Haar space

In approximation theory, a Haar space or Chebyshev space is a finite-dimensional subspace $V$ of ${\mathcal {C}}(X,\mathbb {K} )$ , where $X$ is a compact space and $\mathbb {K}$ either the real numbers or the complex numbers, such that for any given $f\in {\mathcal {C}}(X,\mathbb {K} )$ there is exactly one element of $V$ that approximates $f$ "best", i.e. with minimum distance to $f$ in supremum norm.^[1]

References[edit]

^ Shapiro, Harold (1971). Topics in Approximation Theory. Springer. pp. 19–22. ISBN 3-540-05376-X.

This mathematical analysis–related article is a stub. You can help Wikipedia by expanding it.

[shapiro-1] Shapiro, Harold (1971). Topics in Approximation Theory. Springer. pp. 19–22. ISBN 3-540-05376-X.

[1]