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splin2d
bicubic spline gridded 2d interpolation
Syntax
C = splin2d(x, y, z, [,spline_type])
Arguments
- x
a 1-by-nx matrix of doubles, the x coordinate of the interpolation points. We must have x(i)<x(i+1), for i=1,2,...,nx-1.
- y
a 1-by-ny matrix of doubles, the y coordinate of the interpolation points. We must have y(i)<y(i+1), for i=1,2,...,ny-1.
- z
a nx-by-ny matrix of doubles, the function values.
- spline_type
a 1-by-1 matrix of strings, the typof of spline to compute. Available values are spline_type="not_a_knot" and spline_type="periodic".
- C
the coefficients of the bicubic patches. This output argument of splin2d is the input argument of the interp2d function.
Description
This function computes a bicubic spline or sub-spline
s which interpolates the
(xi,yj,zij) points, ie, we have
s(xi,yj)=zij for all i=1,..,nx
and j=1,..,ny. The resulting spline
s is defined by the triplet
(x,y,C)
where C
is the vector (of
length 16(nx-1)(ny-1)) with the coefficients of each of the (nx-1)(ny-1)
bicubic patches : on [x(i) x(i+1)]x[y(j) y(j+1)],
s is defined by :
The evaluation of s at some points must be done
by the interp2d function. Several kind of
splines may be computed by selecting the appropriate
spline_type
parameter. The method used to compute the
bicubic spline (or sub-spline) is the old fashioned one 's, i.e. to
compute on each grid point (xi,yj) an approximation
of the first derivatives ds/dx(xi,yj) and
ds/dy(xi,yj) and of the cross derivative
d2s/dxdy(xi,yj). Those derivatives are computed by
the mean of 1d spline schemes leading to a C2 function
(s is twice continuously differentiable) or by the
mean of a local approximation scheme leading to a C1 function only. This
scheme is selected with the spline_type
parameter (see
splin for details) :
- "not_a_knot"
this is the default case.
- "periodic"
to use if the underlying function is periodic : you must have z(1,j) = z(nx,j) for all j in [1,ny] and z(i,1) = z(i,ny) for i in [1,nx] but this is not verified by the interface.
Remarks
From an accuracy point of view use essentially the not_a_knot type or periodic type if the underlying interpolated function is periodic.
The natural, monotone, fast (or fast_periodic) type may be useful in some cases, for instance to limit oscillations (monotone being the most powerful for that).
To get the coefficients of the bi-cubic patches in a more friendly
way you can use c = matrix(C, [4,4,nx-1,ny-1])
then
the coefficient (k,l) of the patch
(i,j) (see equation here before) is stored at
c(k,l,i,j)
. Nevertheless the interp2d function wait for the big vector
C
and not for the hypermatrix c
(note that one can easily retrieve C
from
c
with C=c(:)
).
Examples
// example 1 : interpolation of cos(x)cos(y) n = 7; // a regular grid with n x n interpolation points // will be used x = linspace(0,2*%pi,n); y = x; z = cos(x')*cos(y); C = splin2d(x, y, z, "periodic"); m = 50; // discretization parameter of the evaluation grid xx = linspace(0,2*%pi,m); yy = xx; [XX,YY] = ndgrid(xx,yy); zz = interp2d(XX,YY, x, y, C); emax = max(abs(zz - cos(xx')*cos(yy))); clf() plot3d(xx, yy, zz, flag=[2 4 4]) [X,Y] = ndgrid(x,y); param3d1(X,Y,list(z,-9*ones(1,n)), flag=[0 0]) str = msprintf(" with %d x %d interpolation points. ermax = %g",n,n,emax) xtitle("spline interpolation of cos(x)cos(y)"+str)
// example 2 : different interpolation functions on random data n = 6; x = linspace(0,1,n); y = x; z = rand(n,n); np = 50; xp = linspace(0,1,np); yp = xp; [XP, YP] = ndgrid(xp,yp); ZP1 = interp2d(XP, YP, x, y, splin2d(x, y, z, "not_a_knot")); ZP2 = linear_interpn(XP, YP, x, y, z); ZP3 = interp2d(XP, YP, x, y, splin2d(x, y, z, "natural")); ZP4 = interp2d(XP, YP, x, y, splin2d(x, y, z, "monotone")); gcf().color_map = jetcolormap(64); clf() subplot(2,2,1) plot3d1(xp, yp, ZP1, flag=[2 2 4]) xtitle("not_a_knot") subplot(2,2,2) plot3d1(xp, yp, ZP2, flag=[2 2 4]) xtitle("bilinear interpolation") subplot(2,2,3) plot3d1(xp, yp, ZP3, flag=[2 2 4]) xtitle("natural") subplot(2,2,4) plot3d1(xp, yp, ZP4, flag=[2 2 4]) xtitle("monotone") show_window()
// example 3 : not_a_knot spline and monotone sub-spline // on a step function a = 0; b = 1; c = 0.25; d = 0.75; // create interpolation grid n = 11; x = linspace(a,b,n); ind = find(c <= x & x <= d); z = zeros(n,n); z(ind,ind) = 1; // a step inside a square // create evaluation grid np = 220; xp = linspace(a,b, np); [XP, YP] = ndgrid(xp, xp); zp1 = interp2d(XP, YP, x, x, splin2d(x,x,z)); zp2 = interp2d(XP, YP, x, x, splin2d(x,x,z,"monotone")); // plot clf() gcf().color_map = jetcolormap(128); subplot(1,2,1) plot3d1(xp, xp, zp1, flag=[-2 6 4]) xtitle("spline (not_a_knot)") subplot(1,2,2) plot3d1(xp, xp, zp2, flag=[-2 6 4]) xtitle("subspline (monotone)")
See also
- cshep2d — bidimensional cubic shepard (scattered) interpolation
- linear_interpn — n dimensional linear interpolation
- interp2d — bicubic spline (2d) evaluation function
History
Version | Description |
5.4.0 | previously, imaginary part of input arguments were implicitly ignored. |
Report an issue | ||
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