\section{Histograms} \ifCPy \cvclass{CvHistogram}\label{CvHistogram} Multi-dimensional histogram. \ifC \begin{lstlisting} typedef struct CvHistogram { int type; CvArr* bins; float thresh[CV_MAX_DIM][2]; /* for uniform histograms */ float** thresh2; /* for non-uniform histograms */ CvMatND mat; /* embedded matrix header for array histograms */ } CvHistogram; \end{lstlisting} \fi \ifPy A CvHistogram is a multi-dimensional histogram, created by function \cross{CreateHist}. It has an attribute \texttt{bins} a \cross{CvMatND} containing the histogram counts. \fi \cvCPyFunc{CalcBackProject} Calculates the back projection. \cvdefC{ void cvCalcBackProject( \par IplImage** image,\par CvArr* back\_project,\par const CvHistogram* hist ); }\cvdefPy{CalcBackProject(image,back\_project,hist)-> None} \begin{description} \cvarg{image}{Source images (though you may pass CvMat** as well)} \cvarg{back\_project}{Destination back projection image of the same type as the source images} \cvarg{hist}{Histogram} \end{description} The function calculates the back project of the histogram. For each tuple of pixels at the same position of all input single-channel images the function puts the value of the histogram bin, corresponding to the tuple in the destination image. In terms of statistics, the value of each output image pixel is the probability of the observed tuple given the distribution (histogram). For example, to find a red object in the picture, one may do the following: \begin{enumerate} \item Calculate a hue histogram for the red object assuming the image contains only this object. The histogram is likely to have a strong maximum, corresponding to red color. \item Calculate back projection of a hue plane of input image where the object is searched, using the histogram. Threshold the image. \item Find connected components in the resulting picture and choose the right component using some additional criteria, for example, the largest connected component. \end{enumerate} That is the approximate algorithm of Camshift color object tracker, except for the 3rd step, instead of which CAMSHIFT algorithm is used to locate the object on the back projection given the previous object position. \cvCPyFunc{CalcBackProjectPatch} Locates a template within an image by using a histogram comparison. \cvdefC{ void cvCalcBackProjectPatch( \par IplImage** images,\par CvArr* dst,\par CvSize patch\_size,\par CvHistogram* hist,\par int method,\par double factor ); } \cvdefPy{CalcBackProjectPatch(images,dst,patch\_size,hist,method,factor)-> None} \begin{description} \cvarg{images}{Source images (though, you may pass CvMat** as well)} \cvarg{dst}{Destination image} \cvarg{patch\_size}{Size of the patch slid though the source image} \cvarg{hist}{Histogram} \cvarg{method}{Comparison method, passed to \cvCPyCross{CompareHist} (see description of that function)} \cvarg{factor}{Normalization factor for histograms, will affect the normalization scale of the destination image, pass 1 if unsure} \end{description} The function calculates the back projection by comparing histograms of the source image patches with the given histogram. Taking measurement results from some image at each location over ROI creates an array \texttt{image}. These results might be one or more of hue, \texttt{x} derivative, \texttt{y} derivative, Laplacian filter, oriented Gabor filter, etc. Each measurement output is collected into its own separate image. The \texttt{image} image array is a collection of these measurement images. A multi-dimensional histogram \texttt{hist} is constructed by sampling from the \texttt{image} image array. The final histogram is normalized. The \texttt{hist} histogram has as many dimensions as the number of elements in \texttt{image} array. Each new image is measured and then converted into an \texttt{image} image array over a chosen ROI. Histograms are taken from this \texttt{image} image in an area covered by a "patch" with an anchor at center as shown in the picture below. The histogram is normalized using the parameter \texttt{norm\_factor} so that it may be compared with \texttt{hist}. The calculated histogram is compared to the model histogram; \texttt{hist} uses The function \texttt{cvCompareHist} with the comparison method=\texttt{method}). The resulting output is placed at the location corresponding to the patch anchor in the probability image \texttt{dst}. This process is repeated as the patch is slid over the ROI. Iterative histogram update by subtracting trailing pixels covered by the patch and adding newly covered pixels to the histogram can save a lot of operations, though it is not implemented yet. Back Project Calculation by Patches \includegraphics[width=0.5\textwidth]{pics/backprojectpatch.png} \cvCPyFunc{CalcHist} Calculates the histogram of image(s). \cvdefC{ void cvCalcHist( \par IplImage** image,\par CvHistogram* hist,\par int accumulate=0,\par const CvArr* mask=NULL ); } \cvdefPy{CalcHist(image,hist,accumulate=0,mask=NULL)-> None} \begin{description} \cvarg{image}{Source images (though you may pass CvMat** as well)} \cvarg{hist}{Pointer to the histogram} \cvarg{accumulate}{Accumulation flag. If it is set, the histogram is not cleared in the beginning. This feature allows user to compute a single histogram from several images, or to update the histogram online} \cvarg{mask}{The operation mask, determines what pixels of the source images are counted} \end{description} The function calculates the histogram of one or more single-channel images. The elements of a tuple that is used to increment a histogram bin are taken at the same location from the corresponding input images. \ifC % { % ===== Sample. Calculating and displaying 2D Hue-Saturation histogram of a color image ===== \begin{lstlisting} #include #include int main( int argc, char** argv ) { IplImage* src; if( argc == 2 && (src=cvLoadImage(argv[1], 1))!= 0) { IplImage* h_plane = cvCreateImage( cvGetSize(src), 8, 1 ); IplImage* s_plane = cvCreateImage( cvGetSize(src), 8, 1 ); IplImage* v_plane = cvCreateImage( cvGetSize(src), 8, 1 ); IplImage* planes[] = { h_plane, s_plane }; IplImage* hsv = cvCreateImage( cvGetSize(src), 8, 3 ); int h_bins = 30, s_bins = 32; int hist_size[] = {h_bins, s_bins}; /* hue varies from 0 (~0 deg red) to 180 (~360 deg red again) */ float h_ranges[] = { 0, 180 }; /* saturation varies from 0 (black-gray-white) to 255 (pure spectrum color) */ float s_ranges[] = { 0, 255 }; float* ranges[] = { h_ranges, s_ranges }; int scale = 10; IplImage* hist_img = cvCreateImage( cvSize(h_bins*scale,s_bins*scale), 8, 3 ); CvHistogram* hist; float max_value = 0; int h, s; cvCvtColor( src, hsv, CV_BGR2HSV ); cvCvtPixToPlane( hsv, h_plane, s_plane, v_plane, 0 ); hist = cvCreateHist( 2, hist_size, CV_HIST_ARRAY, ranges, 1 ); cvCalcHist( planes, hist, 0, 0 ); cvGetMinMaxHistValue( hist, 0, &max_value, 0, 0 ); cvZero( hist_img ); for( h = 0; h < h_bins; h++ ) { for( s = 0; s < s_bins; s++ ) { float bin_val = cvQueryHistValue\_2D( hist, h, s ); int intensity = cvRound(bin_val*255/max_value); cvRectangle( hist_img, cvPoint( h*scale, s*scale ), cvPoint( (h+1)*scale - 1, (s+1)*scale - 1), CV_RGB(intensity,intensity,intensity), CV_FILLED ); } } cvNamedWindow( "Source", 1 ); cvShowImage( "Source", src ); cvNamedWindow( "H-S Histogram", 1 ); cvShowImage( "H-S Histogram", hist_img ); cvWaitKey(0); } } \end{lstlisting} \else % }{ \lstinputlisting{python_fragments/calchist.py} \fi % } \cvCPyFunc{CalcProbDensity} Divides one histogram by another. \cvdefC{ void cvCalcProbDensity( \par const CvHistogram* hist1,\par const CvHistogram* hist2,\par CvHistogram* dst\_hist,\par double scale=255 ); } \cvdefPy{CalcProbDensity(hist1,hist2,dst\_hist,scale=255)-> None} \begin{description} \cvarg{hist1}{first histogram (the divisor)} \cvarg{hist2}{second histogram} \cvarg{dst\_hist}{destination histogram} \cvarg{scale}{scale factor for the destination histogram} \end{description} The function calculates the object probability density from the two histograms as: \[ \texttt{dist\_hist}(I)= \forkthree {0}{if $\texttt{hist1}(I)=0$} {\texttt{scale}}{if $\texttt{hist1}(I) \ne 0$ and $\texttt{hist2}(I) > \texttt{hist1}(I)$} {\frac{\texttt{hist2}(I) \cdot \texttt{scale}}{\texttt{hist1}(I)}}{if $\texttt{hist1}(I) \ne 0$ and $\texttt{hist2}(I) \le \texttt{hist1}(I)$} \] So the destination histogram bins are within less than \texttt{scale}. \cvCPyFunc{ClearHist} Clears the histogram. \cvdefC{ void cvClearHist( CvHistogram* hist ); }\cvdefPy{ClearHist(hist)-> None} \begin{description} \cvarg{hist}{Histogram} \end{description} The function sets all of the histogram bins to 0 in the case of a dense histogram and removes all histogram bins in the case of a sparse array. \cvCPyFunc{CompareHist} Compares two dense histograms. \cvdefC{ double cvCompareHist( \par const CvHistogram* hist1,\par const CvHistogram* hist2,\par int method ); }\cvdefPy{CompareHist(hist1,hist2,method)->float} \begin{description} \cvarg{hist1}{The first dense histogram} \cvarg{hist2}{The second dense histogram} \cvarg{method}{Comparison method, one of the following: \begin{description} \cvarg{CV\_COMP\_CORREL}{Correlation} \cvarg{CV\_COMP\_CHISQR}{Chi-Square} \cvarg{CV\_COMP\_INTERSECT}{Intersection} \cvarg{CV\_COMP\_BHATTACHARYYA}{Bhattacharyya distance} \end{description}} \end{description} The function compares two dense histograms using the specified method ($H_1$ denotes the first histogram, $H_2$ the second): \begin{description} \item[Correlation (method=CV\_COMP\_CORREL)] \[ d(H_1,H_2) = \frac {\sum_I (H'_1(I) \cdot H'_2(I))} {\sqrt{\sum_I(H'_1(I)^2) \cdot \sum_I(H'_2(I)^2)}} \] where \[ H'_k(I) = \frac{H_k(I) - 1}{N \cdot \sum_J H_k(J)} \] where N is the number of histogram bins. \item[Chi-Square (method=CV\_COMP\_CHISQR)] \[ d(H_1,H_2) = \sum_I \frac{(H_1(I)-H_2(I))^2}{H_1(I)+H_2(I)} \] \item[Intersection (method=CV\_COMP\_INTERSECT)] \[ d(H_1,H_2) = \sum_I \min (H_1(I), H_2(I)) \] \item[Bhattacharyya distance (method=CV\_COMP\_BHATTACHARYYA)] \[ d(H_1,H_2) = \sqrt{1 - \sum_I \frac{\sqrt{H_1(I) \cdot H_2(I)}}{ \sqrt{ \sum_I H_1(I) \cdot \sum_I H_2(I) }}} \] \end{description} The function returns $d(H_1, H_2)$. Note: the method \texttt{CV\_COMP\_BHATTACHARYYA} only works with normalized histograms. To compare a sparse histogram or more general sparse configurations of weighted points, consider using the \cvCPyCross{CalcEMD2} function. \ifC \cvCPyFunc{CopyHist} Copies a histogram. \cvdefC{ void cvCopyHist( const CvHistogram* src, CvHistogram** dst ); } \begin{description} \cvarg{src}{Source histogram} \cvarg{dst}{Pointer to destination histogram} \end{description} The function makes a copy of the histogram. If the second histogram pointer \texttt{*dst} is NULL, a new histogram of the same size as \texttt{src} is created. Otherwise, both histograms must have equal types and sizes. Then the function copies the source histogram's bin values to the destination histogram and sets the same bin value ranges as in \texttt{src}. \fi \cvCPyFunc{CreateHist} Creates a histogram. \cvdefC{ CvHistogram* cvCreateHist(\par int dims,\par int* sizes,\par int type,\par float** ranges=NULL,\par int uniform=1 ); }\cvdefPy{CreateHist(dims, type, ranges, uniform = 1) -> hist} \begin{description} \cvC{\cvarg{dims}{Number of histogram dimensions} \cvarg{sizes}{Array of the histogram dimension sizes}} \cvPy{\cvarg{dims}{for an N-dimensional histogram, list of length N giving the size of each dimension}} \cvarg{type}{Histogram representation format: \texttt{CV\_HIST\_ARRAY} means that the histogram data is represented as a multi-dimensional dense array CvMatND; \texttt{CV\_HIST\_SPARSE} means that histogram data is represented as a multi-dimensional sparse array CvSparseMat} \cvarg{ranges}{Array of ranges for the histogram bins. Its meaning depends on the \texttt{uniform} parameter value. The ranges are used for when the histogram is calculated or backprojected to determine which histogram bin corresponds to which value/tuple of values from the input image(s)} \cvarg{uniform}{Uniformity flag; if not 0, the histogram has evenly spaced bins and for every $0<=ibins, (idx0), 0 )) #define cvGetHistValue_2D( hist, idx0, idx1 ) ((float*)(cvPtr2D( (hist)->bins, (idx0), (idx1), 0 ))) #define cvGetHistValue_3D( hist, idx0, idx1, idx2 ) ((float*)(cvPtr3D( (hist)->bins, (idx0), (idx1), (idx2), 0 ))) #define cvGetHistValue_nD( hist, idx ) ((float*)(cvPtrND( (hist)->bins, (idx), 0 ))) \end{lstlisting} The macros \texttt{GetHistValue} return a pointer to the specified bin of the 1D, 2D, 3D or N-D histogram. In the case of a sparse histogram the function creates a new bin and sets it to 0, unless it exists already. \fi % } \cvCPyFunc{GetMinMaxHistValue} Finds the minimum and maximum histogram bins. \cvdefC{ void cvGetMinMaxHistValue( \par const CvHistogram* hist,\par float* min\_value,\par float* max\_value,\par int* min\_idx=NULL,\par int* max\_idx=NULL ); } \cvdefPy{GetMinMaxHistValue(hist)-> (min\_value,max\_value,min\_idx,max\_idx)} \begin{description} \cvarg{hist}{Histogram} \ifC \cvarg{min\_value}{Pointer to the minimum value of the histogram} \cvarg{max\_value}{Pointer to the maximum value of the histogram} \cvarg{min\_idx}{Pointer to the array of coordinates for the minimum} \cvarg{max\_idx}{Pointer to the array of coordinates for the maximum} \else \cvarg{min\_value}{Minimum value of the histogram} \cvarg{max\_value}{Maximum value of the histogram} \cvarg{min\_idx}{Coordinates of the minimum} \cvarg{max\_idx}{Coordinates of the maximum} \fi \end{description} The function finds the minimum and maximum histogram bins and their positions. All of output arguments are optional. Among several extremas with the same value the ones with the minimum index (in lexicographical order) are returned. In the case of several maximums or minimums, the earliest in lexicographical order (extrema locations) is returned. \ifC % { \cvCPyFunc{MakeHistHeaderForArray} Makes a histogram out of an array. \cvdefC{ CvHistogram* cvMakeHistHeaderForArray( \par int dims,\par int* sizes,\par CvHistogram* hist,\par float* data,\par float** ranges=NULL,\par int uniform=1 ); } \begin{description} \cvarg{dims}{Number of histogram dimensions} \cvarg{sizes}{Array of the histogram dimension sizes} \cvarg{hist}{The histogram header initialized by the function} \cvarg{data}{Array that will be used to store histogram bins} \cvarg{ranges}{Histogram bin ranges, see \cvCPyCross{CreateHist}} \cvarg{uniform}{Uniformity flag, see \cvCPyCross{CreateHist}} \end{description} The function initializes the histogram, whose header and bins are allocated by th user. \cvCPyCross{ReleaseHist} does not need to be called afterwards. Only dense histograms can be initialized this way. The function returns \texttt{hist}. \fi % } \cvCPyFunc{NormalizeHist} Normalizes the histogram. \cvdefC{ void cvNormalizeHist( CvHistogram* hist, double factor ); }\cvdefPy{NormalizeHist(hist,factor)-> None} \begin{description} \cvarg{hist}{Pointer to the histogram} \cvarg{factor}{Normalization factor} \end{description} The function normalizes the histogram bins by scaling them, such that the sum of the bins becomes equal to \texttt{factor}. \ifC \cvCPyFunc{QueryHistValue*D} Queries the value of the histogram bin. \cvdefC{float QueryHistValue\_1D(CvHistogram hist, int idx0)} \begin{description} \cvarg{hist}{Histogram} \cvarg{idx0, idx1, idx2, idx3}{Indices of the bin} \cvarg{idx}{Array of indices} \end{description} \begin{lstlisting} #define cvQueryHistValue\_1D( hist, idx0 ) \ cvGetReal1D( (hist)->bins, (idx0) ) #define cvQueryHistValue\_2D( hist, idx0, idx1 ) \ cvGetReal2D( (hist)->bins, (idx0), (idx1) ) #define cvQueryHistValue\_3D( hist, idx0, idx1, idx2 ) \ cvGetReal3D( (hist)->bins, (idx0), (idx1), (idx2) ) #define cvQueryHistValue\_nD( hist, idx ) \ cvGetRealND( (hist)->bins, (idx) ) \end{lstlisting} The macros return the value of the specified bin of the 1D, 2D, 3D or N-D histogram. In the case of a sparse histogram the function returns 0, if the bin is not present in the histogram no new bin is created. \else \cvfunc{QueryHistValue\_1D} Returns the value from a 1D histogram bin. \cvdefPy{QueryHistValue\_1D(hist, idx0) -> float} \begin{description} \cvarg{hist}{Histogram} \cvarg{idx0}{bin index 0} \end{description} \cvfunc{QueryHistValue\_2D} Returns the value from a 2D histogram bin. \cvdefPy{QueryHistValue\_2D(hist, idx0, idx1) -> float} \begin{description} \cvarg{hist}{Histogram} \cvarg{idx0}{bin index 0} \cvarg{idx1}{bin index 1} \end{description} \cvfunc{QueryHistValue\_3D} Returns the value from a 3D histogram bin. \cvdefPy{QueryHistValue\_3D(hist, idx0, idx1, idx2) -> float} \begin{description} \cvarg{hist}{Histogram} \cvarg{idx0}{bin index 0} \cvarg{idx1}{bin index 1} \cvarg{idx2}{bin index 2} \end{description} \cvfunc{QueryHistValue\_nD} Returns the value from a 1D histogram bin. \cvdefPy{QueryHistValue\_nD(hist, idx) -> float} \begin{description} \cvarg{hist}{Histogram} \cvarg{idx}{list of indices, of same length as the dimension of the histogram's bin.} \end{description} \fi \ifC \cvCPyFunc{ReleaseHist} Releases the histogram. \cvdefC{ void cvReleaseHist( CvHistogram** hist ); } \begin{description} \cvarg{hist}{Double pointer to the released histogram} \end{description} The function releases the histogram (header and the data). The pointer to the histogram is cleared by the function. If \texttt{*hist} pointer is already \texttt{NULL}, the function does nothing. \cvCPyFunc{SetHistBinRanges} Sets the bounds of the histogram bins. \cvdefC{ void cvSetHistBinRanges( \par CvHistogram* hist,\par float** ranges,\par int uniform=1 ); } \begin{description} \cvarg{hist}{Histogram} \cvarg{ranges}{Array of bin ranges arrays, see \cvCPyCross{CreateHist}} \cvarg{uniform}{Uniformity flag, see \cvCPyCross{CreateHist}} \end{description} The function is a stand-alone function for setting bin ranges in the histogram. For a more detailed description of the parameters \texttt{ranges} and \texttt{uniform} see the \cvCPyCross{CalcHist} function, that can initialize the ranges as well. Ranges for the histogram bins must be set before the histogram is calculated or the backproject of the histogram is calculated. \fi \cvCPyFunc{ThreshHist} Thresholds the histogram. \cvdefC{ void cvThreshHist( CvHistogram* hist, double threshold ); } \cvdefPy{ThreshHist(hist,threshold)-> None} \begin{description} \cvarg{hist}{Pointer to the histogram} \cvarg{threshold}{Threshold level} \end{description} The function clears histogram bins that are below the specified threshold. \fi \ifCpp \cvCppFunc{calcHist} Calculates histogram of a set of arrays \cvdefCpp{void calcHist( const Mat* arrays, int narrays,\par const int* channels, const Mat\& mask,\par MatND\& hist, int dims, const int* histSize,\par const float** ranges, bool uniform=true,\par bool accumulate=false );\newline void calcHist( const Mat* arrays, int narrays,\par const int* channels, const Mat\& mask,\par SparseMat\& hist, int dims, const int* histSize,\par const float** ranges, bool uniform=true,\par bool accumulate=false );} \begin{description} \cvarg{arrays}{Source arrays. They all should have the same depth, \texttt{CV\_8U} or \texttt{CV\_32F}, and the same size. Each of them can have an arbitrary number of channels} \cvarg{narrays}{The number of source arrays} \cvarg{channels}{The list of \texttt{dims} channels that are used to compute the histogram. The first array channels are numerated from 0 to \texttt{arrays[0].channels()-1}, the second array channels are counted from \texttt{arrays[0].channels()} to \texttt{arrays[0].channels() + arrays[1].channels()-1} etc.} \cvarg{mask}{The optional mask. If the matrix is not empty, it must be 8-bit array of the same size as \texttt{arrays[i]}. The non-zero mask elements mark the array elements that are counted in the histogram} \cvarg{hist}{The output histogram, a dense or sparse \texttt{dims}-dimensional array} \cvarg{dims}{The histogram dimensionality; must be positive and not greater than \texttt{CV\_MAX\_DIMS}(=32 in the current OpenCV version)} \cvarg{histSize}{The array of histogram sizes in each dimension} \cvarg{ranges}{The array of \texttt{dims} arrays of the histogram bin boundaries in each dimension. When the histogram is uniform (\texttt{uniform}=true), then for each dimension \texttt{i} it's enough to specify the lower (inclusive) boundary $L_0$ of the 0-th histogram bin and the upper (exclusive) boundary $U_{\texttt{histSize}[i]-1}$ for the last histogram bin \texttt{histSize[i]-1}. That is, in the case of uniform histogram each of \texttt{ranges[i]} is an array of 2 elements. When the histogram is not uniform (\texttt{uniform=false}), then each of \texttt{ranges[i]} contains \texttt{histSize[i]+1} elements: $L_0, U_0=L_1, U_1=L_2, ..., U_{\texttt{histSize[i]}-2}=L_{\texttt{histSize[i]}-1}, U_{\texttt{histSize[i]}-1}$. The array elements, which are not between $L_0$ and $U_{\texttt{histSize[i]}-1}$, are not counted in the histogram} \cvarg{uniform}{Indicates whether the histogram is uniform or not, see above} \cvarg{accumulate}{Accumulation flag. If it is set, the histogram is not cleared in the beginning (when it is allocated). This feature allows user to compute a single histogram from several sets of arrays, or to update the histogram in time} \end{description} The functions \texttt{calcHist} calculate the histogram of one or more arrays. The elements of a tuple that is used to increment a histogram bin are taken at the same location from the corresponding input arrays. The sample below shows how to compute 2D Hue-Saturation histogram for a color imag \begin{lstlisting} #include #include using namespace cv; int main( int argc, char** argv ) { Mat src, hsv; if( argc != 2 || !(src=imread(argv[1], 1)).data ) return -1; cvtColor(src, hsv, CV_BGR2HSV); // let's quantize the hue to 30 levels // and the saturation to 32 levels int hbins = 30, sbins = 32; int histSize[] = {hbins, sbins}; // hue varies from 0 to 179, see cvtColor float hranges[] = { 0, 180 }; // saturation varies from 0 (black-gray-white) to // 255 (pure spectrum color) float sranges[] = { 0, 256 }; const float* ranges[] = { hranges, sranges }; MatND hist; // we compute the histogram from the 0-th and 1-st channels int channels[] = {0, 1}; calcHist( &hsv, 1, channels, Mat(), // do not use mask hist, 2, histSize, ranges, true, // the histogram is uniform false ); double maxVal=0; minMaxLoc(hist, 0, &maxVal, 0, 0); int scale = 10; Mat histImg = Mat::zeros(sbins*scale, hbins*10, CV_8UC3); for( int h = 0; h < hbins; h++ ) for( int s = 0; s < sbins; s++ ) { float binVal = hist.at(h, s); int intensity = cvRound(binVal*255/maxVal); rectangle( histImg, Point(h*scale, s*scale), Point( (h+1)*scale - 1, (s+1)*scale - 1), Scalar::all(intensity), CV_FILLED ); } namedWindow( "Source", 1 ); imshow( "Source", src ); namedWindow( "H-S Histogram", 1 ); imshow( "H-S Histogram", histImg ); waitKey(); } \end{lstlisting} \cvCppFunc{calcBackProject} Calculates the back projection of a histogram. \cvdefCpp{void calcBackProject( const Mat* arrays, int narrays,\par const int* channels, const MatND\& hist,\par Mat\& backProject, const float** ranges,\par double scale=1, bool uniform=true );\newline void calcBackProject( const Mat* arrays, int narrays,\par const int* channels, const SparseMat\& hist,\par Mat\& backProject, const float** ranges,\par double scale=1, bool uniform=true );} \begin{description} \cvarg{arrays}{Source arrays. They all should have the same depth, \texttt{CV\_8U} or \texttt{CV\_32F}, and the same size. Each of them can have an arbitrary number of channels} \cvarg{narrays}{The number of source arrays} \cvarg{channels}{The list of channels that are used to compute the back projection. The number of channels must match the histogram dimensionality. The first array channels are numerated from 0 to \texttt{arrays[0].channels()-1}, the second array channels are counted from \texttt{arrays[0].channels()} to \texttt{arrays[0].channels() + arrays[1].channels()-1} etc.} \cvarg{hist}{The input histogram, a dense or sparse} \cvarg{backProject}{Destination back projection aray; will be a single-channel array of the same size and the same depth as \texttt{arrays[0]}} \cvarg{ranges}{The array of arrays of the histogram bin boundaries in each dimension. See \cvCppCross{calcHist}} \cvarg{scale}{The optional scale factor for the output back projection} \cvarg{uniform}{Indicates whether the histogram is uniform or not, see above} \end{description} The functions \texttt{calcBackProject} calculate the back project of the histogram. That is, similarly to \texttt{calcHist}, at each location \texttt{(x, y)} the function collects the values from the selected channels in the input images and finds the corresponding histogram bin. But instead of incrementing it, the function reads the bin value, scales it by \texttt{scale} and stores in \texttt{backProject(x,y)}. In terms of statistics, the function computes probability of each element value in respect with the empirical probability distribution represented by the histogram. Here is how, for example, you can find and track a bright-colored object in a scene: \begin{enumerate} \item Before the tracking, show the object to the camera such that covers almost the whole frame. Calculate a hue histogram. The histogram will likely have a strong maximums, corresponding to the dominant colors in the object. \item During the tracking, calculate back projection of a hue plane of each input video frame using that pre-computed histogram. Threshold the back projection to suppress weak colors. It may also have sense to suppress pixels with non sufficient color saturation and too dark or too bright pixels. \item Find connected components in the resulting picture and choose, for example, the largest component. \end{enumerate} That is the approximate algorithm of \cvCppCross{CAMShift} color object tracker. See also: \cvCppCross{calcHist} \cvCppFunc{compareHist} Compares two histograms \cvdefCpp{double compareHist( const MatND\& H1, const MatND\& H2, int method );\newline double compareHist( const SparseMat\& H1, \par const SparseMat\& H2, int method );} \begin{description} \cvarg{H1}{The first compared histogram} \cvarg{H2}{The second compared histogram of the same size as \texttt{H1}} \cvarg{method}{The comparison method, one of the following: \begin{description} \cvarg{CV\_COMP\_CORREL}{Correlation} \cvarg{CV\_COMP\_CHISQR}{Chi-Square} \cvarg{CV\_COMP\_INTERSECT}{Intersection} \cvarg{CV\_COMP\_BHATTACHARYYA}{Bhattacharyya distance} \end{description}} \end{description} The functions \texttt{compareHist} compare two dense or two sparse histograms using the specified method: \begin{description} \item[Correlation (method=CV\_COMP\_CORREL)] \[ d(H_1,H_2) = \frac {\sum_I (H_1(I) - \bar{H_1}) (H_2(I) - \bar{H_2})} {\sqrt{\sum_I(H_1(I) - \bar{H_1})^2 \sum_I(H_2(I) - \bar{H_2})^2}} \] where \[ \bar{H_k} = \frac{1}{N} \sum_J H_k(J) \] and $N$ is the total number of histogram bins. \item[Chi-Square (method=CV\_COMP\_CHISQR)] \[ d(H_1,H_2) = \sum_I \frac{\left(H_1(I)-H_2(I)\right)^2}{H_1(I)+H_2(I)} \] \item[Intersection (method=CV\_COMP\_INTERSECT)] \[ d(H_1,H_2) = \sum_I \min (H_1(I), H_2(I)) \] \item[Bhattacharyya distance (method=CV\_COMP\_BHATTACHARYYA)] \[ d(H_1,H_2) = \sqrt{1 - \frac{1}{\sqrt{\bar{H_1} \bar{H_2} N^2}} \sum_I \sqrt{H_1(I) \cdot H_2(I)}} \] \end{description} The function returns $d(H_1, H_2)$. While the function works well with 1-, 2-, 3-dimensional dense histograms, it may not be suitable for high-dimensional sparse histograms, where, because of aliasing and sampling problems the coordinates of non-zero histogram bins can slightly shift. To compare such histograms or more general sparse configurations of weighted points, consider using the \cvCppCross{calcEMD} function. \cvCppFunc{equalizeHist} Equalizes the histogram of a grayscale image. \cvdefCpp{void equalizeHist( const Mat\& src, Mat\& dst );} \begin{description} \cvarg{src}{The source 8-bit single channel image} \cvarg{dst}{The destination image; will have the same size and the same type as \texttt{src}} \end{description} The function equalizes the histogram of the input image using the following algorithm: \begin{enumerate} \item calculate the histogram $H$ for \texttt{src}. \item normalize the histogram so that the sum of histogram bins is 255. \item compute the integral of the histogram: \[ H'_i = \sum_{0 \le j < i} H(j) \] \item transform the image using $H'$ as a look-up table: $\texttt{dst}(x,y) = H'(\texttt{src}(x,y))$ \end{enumerate} The algorithm normalizes the brightness and increases the contrast of the image. \fi