[PDF] Devoir surveillé n 6 CORRECTION Probl`eme - Polynôme et Hermite

What is Hermite interpolation used for?

Hermite interpolation. In numerical analysis, Hermite interpolation, named after Charles Hermite, is a method of interpolating data points as a polynomial function. The generated Hermite interpolating polynomial is closely related to the Newton polynomial, in that both are derived from the calculation of divided differences.

What is the difference between Lagrange and Hermitian interpolation?

Lagrange interpolation is a special case of Hermite interpolation. In Lagrange interpolation, you obtain shape functions by fitting a curve for the field variables of a problem without concerning its derivatives. Generate the simplest Hermitian interpolation function, , that is linear, one-dimensional, and has only two nodal points.

How do you find the Hermite polynomial?

Hermite Polynomial: Divided-Difference Form The Hermite polynomial is then given by H2n+1(x) = f[z0]+ 2Xn+1 k=1 f[z0,...,zk](x ?z0)(x ?z1)···(x ?zk?1) A proof of this fact can be found in [Pow], p. 56. Numerical Analysis (Chapter 3) Hermite Interpolation II R L Burden & J D Faires 8 / 22 Divided Difference Form Example Algorithm Outline

What is the alternative method for generating Hermite approximations?

Introduction There is an alternative method for generating Hermite approximations that has as its basis the Newton interpolatory divided-difference formula at x0,x1,...,xn, that is, Pn(x) = f[x0]+ Xn k=1 f[x0,x1,...,xk](x ?x0)···(x ?xk?1). The alternative method uses the connection between the nth divided difference and the nth derivative of f.