interp1

Arguments

x

vector of at least 2 real numbers: Abscissas of known interpolation nodes, without duplicates. By default,

• if y is a vector: x=1:length(y).
• if y is a matrix or an hypermatrix: x=1:size(y,1).

y

vector, matrix or hypermatrix of real or complex numbers: values at known interpolation nodes, at the corresponding x abscissas.

• if y is a vector, x and y must have the same length.
• if y is a matrix or an hypermatrix, we must have length(x)==size(y,1). Each column of y is then interpolated versus the same x abscissas, for the given xp.

xp

scalar, vector, matrix or hypermatrix or decimal numbers: abscissas of points whose values yp must be computed according to data of interpolation nodes.

yp

vector, matrix, or hypermatrix of numbers: interpolated y values at the given xp.

• if y is a vector: yp has the size of xp.

• if y is a matrix or an hypermatrix:
  • if xp is a scalar or a vector: size(yp) is [length(xp) size(y)(2:$)]
  • if xp is a matrix or an hypermatrix: size(yp) is [size(xp) size(y)(2:$)]

method

string defining the interpolation method. Possible values and processing are:

"linear":	linear interpolation between consecutive nodes, used by default.
"spline":	interpolation by cubic splines
"nearest":	for each value xp(j), yp(j) takes the value or y(i) corresponding to x(i) the nearest neighbor of xp(j)

extrapolation

string or number defining the yp(j) components for xp(j) values outside the [x(1)=min(x),x($)=max(x)] interval. We suppose here-below that x and y have already been sorted accordingly.

"extrap":	interp1(x,y,xp, method, "extrap") is equivalent to interp1(x,y,xp, method, method).
"linear":	Can be used with the "spline" (and obviously "linear") interpolation methods.
"periodic":	This extrapolation type can be used with the "linear" or "spline" interpolation methods. Then: if y is a vector, y(1)==y($) is required ; otherwise y(1,:)==y($,:) is required.
"edgevalue":	Then yp(i)=y(1) for every xp(i)<x(1), and yp(i)=y($) for every xp(i)>x($).
padding:	padding is a decimal or complex number used to set yp(i)=padding for every xp(i) ∉ [min(x),max(x)]. Example: yi=interp1(x,y,xp,method, 0).
(none):	By default, the extrapolation is performed by splines when splines are used for the interpolation, and by padding with %nan when the interpolation is linear or by "nearest" node.

Description

Given (x,y,xp), this function computes the yp components corresponding to xp by the interpolation between known data provided by (x,y) nodes.

x is priorly sorted in ascending order, and y values or per column are then sorted accordingly.

Interpolation of complex values: When y is complex, its real and imaginary parts are interpolated separately, and then added to build the complex yp.

interp1(x,y,xp,"nearest"): For any xp at the middle of an [x(i),x(i+1)] interval, the upper bound x(i+1) is considered as the nearest x value, and yp=y(i+1) is assigned.

Examples

x = linspace(0, 10, 11)';
y = sin(x);
xx = linspace(0,10,1000)';
yy2 = interp1(x, y, xx, 'linear');
yy1 = interp1(x, y, xx, 'nearest');
yy3 = interp1(x, y, xx, 'spline');
clf
h = plot(xx, [yy1 yy2 yy3], x, y, '.')
h(1).mark_size = 8;
title "Interpolation of a poorly sampled sin() function" fontsize 3
legend(['nearest','linear','spline','nodes'], "in_lower_left");

See also

• interp — 3次スプライン評価関数
• splin — 3次スプライン補間
• linear_interpn — n 次元線形補間

History