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Octave comes with good support for various kinds of interpolation,
most of which are described in Interpolation. One simple alternative
to the functions described in the aforementioned chapter, is to fit
a single polynomial to some given data points. To avoid a highly
fluctuating polynomial, one most often wants to fit a low-order polynomial
to data. This usually means that it is necessary to fit the polynomial
in a least-squares sense, which is what the polyfit function does.
Return the coefficients of a polynomial p(x) of degree n that minimizes to best fit the data in the least squares sense.
The polynomial coefficients are returned in a row vector.
If two output arguments are requested, the second is a structure containing the following fields:
RThe Cholesky factor of the Vandermonde matrix used to compute the polynomial coefficients.
XThe Vandermonde matrix used to compute the polynomial coefficients.
dfThe degrees of freedom.
normrThe norm of the residuals.
yfThe values of the polynomial for each value of x.
In situations where a single polynomial isn't good enough, a solution
is to use several polynomials pieced together. The function mkpp
creates a piece-wise polynomial, ppval evaluates the function
created by mkpp, and unmkpp returns detailed information
about the function.
The following example shows how to combine two linear functions and a quadratic into one function. Each of these functions is expressed on adjoined intervals.
x = [-2, -1, 1, 2];
p = [ 0, 1, 0;
1, -2, 1;
0, -1, 1 ];
pp = mkpp(x, p);
xi = linspace(-2, 2, 50);
yi = ppval(pp, xi);
plot(xi, yi);
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Evaluate piece-wise polynomial pp at the points xi.
If pp.d is a scalar greater than 1, or an array,
then the returned value yi will be an array that is
d1, d1, …, dk, length (xi)].
See also: mkpp, unmkpp, spline.
Construct a piece-wise polynomial structure from sample points
x and coefficients p. The ith row of p,
p (i,:), contains the coefficients for the polynomial
over the i-th interval, ordered from highest to
lowest. There must be one row for each interval in x, so
rows (p) == length (x) - 1.
You can concatenate multiple polynomials of the same order over the
same set of intervals using p = [ p1; p2;
…; pd ]. In this case, rows (p) == d
* (length (x) - 1).
d specifies the shape of the matrix p for all except the
last dimension. If d is not specified it will be computed as
round (rows (p) / (length (x) - 1)) instead.
See also: unmkpp, ppval, spline.
Extract the components of a piece-wise polynomial structure pp. These are as follows:
Samples points.
Polynomial coefficients for points in sample interval. p
(i, :) contains the coefficients for the polynomial over
interval i ordered from highest to lowest. If d >
1, p (r, i, :) contains the coefficients for
the r-th polynomial defined on interval i. However, this is
stored as a 2-D array such that c = reshape (p (:,
j), n, d) gives c (i, r)
is the j-th coefficient of the r-th polynomial over the i-th interval.
Number of polynomial pieces.
Order of the polynomial plus 1.
Number of polynomials defined for each interval.
See also: mkpp, ppval, spline.
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