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216 lines
5.5 KiB
C++
216 lines
5.5 KiB
C++
//
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// Stat.cpp
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//
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// Created by Marc Melikyan on 9/29/20.
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//
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#include "stat_old.h"
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#include "../activation/activation.h"
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#include "../data/data.h"
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#include "../lin_alg/lin_alg.h"
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#include <algorithm>
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#include <cmath>
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#include <map>
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#include <iostream>
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real_t MLPPStatOld::b0Estimation(const std::vector<real_t> &x, const std::vector<real_t> &y) {
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return mean(y) - b1Estimation(x, y) * mean(x);
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}
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real_t MLPPStatOld::b1Estimation(const std::vector<real_t> &x, const std::vector<real_t> &y) {
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return covariance(x, y) / variance(x);
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}
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real_t MLPPStatOld::mean(const std::vector<real_t> &x) {
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real_t sum = 0;
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for (uint32_t i = 0; i < x.size(); i++) {
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sum += x[i];
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}
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return sum / x.size();
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}
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real_t MLPPStatOld::median(std::vector<real_t> x) {
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real_t center = real_t(x.size()) / real_t(2);
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sort(x.begin(), x.end());
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if (x.size() % 2 == 0) {
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return mean({ x[center - 1], x[center] });
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} else {
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return x[center - 1 + 0.5];
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}
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}
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std::vector<real_t> MLPPStatOld::mode(const std::vector<real_t> &x) {
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MLPPData data;
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std::vector<real_t> x_set = data.vecToSet(x);
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std::map<real_t, int> element_num;
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for (uint32_t i = 0; i < x_set.size(); i++) {
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element_num[x[i]] = 0;
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}
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for (uint32_t i = 0; i < x.size(); i++) {
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element_num[x[i]]++;
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}
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std::vector<real_t> modes;
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real_t max_num = element_num[x_set[0]];
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for (uint32_t i = 0; i < x_set.size(); i++) {
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if (element_num[x_set[i]] > max_num) {
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max_num = element_num[x_set[i]];
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modes.clear();
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modes.push_back(x_set[i]);
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} else if (element_num[x_set[i]] == max_num) {
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modes.push_back(x_set[i]);
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}
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}
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return modes;
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}
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real_t MLPPStatOld::range(const std::vector<real_t> &x) {
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MLPPLinAlg alg;
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return alg.max(x) - alg.min(x);
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}
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real_t MLPPStatOld::midrange(const std::vector<real_t> &x) {
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return range(x) / 2;
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}
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real_t MLPPStatOld::absAvgDeviation(const std::vector<real_t> &x) {
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real_t sum = 0;
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for (uint32_t i = 0; i < x.size(); i++) {
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sum += std::abs(x[i] - mean(x));
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}
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return sum / x.size();
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}
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real_t MLPPStatOld::standardDeviation(const std::vector<real_t> &x) {
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return std::sqrt(variance(x));
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}
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real_t MLPPStatOld::variance(const std::vector<real_t> &x) {
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real_t sum = 0;
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for (uint32_t i = 0; i < x.size(); i++) {
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sum += (x[i] - mean(x)) * (x[i] - mean(x));
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}
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return sum / (x.size() - 1);
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}
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real_t MLPPStatOld::covariance(const std::vector<real_t> &x, const std::vector<real_t> &y) {
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real_t sum = 0;
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for (uint32_t i = 0; i < x.size(); i++) {
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sum += (x[i] - mean(x)) * (y[i] - mean(y));
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}
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return sum / (x.size() - 1);
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}
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real_t MLPPStatOld::correlation(const std::vector<real_t> &x, const std::vector<real_t> &y) {
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return covariance(x, y) / (standardDeviation(x) * standardDeviation(y));
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}
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real_t MLPPStatOld::R2(const std::vector<real_t> &x, const std::vector<real_t> &y) {
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return correlation(x, y) * correlation(x, y);
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}
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real_t MLPPStatOld::chebyshevIneq(const real_t k) {
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// X may or may not belong to a Gaussian Distribution
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return 1 - 1 / (k * k);
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}
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real_t MLPPStatOld::weightedMean(const std::vector<real_t> &x, const std::vector<real_t> &weights) {
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real_t sum = 0;
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real_t weights_sum = 0;
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for (uint32_t i = 0; i < x.size(); i++) {
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sum += x[i] * weights[i];
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weights_sum += weights[i];
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}
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return sum / weights_sum;
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}
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real_t MLPPStatOld::geometricMean(const std::vector<real_t> &x) {
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real_t product = 1;
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for (uint32_t i = 0; i < x.size(); i++) {
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product *= x[i];
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}
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return std::pow(product, 1.0 / x.size());
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}
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real_t MLPPStatOld::harmonicMean(const std::vector<real_t> &x) {
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real_t sum = 0;
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for (uint32_t i = 0; i < x.size(); i++) {
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sum += 1 / x[i];
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}
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return x.size() / sum;
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}
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real_t MLPPStatOld::RMS(const std::vector<real_t> &x) {
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real_t sum = 0;
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for (uint32_t i = 0; i < x.size(); i++) {
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sum += x[i] * x[i];
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}
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return sqrt(sum / x.size());
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}
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real_t MLPPStatOld::powerMean(const std::vector<real_t> &x, const real_t p) {
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real_t sum = 0;
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for (uint32_t i = 0; i < x.size(); i++) {
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sum += std::pow(x[i], p);
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}
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return std::pow(sum / x.size(), 1 / p);
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}
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real_t MLPPStatOld::lehmerMean(const std::vector<real_t> &x, const real_t p) {
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real_t num = 0;
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real_t den = 0;
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for (uint32_t i = 0; i < x.size(); i++) {
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num += std::pow(x[i], p);
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den += std::pow(x[i], p - 1);
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}
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return num / den;
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}
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real_t MLPPStatOld::weightedLehmerMean(const std::vector<real_t> &x, const std::vector<real_t> &weights, const real_t p) {
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real_t num = 0;
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real_t den = 0;
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for (uint32_t i = 0; i < x.size(); i++) {
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num += weights[i] * std::pow(x[i], p);
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den += weights[i] * std::pow(x[i], p - 1);
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}
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return num / den;
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}
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real_t MLPPStatOld::heronianMean(const real_t A, const real_t B) {
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return (A + sqrt(A * B) + B) / 3;
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}
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real_t MLPPStatOld::contraHarmonicMean(const std::vector<real_t> &x) {
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return lehmerMean(x, 2);
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}
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real_t MLPPStatOld::heinzMean(const real_t A, const real_t B, const real_t x) {
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return (std::pow(A, x) * std::pow(B, 1 - x) + std::pow(A, 1 - x) * std::pow(B, x)) / 2;
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}
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real_t MLPPStatOld::neumanSandorMean(const real_t a, const real_t b) {
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MLPPActivation avn;
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return (a - b) / 2 * avn.arsinh((a - b) / (a + b));
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}
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real_t MLPPStatOld::stolarskyMean(const real_t x, const real_t y, const real_t p) {
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if (x == y) {
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return x;
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}
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return std::pow((std::pow(x, p) - std::pow(y, p)) / (p * (x - y)), 1 / (p - 1));
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}
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real_t MLPPStatOld::identricMean(const real_t x, const real_t y) {
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if (x == y) {
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return x;
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}
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return (1 / M_E) * std::pow(std::pow(x, x) / std::pow(y, y), 1 / (x - y));
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}
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real_t MLPPStatOld::logMean(const real_t x, const real_t y) {
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if (x == y) {
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return x;
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}
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return (y - x) / (log(y) - std::log(x));
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}
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