fBasics (version 3011.87)

hilbert: Hilbert Matrix

Description

Creates a Hilbert matrix.

Usage

hilbert(n)

Arguments

n
an integer value, the dimension of the square matrix.

Value

hilbert generates a Hilbert matrix of order n.

Details

In linear algebra, a Hilbert matrix is a matrix with the unit fraction elements. The Hilbert matrices are canonical examples of ill-conditioned matrices, making them notoriously difficult to use in numerical computation. For example, the 2-norm condition number of a 5x5 Hilbert matrix above is about 4.8e5. The Hilbert matrix is symmetric and positive definite.

References

Hilbert D., Collected papers, vol. II, article 21. Beckermann B, (2000); The condition number of real Vandermonde, Krylov and positive definite Hankel matrices, Numerische Mathematik 85, 553--577, 2000. Choi, M.D., (1983); Tricks or Treats with the Hilbert Matrix, American Mathematical Monthly 90, 301--312, 1983. Todd, J., (1954); The Condition Number of the Finite Segment of the Hilbert Matrix, National Bureau of Standards, Applied Mathematics Series 39, 109--116. Wilf, H.S., (1970); Finite Sections of Some Classical Inequalities, Heidelberg, Springer.

Examples

Run this code
## Create a Hilbert Matrix:
   H = hilbert(5)
   H                              

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