594 lines
20 KiB
Matlab
594 lines
20 KiB
Matlab
function zi = interp2_mine(varargin)
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%INTERP2 2-D interpolation (table lookup).
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% ZI = INTERP2(X,Y,Z,XI,YI) interpolates to find ZI, the values of the
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% underlying 2-D function Z at the points in matrices XI and YI.
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% Matrices X and Y specify the points at which the data Z is given.
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%
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% XI can be a row vector, in which case it specifies a matrix with
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% constant columns. Similarly, YI can be a column vector and it
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% specifies a matrix with constant rows.
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%
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% ZI = INTERP2(Z,XI,YI) assumes X=1:N and Y=1:M where [M,N]=SIZE(Z).
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% ZI = INTERP2(Z,NTIMES) expands Z by interleaving interpolates between
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% every element, working recursively for NTIMES. INTERP2(Z) is the
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% same as INTERP2(Z,1).
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%
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% ZI = INTERP2(...,METHOD) specifies alternate methods. The default
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% is linear interpolation. Available methods are:
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%
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% 'nearest' - nearest neighbor interpolation
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% 'linear' - bilinear interpolation
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% 'spline' - spline interpolation
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% 'cubic' - bicubic interpolation as long as the data is
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% uniformly spaced, otherwise the same as 'spline'
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%
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% For faster interpolation when X and Y are equally spaced and monotonic,
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% use the syntax ZI = INTERP2(...,*METHOD).
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%
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% ZI = INTERP2(...,METHOD,EXTRAPVAL) specificies a method and a scalar
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% value for ZI outside of the domain created by X and Y. Thus, ZI will
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% equal EXTRAPVAL for any value of YI or XI which is not spanned by Y
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% or X respectively. A method must be specified for EXTRAPVAL to be used,
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% the default method is 'linear'.
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%
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% All the interpolation methods require that X and Y be monotonic and
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% plaid (as if they were created using MESHGRID). If you provide two
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% monotonic vectors, interp2 changes them to a plaid internally.
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% X and Y can be non-uniformly spaced.
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%
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% For example, to generate a coarse approximation of PEAKS and
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% interpolate over a finer mesh:
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% [x,y,z] = peaks(10); [xi,yi] = meshgrid(-3:.1:3,-3:.1:3);
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% zi = interp2(x,y,z,xi,yi); mesh(xi,yi,zi)
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%
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% Class support for inputs X, Y, Z, XI, YI:
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% float: double, single
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%
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% See also INTERP1, INTERP3, INTERPN, MESHGRID, TriScatteredInterp.
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% Copyright 1984-2011 The MathWorks, Inc.
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% $Revision: 5.33.4.24 $ $Date: 2011/05/17 02:32:27 $
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error(nargchk(1,7,nargin,'struct')); % allowing for an ExtrapVal
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bypass = false;
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uniform = true;
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if (nargin > 1)
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if nargin == 7 && ~isnumeric(varargin{end})
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error(message('MATLAB:interp2:extrapvalNotNumeric'));
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end
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if ischar(varargin{end})
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narg = nargin-1;
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method = [varargin{end} ' ']; % Protect against short string.
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if strncmpi(method,'s',1) || strncmpi(method, '*s', 2)
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ExtrapVal = 'extrap'; % Splines can extrapolate
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else
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ExtrapVal = nan; % setting default ExtrapVal as NAN
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end
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index = 1; %subtract off the elements not in method
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elseif ischar(varargin{end-1}) && isnumeric(varargin{end})
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narg = nargin-2;
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method = [ varargin{end-1} ' '];
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ExtrapVal = varargin{end}; % user specified ExtrapVal
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index = 2; % subtract off the elements not in method and ExtrapVal
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else
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narg = nargin;
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method = 'linear';
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ExtrapVal = nan; % protecting default
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index = 0;
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end
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if strncmpi(method,'*',1) % Direct call bypass.
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if (narg ==5 || narg ==3)
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xitemp = varargin{end-index - 1};
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yitemp = varargin{end-index};
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if isrow(xitemp) && iscolumn(yitemp)
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varargin{end-index - 1} = repmat(xitemp, [size(yitemp,1), 1]);
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varargin{end-index} = repmat(yitemp, [1, size(xitemp,2)]);
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elseif iscolumn(xitemp) && isrow(yitemp)
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varargin{end-index - 1} = repmat(xitemp', [size(yitemp, 2), 1]);
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varargin{end-index} = repmat(yitemp', [1, size(xitemp,1)]);
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end
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end
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if strcmpi(method(2),'l') || strcmpi(method(2:4),'bil')
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% bilinear interpolation.
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zi = linear(ExtrapVal, varargin{1:end-index});
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return
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elseif strcmpi(method(2),'c') || strcmpi(method(2:4),'bic')
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% bicubic interpolation
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zi = cubic(ExtrapVal, varargin{1:end-index});
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return
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elseif strcmpi(method(2),'n')
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% Nearest neighbor interpolation
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zi = nearest(ExtrapVal, varargin{1:end-index});
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return
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elseif strcmpi(method(2),'s')
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% spline interpolation
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method = 'spline'; bypass = true;
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else
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error(message('MATLAB:interp2:InvalidMethod', deblank( method )));
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end
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elseif strncmpi(method,'s',1), % Spline interpolation
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method = 'spline'; bypass = true;
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end
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else
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narg = nargin;
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method = 'linear';
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ExtrapVal = nan; % default ExtrapVal is NaN
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end
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% if narg==1, % interp2(z), % Expand Z
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% [nrows,ncols] = size(varargin{1});
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% xi = 1:.5:ncols; yi = (1:.5:nrows)';
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% x = 1:ncols; y = 1:nrows;
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% [msg,x,y,z,xi,yi] = xyzchk(x,y,varargin{1},xi,yi);
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%
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% elseif narg==2. % interp2(z,n), Expand Z n times
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% [nrows,ncols] = size(varargin{1});
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% ntimes = floor(varargin{2}(1));
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% xi = 1:1/(2^ntimes):ncols; yi = (1:1/(2^ntimes):nrows)';
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% x = 1:ncols; y = 1:nrows;
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% [msg,x,y,z,xi,yi] = xyzchk(x,y,varargin{1},xi,yi);
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%
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% elseif narg==3, % interp2(z,xi,yi)
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% [nrows,ncols] = size(varargin{1});
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% x = 1:ncols; y = 1:nrows;
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% [msg,x,y,z,xi,yi] = xyzchk(x,y,varargin{1:3});
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%
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% elseif narg==4,
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% error(message('MATLAB:interp2:nargin'));
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% elseif narg==5, % linear(x,y,z,xi,yi)
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% [msg,x,y,z,xi,yi] = xyzchk(varargin{1:5});
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%
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% end
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x = varargin{1};
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y = varargin{2};
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z = varargin{3};
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xi = varargin{4};
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yi = varargin{5};
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% if ~isempty(msg)
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% error(message(msg.identifier));
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% end
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%
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% Check for plaid data.
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%
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xx = x(1,:); yy = y(:,1);
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% if (size(x,2)>1 && ~isequal(repmat(xx,size(x,1),1),x)) || ...
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% (size(y,1)>1 && ~isequal(repmat(yy,1,size(y,2)),y)),
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% error(message('MATLAB:interp2:meshgrid'));
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% end
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%
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% Check for non-equally spaced data. If so, map (x,y) and
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% (xi,yi) to matrix (row,col) coordinate system.
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%
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if ~bypass,
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xx = xx.'; % Make sure it's a column.
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dx = diff(xx); dy = diff(yy);
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xdiff = max(abs(diff(dx))); if isempty(xdiff), xdiff = 0; end
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ydiff = max(abs(diff(dy))); if isempty(ydiff), ydiff = 0; end
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if (xdiff > eps(class(xx))*max(abs(xx))) || (ydiff > eps(class(yy))*max(abs(yy)))
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if any(dx < 0), % Flip orientation of data so x is increasing.
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x = fliplr(x); y = fliplr(y); z = fliplr(z);
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xx = flipud(xx); dx = -flipud(dx);
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end
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if any(dy < 0), % Flip orientation of data so y is increasing.
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x = flipud(x); y = flipud(y); z = flipud(z);
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yy = flipud(yy); dy = -flipud(dy);
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end
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if any(dx<=0) || any(dy<=0),
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error(message('MATLAB:interp2:XorYNotMonotonic'));
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end
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% Bypass mapping code for cubic
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if ~strncmp(method(1),'c',1)
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% Determine the nearest location of xi in x
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[xxi,j] = sort(xi(:));
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[~,i] = sort([xx;xxi]);
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ui(i) = 1:length(i);
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ui = (ui(length(xx)+1:end)-(1:length(xxi)))';
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ui(j) = ui;
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% Map values in xi to index offset (ui) via linear interpolation
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ui(ui<1) = 1;
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ui(ui>length(xx)-1) = length(xx)-1;
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ui = ui + (xi(:)-xx(ui))./(xx(ui+1)-xx(ui));
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% Determine the nearest location of yi in y
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[yyi,j] = sort(yi(:));
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[~,i] = sort([yy;yyi(:)]);
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vi(i) = 1:length(i);
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vi = (vi(length(yy)+1:end)-(1:length(yyi)))';
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vi(j) = vi;
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% Map values in yi to index offset (vi) via linear interpolation
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vi(vi<1) = 1;
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vi(vi>length(yy)-1) = length(yy)-1;
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vi = vi + (yi(:)-yy(vi))./(yy(vi+1)-yy(vi));
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[x,y] = meshgrid(ones(class(x)):size(x,2),ones(class(y)):size(y,1));
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xi(:) = ui; yi(:) = vi;
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else
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uniform = false;
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end
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end
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end
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% Now do the interpolation based on method.
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if strncmpi(method,'l',1) || strncmpi(method,'bil',3) % bilinear interpolation.
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zi = linear(ExtrapVal,x,y,z,xi,yi);
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elseif strncmpi(method,'c',1) || strncmpi(method,'bic',3) % bicubic interpolation
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if uniform
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zi = cubic(ExtrapVal,x,y,z,xi,yi);
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else
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zi = spline2(x,y,z,xi,yi,ExtrapVal);
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end
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elseif strncmpi(method,'n',1) % Nearest neighbor interpolation
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zi = nearest(ExtrapVal,x,y,z,xi,yi);
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elseif strncmpi(method,'s',1) % Spline interpolation
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% A column is removed from z if it contains a NaN.
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% Orient to preserve as much data as possible.
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[inan, jnan] = find(isnan(z));
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ncolnan = length(unique(jnan));
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nrownan = length(unique(inan));
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if ncolnan > nrownan
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zi = spline2(y',x',z',yi,xi,ExtrapVal);
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else
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zi = spline2(x,y,z,xi,yi,ExtrapVal);
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end
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else
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error(message('MATLAB:interp2:InvalidMethod', deblank( method )));
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end
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%------------------------------------------------------
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function F = linear(ExtrapVal,arg1,arg2,arg3,arg4,arg5)
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%LINEAR 2-D bilinear data interpolation.
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% ZI = LINEAR(EXTRAPVAL,X,Y,Z,XI,YI) uses bilinear interpolation to
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% find ZI, the values of the underlying 2-D function in Z at the points
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% in matrices XI and YI. Matrices X and Y specify the points at which
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% the data Z is given. X and Y can also be vectors specifying the
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% abscissae for the matrix Z as for MESHGRID. In both cases, X
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% and Y must be equally spaced and monotonic.
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%
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% Values of EXTRAPVAL are returned in ZI for values of XI and YI that are
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% outside of the range of X and Y.
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%
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% If XI and YI are vectors, LINEAR returns vector ZI containing
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% the interpolated values at the corresponding points (XI,YI).
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%
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% ZI = LINEAR(EXTRAPVAL,Z,XI,YI) assumes X = 1:N and Y = 1:M, where
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% [M,N] = SIZE(Z).
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%
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% ZI = LINEAR(EXTRAPVAL,Z,NTIMES) returns the matrix Z expanded by
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% interleaving bilinear interpolates between every element, working
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% recursively for NTIMES. LINEAR(EXTRAPVAL,Z) is the same as
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% LINEAR(EXTRAPVAL,Z,1).
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%
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% See also INTERP2, CUBIC.
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if nargin==2 % linear(extrapval,z), Expand Z
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[nrows,ncols] = size(arg1);
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s = 1:.5:ncols; lengths = length(s);
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t = (1:.5:nrows)'; lengtht = length(t);
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s = repmat(s,lengtht,1);
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t = repmat(t,1,lengths);
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elseif nargin==3 % linear(extrapval,z,n), Expand Z n times
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[nrows,ncols] = size(arg1);
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ntimes = floor(arg2);
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s = 1:1/(2^ntimes):ncols; lengths = length(s);
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t = (1:1/(2^ntimes):nrows)'; lengtht = length(t);
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s = repmat(s,lengtht,1);
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t = repmat(t,1,lengths);
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elseif nargin==4 % linear(extrapval,z,s,t), No X or Y specified.
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[nrows,ncols] = size(arg1);
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s = arg2; t = arg3;
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elseif nargin==5
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error(message('MATLAB:interp2:linear:nargin'));
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elseif nargin==6 % linear(extrapval,x,y,z,s,t), X and Y specified.
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[nrows,ncols] = size(arg3);
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mx = numel(arg1); my = numel(arg2);
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if (mx ~= ncols || my ~= nrows) && ~isequal(size(arg1),size(arg2),size(arg3))
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error(message('MATLAB:interp2:linear:XYZLengthMismatch'));
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end
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if nrows < 2 || ncols < 2
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error(message('MATLAB:interp2:linear:sizeZ'));
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end
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s = 1 + (arg4-arg1(1))/(arg1(end)-arg1(1))*(ncols-1);
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t = 1 + (arg5-arg2(1))/(arg2(end)-arg2(1))*(nrows-1);
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end
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if nrows < 2 || ncols < 2
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error(message('MATLAB:interp2:linear:sizeZsq'));
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end
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if ~isequal(size(s),size(t))
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error(message('MATLAB:interp2:linear:XIandYISizeMismatch'));
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end
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% Check for out of range values of s and set to 1
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sout = find((s<1)|(s>ncols));
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if ~isempty(sout), s(sout) = 1; end
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% Check for out of range values of t and set to 1
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tout = find((t<1)|(t>nrows));
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if ~isempty(tout), t(tout) = 1; end
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% Matrix element indexing
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ndx = floor(t)+floor(s-1)*nrows;
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% Compute intepolation parameters, check for boundary value.
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if isempty(s), d = s; else d = find(s==ncols); end
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s(:) = (s - floor(s));
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if ~isempty(d), s(d) = s(d)+1; ndx(d) = ndx(d)-nrows; end
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% Compute intepolation parameters, check for boundary value.
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if isempty(t), d = t; else d = find(t==nrows); end
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t(:) = (t - floor(t));
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if ~isempty(d), t(d) = t(d)+1; ndx(d) = ndx(d)-1; end
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% Now interpolate.
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onemt = 1-t;
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if nargin==6,
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F = ( arg3(ndx).*(onemt) + arg3(ndx+1).*t ).*(1-s) + ...
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( arg3(ndx+nrows).*(onemt) + arg3(ndx+(nrows+1)).*t ).*s;
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else
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F = ( arg1(ndx).*(onemt) + arg1(ndx+1).*t ).*(1-s) + ...
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( arg1(ndx+nrows).*(onemt) + arg1(ndx+(nrows+1)).*t ).*s;
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end
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% Now set out of range values to ExtrapVal.
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if ~isempty(sout), F(sout) = ExtrapVal; end
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if ~isempty(tout), F(tout) = ExtrapVal; end
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%------------------------------------------------------
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function F = cubic(ExtrapVal,arg1,arg2,arg3,arg4,arg5)
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%CUBIC 2-D bicubic data interpolation.
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% CUBIC(...) is the same as LINEAR(....) except that it uses
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% bicubic interpolation.
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%
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% This function needs about 7-8 times SIZE(XI) memory to be available.
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%
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% See also LINEAR.
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% Based on "Cubic Convolution Interpolation for Digital Image
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% Processing", Robert G. Keys, IEEE Trans. on Acoustics, Speech, and
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% Signal Processing, Vol. 29, No. 6, Dec. 1981, pp. 1153-1160.
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if nargin==2, % cubic(extrapval,z), Expand Z
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[nrows,ncols] = size(arg1);
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s = 1:.5:ncols; lengths = length(s);
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t = (1:.5:nrows)'; lengtht = length(t);
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s = repmat(s,lengtht,1);
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t = repmat(t,1,lengths);
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elseif nargin==3, % cubic(extrapval,z,n), Expand Z n times
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[nrows,ncols] = size(arg1);
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ntimes = floor(arg2);
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s = 1:1/(2^ntimes):ncols; lengths = length(s);
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t = (1:1/(2^ntimes):nrows)'; lengtht = length(t);
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s = repmat(s,lengtht,1);
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t = repmat(t,1,lengths);
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elseif nargin==4, % cubic(extrapval,z,s,t), No X or Y specified.
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[nrows,ncols] = size(arg1);
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s = arg2; t = arg3;
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elseif nargin==5,
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error(message('MATLAB:interp2:cubic:nargin'));
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elseif nargin==6, % cubic(extrapval,x,y,z,s,t), X and Y specified.
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[nrows,ncols] = size(arg3);
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mx = numel(arg1); my = numel(arg2);
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if (mx ~= ncols || my ~= nrows) && ~isequal(size(arg1),size(arg2),size(arg3))
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error(message('MATLAB:interp2:cubic:XYZLengthMismatch'));
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end
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if nrows < 3 || ncols < 3
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error(message('MATLAB:interp2:cubic:sizeZ'));
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end
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s = 1 + (arg4-arg1(1))/(arg1(end)-arg1(1))*(ncols-1);
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t = 1 + (arg5-arg2(1))/(arg2(end)-arg2(1))*(nrows-1);
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end
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if nrows < 3 || ncols < 3
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error(message('MATLAB:interp2:cubic:sizeZsq'));
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end
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if ~isequal(size(s),size(t)),
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error(message('MATLAB:interp2:cubic:XIandYISizeMismatch'));
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end
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% Check for out of range values of s and set to 1
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sout = find((s<1)|(s>ncols));
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if ~isempty(sout), s(sout) = 1; end
|
|
|
|
% Check for out of range values of t and set to 1
|
|
tout = find((t<1)|(t>nrows));
|
|
if ~isempty(tout), t(tout) = 1; end
|
|
|
|
% Matrix element indexing
|
|
ndx = floor(t)+floor(s-1)*(nrows+2);
|
|
|
|
% Compute intepolation parameters, check for boundary value.
|
|
if isempty(s), d = s; else d = find(s==ncols); end
|
|
s(:) = (s - floor(s));
|
|
if ~isempty(d), s(d) = s(d)+1; ndx(d) = ndx(d)-nrows-2; end
|
|
|
|
% Compute intepolation parameters, check for boundary value.
|
|
if isempty(t), d = t; else d = find(t==nrows); end
|
|
t(:) = (t - floor(t));
|
|
if ~isempty(d), t(d) = t(d)+1; ndx(d) = ndx(d)-1; end
|
|
|
|
if nargin==6,
|
|
% Expand z so interpolation is valid at the boundaries.
|
|
zz = zeros(size(arg3)+2);
|
|
zz(1,2:ncols+1) = 3*arg3(1,:)-3*arg3(2,:)+arg3(3,:);
|
|
zz(2:nrows+1,2:ncols+1) = arg3;
|
|
zz(nrows+2,2:ncols+1) = 3*arg3(nrows,:)-3*arg3(nrows-1,:)+arg3(nrows-2,:);
|
|
zz(:,1) = 3*zz(:,2)-3*zz(:,3)+zz(:,4);
|
|
zz(:,ncols+2) = 3*zz(:,ncols+1)-3*zz(:,ncols)+zz(:,ncols-1);
|
|
nrows = nrows+2; %also ncols = ncols+2;
|
|
else
|
|
% Expand z so interpolation is valid at the boundaries.
|
|
zz = zeros(size(arg1)+2);
|
|
zz(1,2:ncols+1) = 3*arg1(1,:)-3*arg1(2,:)+arg1(3,:);
|
|
zz(2:nrows+1,2:ncols+1) = arg1;
|
|
zz(nrows+2,2:ncols+1) = 3*arg1(nrows,:)-3*arg1(nrows-1,:)+arg1(nrows-2,:);
|
|
zz(:,1) = 3*zz(:,2)-3*zz(:,3)+zz(:,4);
|
|
zz(:,ncols+2) = 3*zz(:,ncols+1)-3*zz(:,ncols)+zz(:,ncols-1);
|
|
nrows = nrows+2; %also ncols = ncols+2;
|
|
end
|
|
|
|
% Now interpolate using computationally efficient algorithm.
|
|
t0 = ((2-t).*t-1).*t;
|
|
t1 = (3*t-5).*t.*t+2;
|
|
t2 = ((4-3*t).*t+1).*t;
|
|
t(:) = (t-1).*t.*t;
|
|
F = ( zz(ndx).*t0 + zz(ndx+1).*t1 + zz(ndx+2).*t2 + zz(ndx+3).*t ) ...
|
|
.* (((2-s).*s-1).*s);
|
|
ndx(:) = ndx + nrows;
|
|
F(:) = F + ( zz(ndx).*t0 + zz(ndx+1).*t1 + zz(ndx+2).*t2 + zz(ndx+3).*t ) ...
|
|
.* ((3*s-5).*s.*s+2);
|
|
ndx(:) = ndx + nrows;
|
|
F(:) = F + ( zz(ndx).*t0 + zz(ndx+1).*t1 + zz(ndx+2).*t2 + zz(ndx+3).*t ) ...
|
|
.* (((4-3*s).*s+1).*s);
|
|
ndx(:) = ndx + nrows;
|
|
F(:) = F + ( zz(ndx).*t0 + zz(ndx+1).*t1 + zz(ndx+2).*t2 + zz(ndx+3).*t ) ...
|
|
.* ((s-1).*s.*s);
|
|
F(:) = F/4;
|
|
|
|
% Now set out of range values to ExtrapVal.
|
|
if ~isempty(sout), F(sout) = ExtrapVal; end
|
|
if ~isempty(tout), F(tout) = ExtrapVal; end
|
|
|
|
%------------------------------------------------------
|
|
function F = nearest(ExtrapVal,arg1,arg2,arg3,arg4,arg5)
|
|
%NEAREST 2-D Nearest neighbor interpolation.
|
|
% ZI = NEAREST(EXTRAPVAL,X,Y,Z,XI,YI) uses nearest neighbor interpolation
|
|
% to find ZI, the values of the underlying 2-D function in Z at the points
|
|
% in matrices XI and YI. Matrices X and Y specify the points at which
|
|
% the data Z is given. X and Y can also be vectors specifying the
|
|
% abscissae for the matrix Z as for MESHGRID. In both cases, X
|
|
% and Y must be equally spaced and monotonic.
|
|
%
|
|
% Values of EXTRAPVAL are returned in ZI for values of XI and YI that are
|
|
% outside of the range of X and Y.
|
|
%
|
|
% If XI and YI are vectors, NEAREST returns vector ZI containing
|
|
% the interpolated values at the corresponding points (XI,YI).
|
|
%
|
|
% ZI = NEAREST(EXTRAPVAL,Z,XI,YI) assumes X = 1:N and Y = 1:M, where
|
|
% [M,N] = SIZE(Z).
|
|
%
|
|
% F = NEAREST(EXTRAPVAL,Z,NTIMES) returns the matrix Z expanded by
|
|
% interleaving interpolates between every element. NEAREST(EXTRAPVAL,Z)
|
|
% is the same as NEAREST(EXTRAPVAL,Z,1).
|
|
%
|
|
% See also INTERP2, LINEAR, CUBIC.
|
|
|
|
if nargin==2, % nearest(z), Expand Z
|
|
[nrows,ncols] = size(arg1);
|
|
u = 1:.5:ncols; lengthu = length(u);
|
|
v = (1:.5:nrows)'; lengthv = length(v);
|
|
u = repmat(u,lengthv,1);
|
|
v = repmat(v,1,lengthu);
|
|
|
|
elseif nargin==3, % nearest(z,n), Expand Z n times
|
|
[nrows,ncols] = size(arg1);
|
|
ntimes = floor(arg2);
|
|
u = 1:1/(2^ntimes):ncols; lengthu = length(u);
|
|
v = (1:1/(2^ntimes):nrows)'; lengthv = length(v);
|
|
u = repmat(u,lengthv,1);
|
|
v = repmat(v,1,lengthu);
|
|
|
|
elseif nargin==4, % nearest(z,u,v)
|
|
[nrows,ncols] = size(arg1);
|
|
u = arg2; v = arg3;
|
|
|
|
elseif nargin==5,
|
|
error(message('MATLAB:interp2:nearest:nargin'));
|
|
|
|
elseif nargin==6, % nearest(x,y,z,u,v), X and Y specified.
|
|
[nrows,ncols] = size(arg3);
|
|
mx = numel(arg1); my = numel(arg2);
|
|
if (mx ~= ncols || my ~= nrows) && ...
|
|
~isequal(size(arg1),size(arg2),size(arg3))
|
|
error(message('MATLAB:interp2:nearest:XYZLengthMismatch'));
|
|
end
|
|
if nrows > 1 && ncols > 1
|
|
u = 1 + (arg4-arg1(1))/(arg1(mx)-arg1(1))*(ncols-1);
|
|
v = 1 + (arg5-arg2(1))/(arg2(my)-arg2(1))*(nrows-1);
|
|
else
|
|
u = 1 + (arg4-arg1(1));
|
|
v = 1 + (arg5-arg2(1));
|
|
end
|
|
end
|
|
|
|
if ~isequal(size(u),size(v))
|
|
error(message('MATLAB:interp2:nearest:XIandYISizeMismatch'));
|
|
end
|
|
|
|
% Check for out of range values of u and set to 1
|
|
uout = (u<.5)|(u>=ncols+.5);
|
|
anyuout = any(uout(:));
|
|
if anyuout, u(uout) = 1; end
|
|
|
|
% Check for out of range values of v and set to 1
|
|
vout = (v<.5)|(v>=nrows+.5);
|
|
anyvout = any(vout(:));
|
|
if anyvout, v(vout) = 1; end
|
|
|
|
% Interpolation parameters
|
|
u = round(u); v = round(v);
|
|
|
|
% Now interpolate
|
|
ndx = v+(u-1)*nrows;
|
|
if nargin==6,
|
|
F = arg3(ndx);
|
|
else
|
|
F = arg1(ndx);
|
|
end
|
|
|
|
% Now set out of range values to ExtrapVal.
|
|
if anyuout, F(uout) = ExtrapVal; end
|
|
if anyvout, F(vout) = ExtrapVal; end
|
|
|
|
%----------------------------------------------------------
|
|
function F = spline2(varargin)
|
|
%2-D spline interpolation
|
|
|
|
% Determine abscissa vectors
|
|
varargin{1} = varargin{1}(1,:);
|
|
varargin{2} = varargin{2}(:,1).';
|
|
|
|
%
|
|
% Check for plaid data.
|
|
%
|
|
xi = varargin{4}; yi = varargin{5};
|
|
xxi = xi(1,:); yyi = yi(:,1);
|
|
|
|
if ~isequal(repmat(xxi,size(xi,1),1),xi) || ...
|
|
~isequal(repmat(yyi,1,size(yi,2)),yi)
|
|
F = splncore(varargin(2:-1:1),varargin{3},varargin(5:-1:4));
|
|
else
|
|
F = splncore(varargin(2:-1:1),varargin{3},{yyi(:).' xxi},'gridded');
|
|
end
|
|
|
|
ExtrapVal = varargin{6};
|
|
% Set out-of-range values to ExtrapVal
|
|
if isnumeric(ExtrapVal)
|
|
d = xi < min(varargin{1}) | xi > max(varargin{1}) | ...
|
|
yi < min(varargin{2}) | yi > max(varargin{2});
|
|
F(d) = ExtrapVal;
|
|
end
|