math::interpolate(3tcl) | Tcl Math Library | math::interpolate(3tcl) |

# NAME¶

math::interpolate - Interpolation routines# SYNOPSIS¶

package require**Tcl ?8.4?**

package require **struct **

package require **math::interpolate ?1.1?**

**::math::interpolate::defineTable** *name*
*colnames* *values*

**::math::interpolate::interp-1d-table** *name*
*xval*

**::math::interpolate::interp-table** *name* *xval*
*yval*

**::math::interpolate::interp-linear** *xyvalues*
*xval*

**::math::interpolate::interp-lagrange** *xyvalues*
*xval*

**::math::interpolate::prepare-cubic-splines** *xcoord*
*ycoord*

**::math::interpolate::interp-cubic-splines** *coeffs*
*x*

**::math::interpolate::interp-spatial** *xyvalues*
*coord*

**::math::interpolate::interp-spatial-params**
*max_search* *power*

**::math::interpolate::neville** *xlist* *ylist*
*x*

# DESCRIPTION¶

This package implements several interpolation algorithms:- Interpolation into a table (one or two independent variables), this is useful for example, if the data are static, like with tables of statistical functions.
- Linear interpolation into a given set of data (organised as (x,y) pairs).
- Lagrange interpolation. This is mainly of theoretical interest, because
there is no guarantee about error bounds. One possible use: if you need a
line or a parabola through given points (it will calculate the values, but
not return the coefficients).
A variation is Neville's method which has better behaviour and error bounds.

- Spatial interpolation using a straightforward distance-weight method. This procedure allows any number of spatial dimensions and any number of dependent variables.
- Interpolation in one dimension using cubic splines.

This document describes the procedures and explains their usage.

# INCOMPATIBILITY WITH VERSION 1.0.3¶

The interpretation of the tables in the**::math::interpolate::interpolate-1d-table**command has been changed to be compatible with the interpretation for 2D interpolation in the

**::math::interpolate::interpolate-table**command. As a consequence this version is incompatible with the previous versions of the command (1.0.x).

# PROCEDURES¶

The interpolation package defines the following public procedures:**::math::interpolate::defineTable***name**colnames**values*- Define a table with one or two independent variables (the distinction is
implicit in the data). The procedure returns the name of the table - this
name is used whenever you want to interpolate the values.
*Note:*this procedure is a convenient wrapper for the struct::matrix procedure. Therefore you can access the data at any location in your program.

- string
*name*(in) - Name of the table to be created
- list
*colnames*(in) - List of column names
- list
*values*(in) - List of values (the number of elements should be a multiple of the number
of columns. See
**EXAMPLES**for more information on the interpretation of the data.The values must be sorted with respect to the independent variable(s).

**::math::interpolate::interp-1d-table***name**xval*- Interpolate into the one-dimensional table "name" and return a list of values, one for each dependent column.

- string
*name*(in) - Name of an existing table
- float
*xval*(in) - Value of the independent
*row*variable

**::math::interpolate::interp-table***name**xval**yval*- Interpolate into the two-dimensional table "name" and return the interpolated value.

- string
*name*(in) - Name of an existing table
- float
*xval*(in) - Value of the independent
*row*variable - float
*yval*(in) - Value of the independent
*column*variable

**::math::interpolate::interp-linear***xyvalues**xval*- Interpolate linearly into the list of x,y pairs and return the interpolated value.

- list
*xyvalues*(in) - List of pairs of (x,y) values, sorted to increasing x. They are used as the breakpoints of a piecewise linear function.
- float
*xval*(in) - Value of the independent variable for which the value of y must be computed.

**::math::interpolate::interp-lagrange***xyvalues**xval*- Use the list of x,y pairs to construct the unique polynomial of lowest degree that passes through all points and return the interpolated value.

- list
*xyvalues*(in) - List of pairs of (x,y) values
- float
*xval*(in) - Value of the independent variable for which the value of y must be computed.

**::math::interpolate::prepare-cubic-splines***xcoord**ycoord*- Returns a list of coefficients for the second routine
*interp-cubic-splines*to actually interpolate.

- list
*xcoord* - List of x-coordinates for the value of the function to be interpolated is known. The coordinates must be strictly ascending. At least three points are required.
- list
*ycoord* - List of y-coordinates (the values of the function at the given x-coordinates).

**::math::interpolate::interp-cubic-splines***coeffs**x*- Returns the interpolated value at coordinate x. The coefficients are
computed by the procedure
*prepare-cubic-splines*.

- list
*coeffs* - List of coefficients as returned by prepare-cubic-splines
- float
*x* - x-coordinate at which to estimate the function. Must be between the first and last x-coordinate for which values were given.

**::math::interpolate::interp-spatial***xyvalues**coord*- Use a straightforward interpolation method with weights as function of the
inverse distance to interpolate in 2D and N-dimensional space
The list xyvalues is a list of lists:

{ {x1 y1 z1 {v11 v12 v13 v14}} {x2 y2 z2 {v21 v22 v23 v24}} ... }

- The last element of each inner list is either a single number or a list in
itself. In the latter case the return value is a list with the same number
of elements.
The method is influenced by the search radius and the power of the inverse distance

- list
*xyvalues*(in) - List of lists, each sublist being a list of coordinates and of dependent values.
- list
*coord*(in) - List of coordinates for which the values must be calculated

**::math::interpolate::interp-spatial-params***max_search**power*- Set the parameters for spatial interpolation

- float
*max_search*(in) - Search radius (data points further than this are ignored)
- integer
*power*(in) - Power for the distance (either 1 or 2; defaults to 2)

**::math::interpolate::neville***xlist**ylist**x*- Interpolates between the tabulated values of a function whose abscissae
are
*xlist*and whose ordinates are*ylist*to produce an estimate for the value of the function at*x*. The result is a two-element list; the first element is the function's estimated value, and the second is an estimate of the absolute error of the result. Neville's algorithm for polynomial interpolation is used. Note that a large table of values will use an interpolating polynomial of high degree, which is likely to result in numerical instabilities; one is better off using only a few tabulated values near the desired abscissa.

# EXAMPLES¶

*Example of using one-dimensional tables:*

Suppose you have several tabulated functions of one variable:

x y1 y2 0.0 0.0 0.0 1.0 1.0 1.0 2.0 4.0 8.0 3.0 9.0 27.0 4.0 16.0 64.0

set table [::math::interpolate::defineTable table1 {x y1 y2} { - 1 2 0.0 0.0 0.0 1.0 1.0 1.0 2.0 4.0 8.0 3.0 9.0 27.0 4.0 16.0 64.0}] foreach x {0.5 1.5 2.5 3.5} { puts "$x: [::math::interpolate::interp-1d-table $table $x]" }

*Example of using the cubic splines:*

Suppose the following values are given:

x y 0.1 1.0 0.3 2.1 0.4 2.2 0.8 4.11 1.0 4.12

set coeffs [::math::interpolate::prepare-cubic-splines {0.1 0.3 0.4 0.8 1.0} {1.0 2.1 2.2 4.11 4.12}] foreach x {0.1 0.2 0.3 0.4 0.5 0.6 0.7 0.8 0.9 1.0} { puts "$x: [::math::interpolate::interp-cubic-splines $coeffs $x]" }

0.1: 1.0 0.2: 1.68044117647 0.3: 2.1 0.4: 2.2 0.5: 3.11221507353 0.6: 4.25242647059 0.7: 5.41804227941 0.8: 4.11 0.9: 3.95675857843 1.0: 4.12

# BUGS, IDEAS, FEEDBACK¶

This document, and the package it describes, will undoubtedly contain bugs and other problems. Please report such in the category*math :: interpolate*of the

*Tcllib Trackers*[http://core.tcl.tk/tcllib/reportlist]. Please also report any ideas for enhancements you may have for either package and/or documentation.

# KEYWORDS¶

interpolation, math, spatial interpolation# CATEGORY¶

Mathematics# COPYRIGHT¶

Copyright (c) 2004 Arjen Markus <arjenmarkus@users.sourceforge.net> Copyright (c) 2004 Kevn B. Kenny <kennykb@users.sourceforge.net>

1.1 | tcllib |