https://github.com/cran/robCompositions
Tip revision: 6cf109eab116e889a3e3bcc1309cbdcc254895e8 authored by Matthias Templ on 25 August 2023, 15:30:06 UTC
version 2.4.1
version 2.4.1
Tip revision: 6cf109e
classData.h
#ifndef STORE_DATA_1909_HPP
#define STORE_DATA_1909_HPP
#include <math.h>
#include <Eigen/Dense>
#include <iostream>
#include <iterator>
#include <vector>
#include <algorithm>
#include <functional>
#include "density_estimation.h"
#include "zeros.h"
/*! \file
@brief Data container class
*/
/*!
@brief Data manager
@note Data are assumed to be already without extreme observations
*/
class dataManager
{
private:
/** vector where data are stored (one row at a time)*/
std::vector<double> numbers;
/** mesh grid - where to evaluate output density */
std::vector<double> grid;
/** numbers' size*/
unsigned int howmanyclasses;
public:
/*!
@brief Read one row of data
@details Read one row and apply Bayesian-multiplicative treatment of count zeros if necessary.
@see BM()
@param row Input row of data
@param prior Prior for BM treatment
@see PRIOR
@param cancel If cancel = j, it does not consider j-th column.
Useful for cross-validation. Disabled by default.
*/
void
readData
(const Eigen::Block<Eigen::Map<Eigen::Matrix<double, -1, -1>, 0, Eigen::Stride<0, 0> >, 1, -1, false> & row,
PRIOR prior, const int & cancel = -1);
/*!
@brief Transform data using centered log-ratio (clr) function
@details Apply clr transformation to data:
\f$ y_i = \frac{z_i}{g(z_1,...,z_n)} \f$
where g() is the geometric mean, \f$z_i\f$ are the elements in
the row of data and \f$y_i\f$ are the transformed elements.
*/
void
transfData
();
/*!
@brief Return processed data row
*/
std::vector<double>
getNumbers
();
/*!
@brief It's the unique and final solution of the problem.
@details Call the solve method of the densityEstimator object.
@param dens (Input) densityEstimator object where parameters for the method are stored.
@see densityEstimator
@param bspline (Output) Row of output matrix where coefficients of the bspline are saved.
*/
void
pacs
(densityEstimator & dens, Eigen::Block<Eigen::Matrix<double, -1, -1>, 1, -1, false> bspline);
/*!
@brief Anti-transform data using the inverse of centered log-ratio (clr) function
@details Apply \f$ clr^{-1} \f$ transformation:
\f$ z_i = \frac{exp(y_i)}{n \int_{k=1}^{n}exp(y_k)} \f$
@param x Vector to anti-transform
*/
void
antitData
(Eigen::Block<Eigen::Matrix<double, -1, -1>, 1, -1, false> x);
/*!
@brief Generate equispaced grid in [start,end]
@param start Leftend point of the interval
@param end Rightend point of the interval
@param numPoints Number of points to generate in the interval
*/
void
fillGrid
(double start, double end, unsigned int numPoints);
/*!
@brief Generate points to plot
@details Compute and store the anti-transformated values of the density in yplot matrix.
@param numPoints (input) Number of points to plot
@param bspline (input) Coefficients of bspline
@param yplot (output) Anti-transformed values of the bspline evaluated in the the points generated for plot
*/
void
plotData
(const densityEstimator & dens, unsigned long int numPoints,
Eigen::Block<Eigen::Matrix<double, -1, -1>, 1, -1, false> bspline,
Eigen::Block<Eigen::Matrix<double, -1, -1>, 1, -1, false> yplot);
/*!
@brief Generate points to plot
@details Compute and store the clr-values of the density in yplot matrix.
@param numPoints (input) Number of points to plot
@param bspline (input) Coefficients of bspline
@param yplot (output) clr transformed values of the bspline evaluated in the the points generated for plot
*/
void
plotData_Clr
(const densityEstimator & dens, unsigned long int numPoints,
Eigen::Block<Eigen::Matrix<double, -1, -1>, 1, -1, false> bspline,
Eigen::Block<Eigen::Matrix<double, -1, -1>, 1, -1, false> yplot);
/*!
@brief Compute the value of the bspline in a point
@param vec1 Coefficients of the bspline
@param vec2 basis splines evaluated in the point
@return Value of the bspline evaluated in the point point
*/
long double
compute_fvalue
(Eigen::Block<Eigen::Matrix<double, -1, -1>, 1, -1, false> vec1, Eigen::ArrayXd vec2);
};
#endif //STORE_DATA_1909_HPP