About Interpolation and Prediction Functions

Functions > Data Analysis > Interpolation and Prediction > About Interpolation and Prediction Functions

Interpolation is the process of finding intermediate values in data by fitting appropriate functions (typically polynomials) piece-wise through adjacent data points. This method contrasts with regression, in which a single function is fit, in a least-squares sense, through all data points.

Since interpolation functions must pass through all data points, they are very sensitive to spurious data. If your data is noisy, consider using a regression function instead.

• interp—Interpolation at a given point of the output of cspline, lspline, pspline, bspline, or loess

• bspline, Spline2, Binterp, DWS—B-spline interpolation with user-supplied knots

• cspline, pspline, lspline, Bicubic2D—Cubic spline interpolation in one and two dimensions, with cubic, parabolic, and linear end conditions

• linterp—Linear interpolation

• predict—Linear prediction

• polyint, polycoeff, polyinter—Polynomial interpolation

• rationalint—Rational function interpolation

• Thielecoeff, Thiele—Thiele continued fraction interpolation