at the endpoints being fixed.  This situation is illustrated in the figure below.  

Example 1.  Find the cubic Hermite polynomial or "clamped cubic" that satisfies  
          

Solution 1.

More Background. The Clamped Cubic Spline.  A clamped cubic spline is obtained by forming a piecewise cubic function which passes through the given set of knots   with the condition the function values, their derivatives and second derivatives of adjacent cubics agree at the interior nodes.  The endpoint conditions are , where   are given.

Example 2.  Find the "clamped cubic spline" that satisfies  
           

Solution 2.

More Background. The Natural Cubic Spline.  A natural cubic spline is obtained by forming a piecewise cubic function which passes through the given set of knots with the condition the function values, their derivatives and second derivatives of adjacent cubics agree at the interior nodes.  The endpoint conditions are  . The natural cubic spline is said to be "a relaxed curve."

Example 3.  Find the "natural cubic spline" that satisfies  
            

Solution 3.

Old Lab Project (Hermite polynomial interpolation  Hermite polynomial interpolation).  Internet hyperlinks to an old lab project.  

Research Experience for Undergraduates

Hermite Polynomial Interpolation  Hermite Polynomial Interpolation  Internet hyperlinks to web sites and a bibliography of articles.  

Downloads (Hermite Polynomial Hermite Polynomial).  Download this Mathematica notebook.  

(c) John H. Mathews 2003