}
catch(exception& e) {
- m->errorOut(e, "LinearAlgebra", "calculateEuclidianDistance");
+ m->errorOut(e, "LinearAlgebra", "calcPearson");
+ exit(1);
+ }
+}
+/*********************************************************************************************************************************/
+//assumes both matrices are square and the same size
+double LinearAlgebra::calcSpearman(vector< vector<double> >& euclidDists, vector< vector<double> >& userDists){
+ try {
+ double r;
+
+ //format data
+ map<float, int> tableX;
+ map<float, int>::iterator itTable;
+ vector<spearmanRank> scores;
+
+ for (int i = 0; i < euclidDists.size(); i++) {
+ for (int j = 0; j < i; j++) {
+ spearmanRank member(toString(scores.size()), euclidDists[i][j]);
+ scores.push_back(member);
+
+ //count number of repeats
+ itTable = tableX.find(euclidDists[i][j]);
+ if (itTable == tableX.end()) {
+ tableX[euclidDists[i][j]] = 1;
+ }else {
+ tableX[euclidDists[i][j]]++;
+ }
+ }
+ }
+
+ //sort scores
+ sort(scores.begin(), scores.end(), compareSpearman);
+
+ //calc LX
+ double Lx = 0.0;
+ for (itTable = tableX.begin(); itTable != tableX.end(); itTable++) {
+ double tx = (double) itTable->second;
+ Lx += ((pow(tx, 3.0) - tx) / 12.0);
+ }
+
+ //find ranks of xi
+ map<string, float> rankEuclid;
+ vector<spearmanRank> ties;
+ int rankTotal = 0;
+ for (int j = 0; j < scores.size(); j++) {
+ rankTotal += (j+1);
+ ties.push_back(scores[j]);
+
+ if (j != (scores.size()-1)) { // you are not the last so you can look ahead
+ if (scores[j].score != scores[j+1].score) { // you are done with ties, rank them and continue
+
+ for (int k = 0; k < ties.size(); k++) {
+ float thisrank = rankTotal / (float) ties.size();
+ rankEuclid[ties[k].name] = thisrank;
+ }
+ ties.clear();
+ rankTotal = 0;
+ }
+ }else { // you are the last one
+
+ for (int k = 0; k < ties.size(); k++) {
+ float thisrank = rankTotal / (float) ties.size();
+ rankEuclid[ties[k].name] = thisrank;
+ }
+ }
+ }
+
+
+ //format data
+ map<float, int> tableY;
+ scores.clear();
+
+ for (int i = 0; i < userDists.size(); i++) {
+ for (int j = 0; j < i; j++) {
+ spearmanRank member(toString(scores.size()), userDists[i][j]);
+ scores.push_back(member);
+
+ //count number of repeats
+ itTable = tableY.find(userDists[i][j]);
+ if (itTable == tableY.end()) {
+ tableY[userDists[i][j]] = 1;
+ }else {
+ tableY[userDists[i][j]]++;
+ }
+ }
+ }
+
+ //sort scores
+ sort(scores.begin(), scores.end(), compareSpearman);
+
+ //calc LX
+ double Ly = 0.0;
+ for (itTable = tableY.begin(); itTable != tableY.end(); itTable++) {
+ double ty = (double) itTable->second;
+ Ly += ((pow(ty, 3.0) - ty) / 12.0);
+ }
+
+ //find ranks of yi
+ map<string, float> rankUser;
+ ties.clear();
+ rankTotal = 0;
+ for (int j = 0; j < scores.size(); j++) {
+ rankTotal += (j+1);
+ ties.push_back(scores[j]);
+
+ if (j != (scores.size()-1)) { // you are not the last so you can look ahead
+ if (scores[j].score != scores[j+1].score) { // you are done with ties, rank them and continue
+
+ for (int k = 0; k < ties.size(); k++) {
+ float thisrank = rankTotal / (float) ties.size();
+ rankUser[ties[k].name] = thisrank;
+ }
+ ties.clear();
+ rankTotal = 0;
+ }
+ }else { // you are the last one
+
+ for (int k = 0; k < ties.size(); k++) {
+ float thisrank = rankTotal / (float) ties.size();
+ rankUser[ties[k].name] = thisrank;
+ }
+ }
+ }
+
+
+ double di = 0.0;
+ int count = 0;
+ for (int i = 0; i < userDists.size(); i++) {
+ for (int j = 0; j < i; j++) {
+
+ float xi = rankEuclid[toString(count)];
+ float yi = rankUser[toString(count)];
+
+ di += ((xi - yi) * (xi - yi));
+
+ count++;
+ }
+ }
+
+ double n = (double) count;
+
+ double SX2 = ((pow(n, 3.0) - n) / 12.0) - Lx;
+ double SY2 = ((pow(n, 3.0) - n) / 12.0) - Ly;
+
+ r = (SX2 + SY2 - di) / (2.0 * sqrt((SX2*SY2)));
+
+ //divide by zero error
+ if (isnan(r) || isinf(r)) { r = 0.0; }
+
+ return r;
+
+ }
+ catch(exception& e) {
+ m->errorOut(e, "LinearAlgebra", "calcSpearman");
+ exit(1);
+ }
+}
+
+/*********************************************************************************************************************************/
+//assumes both matrices are square and the same size
+double LinearAlgebra::calcKendall(vector< vector<double> >& euclidDists, vector< vector<double> >& userDists){
+ try {
+ double r;
+
+ //format data
+ vector<spearmanRank> scores;
+ for (int i = 0; i < euclidDists.size(); i++) {
+ for (int j = 0; j < i; j++) {
+ spearmanRank member(toString(scores.size()), euclidDists[i][j]);
+ scores.push_back(member);
+ }
+ }
+
+ //sort scores
+ sort(scores.begin(), scores.end(), compareSpearman);
+
+ //find ranks of xi
+ map<string, float> rankEuclid;
+ vector<spearmanRank> ties;
+ int rankTotal = 0;
+ for (int j = 0; j < scores.size(); j++) {
+ rankTotal += (j+1);
+ ties.push_back(scores[j]);
+
+ if (j != (scores.size()-1)) { // you are not the last so you can look ahead
+ if (scores[j].score != scores[j+1].score) { // you are done with ties, rank them and continue
+
+ for (int k = 0; k < ties.size(); k++) {
+ float thisrank = rankTotal / (float) ties.size();
+ rankEuclid[ties[k].name] = thisrank;
+ }
+ ties.clear();
+ rankTotal = 0;
+ }
+ }else { // you are the last one
+
+ for (int k = 0; k < ties.size(); k++) {
+ float thisrank = rankTotal / (float) ties.size();
+ rankEuclid[ties[k].name] = thisrank;
+ }
+ }
+ }
+
+ vector<spearmanRank> scoresUser;
+ for (int i = 0; i < userDists.size(); i++) {
+ for (int j = 0; j < i; j++) {
+ spearmanRank member(toString(scoresUser.size()), userDists[i][j]);
+ scoresUser.push_back(member);
+ }
+ }
+
+ //sort scores
+ sort(scoresUser.begin(), scoresUser.end(), compareSpearman);
+
+ //find ranks of yi
+ map<string, float> rankUser;
+ ties.clear();
+ rankTotal = 0;
+ for (int j = 0; j < scoresUser.size(); j++) {
+ rankTotal += (j+1);
+ ties.push_back(scoresUser[j]);
+
+ if (j != (scoresUser.size()-1)) { // you are not the last so you can look ahead
+ if (scoresUser[j].score != scoresUser[j+1].score) { // you are done with ties, rank them and continue
+
+ for (int k = 0; k < ties.size(); k++) {
+ float thisrank = rankTotal / (float) ties.size();
+ rankUser[ties[k].name] = thisrank;
+ }
+ ties.clear();
+ rankTotal = 0;
+ }
+ }else { // you are the last one
+
+ for (int k = 0; k < ties.size(); k++) {
+ float thisrank = rankTotal / (float) ties.size();
+ rankUser[ties[k].name] = thisrank;
+ }
+ }
+ }
+
+ int numCoor = 0;
+ int numDisCoor = 0;
+
+ //order user ranks
+ vector<spearmanRank> user;
+ for (int l = 0; l < scores.size(); l++) {
+ spearmanRank member(scores[l].name, rankUser[scores[l].name]);
+ user.push_back(member);
+ }
+
+ int count = 0;
+ for (int l = 0; l < scores.size(); l++) {
+
+ int numWithHigherRank = 0;
+ int numWithLowerRank = 0;
+ float thisrank = user[l].score;
+
+ for (int u = l+1; u < scores.size(); u++) {
+ if (user[u].score > thisrank) { numWithHigherRank++; }
+ else if (user[u].score < thisrank) { numWithLowerRank++; }
+ count++;
+ }
+
+ numCoor += numWithHigherRank;
+ numDisCoor += numWithLowerRank;
+ }
+
+ r = (numCoor - numDisCoor) / (float) count;
+
+ //divide by zero error
+ if (isnan(r) || isinf(r)) { r = 0.0; }
+
+ return r;
+
+ }
+ catch(exception& e) {
+ m->errorOut(e, "LinearAlgebra", "calcKendall");
exit(1);
}
}
+
/*********************************************************************************************************************************/