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Cubic spline interpolation

`pp=csapi(x,y) `

values = csapi(x,y,xx)

`pp=csapi(x,y) `

returns the
ppform of a cubic spline * s* with knot sequence

`x`

that
takes the value `y(:,j)`

at `x(j)`

for `j=1:length(x)`

.
The values `y(:,j) `

can be scalars, vectors, matrices,
even ND-arrays. Data points with the same data site are averaged and
then sorted by their sites. With `x`

the resulting
sorted data sites, the spline `s`

satisfies the not-a-knot
end conditions, namely `jump`

`jump`

If` x`

is a cell array, containing sequences `x1`

,
..., `xm`

, of lengths `n1`

, ..., `nm`

respectively,
then `y`

is expected to be an array, of size `[n1,...,nm]`

(or
of size `[d,n1,...,nm]`

if the interpolant is to
be `d`

-valued). In that case, `pp`

is
the ppform of an `m`

-cubic spline interpolant * s* to
such data. In particular, now

You can use the structure pp, in `fnval`

, `fnder`

, `fnplt`

,
etc, to evaluate, differentiate, plot, etc, this interpolating cubic
spline.

`values = csapi(x,y,xx) `

is the same as `fnval(csapi(x,y),xx)`

, i.e., the
values of the interpolating cubic spline at the sites specified by `xx`

are
returned.

This command is essentially the MATLAB^{®} function `spline`

, which, in turn, is a stripped-down
version of the Fortran routine `CUBSPL`

in *PGS*,
except that `csapi`

(and now also `spline`

)
accepts vector-valued data and can handle gridded data.

See the example "Spline Interpolation" for various examples.

Up to rounding errors, and assuming that `x`

is
a vector with at least four entries, the statement `pp = csapi(x,y)`

should
put the same spline into `pp`

as does the statement

pp = fn2fm(spapi(augknt(x([1 3:(end-2) end]),4),x,y),'pp');

except that the description of the spline obtained this second
way will use no break at `x(2)`

and `x(n-1)`

.

Here is a simple bivariate example, a bicubic spline interpolant to the Mexican Hat function being plotted:

x =.0001+[-4:.2:4]; y = -3:.2:3; [yy,xx] = meshgrid(y,x); r = pi*sqrt(xx.^2+yy.^2); z = sin(r)./r; bcs = csapi( {x,y}, z ); fnplt( bcs ), axis([-5 5 -5 5 -.5 1])

Note the reversal of `x `

and `y`

in
the call to `meshgrid`

, needed because MATLAB likes to
think of the entry `z(i,j)`

as the value at (`x(j)`

,`y(i)`

)
while this toolbox follows the Approximation Theory standard of thinking
of `z(i,j)`

as the value at (`x(i)`

,`y(j)`

).
Similar caution has to be exerted when values of such a bivariate
spline are to be plotted with the aid of the MATLAB `mesh`

function,
as is shown here (note the use of the transpose of the matrix of values
obtained from `fnval`

).

xf = linspace(x(1),x(end),41); yf = linspace(y(1),y(end),41); mesh(xf, yf, fnval( bcs, {xf, yf}).')

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