Functions
double	getResolE (pat::CandKinResolution::Parametrization parametrization, const AlgebraicSymMatrix44 &covariance, const pat::CandKinResolution::LorentzVector &p4)

double	getResolEt (pat::CandKinResolution::Parametrization parametrization, const AlgebraicSymMatrix44 &covariance, const pat::CandKinResolution::LorentzVector &p4)

double	getResolEta (pat::CandKinResolution::Parametrization parametrization, const AlgebraicSymMatrix44 &covariance, const pat::CandKinResolution::LorentzVector &p4)

double	getResolM (pat::CandKinResolution::Parametrization parametrization, const AlgebraicSymMatrix44 &covariance, const pat::CandKinResolution::LorentzVector &p4)

double	getResolP (pat::CandKinResolution::Parametrization parametrization, const AlgebraicSymMatrix44 &covariance, const pat::CandKinResolution::LorentzVector &p4)

double	getResolPhi (pat::CandKinResolution::Parametrization parametrization, const AlgebraicSymMatrix44 &covariance, const pat::CandKinResolution::LorentzVector &p4)

double	getResolPInv (pat::CandKinResolution::Parametrization parametrization, const AlgebraicSymMatrix44 &covariance, const pat::CandKinResolution::LorentzVector &p4)

double	getResolPt (pat::CandKinResolution::Parametrization parametrization, const AlgebraicSymMatrix44 &covariance, const pat::CandKinResolution::LorentzVector &p4)

double	getResolPx (pat::CandKinResolution::Parametrization parametrization, const AlgebraicSymMatrix44 &covariance, const pat::CandKinResolution::LorentzVector &p4)

double	getResolPy (pat::CandKinResolution::Parametrization parametrization, const AlgebraicSymMatrix44 &covariance, const pat::CandKinResolution::LorentzVector &p4)

double	getResolPz (pat::CandKinResolution::Parametrization parametrization, const AlgebraicSymMatrix44 &covariance, const pat::CandKinResolution::LorentzVector &p4)

double	getResolTheta (pat::CandKinResolution::Parametrization parametrization, const AlgebraicSymMatrix44 &covariance, const pat::CandKinResolution::LorentzVector &p4)

void	rescaleForKinFitter (const pat::CandKinResolution::Parametrization parametrization, AlgebraicSymMatrix44 &covariance, const math::XYZTLorentzVector &initialP4)

Function Documentation

double pat::helper::ResolutionHelper::getResolE	(	pat::CandKinResolution::Parametrization	parametrization,
		const AlgebraicSymMatrix44 &	covariance,
		const pat::CandKinResolution::LorentzVector &	p4
	)

Definition at line 276 of file ResolutionHelper.cc.

References a, b, pat::CandKinResolution::Cart, funct::cos(), pat::CandKinResolution::ECart, pat::CandKinResolution::ESpher, pat::CandKinResolution::EtEtaPhi, pat::CandKinResolution::EtThetaPhi, edm::hlt::Exception, pat::CandKinResolution::Invalid, pat::CandKinResolution::MCCart, pat::CandKinResolution::MCPInvSpher, pat::CandKinResolution::MCSpher, AlCaHLTBitMon_ParallelJobs::p, funct::sin(), pat::CandKinResolution::Spher, and mathSSE::sqrt().

Referenced by getResolP(), and pat::CandKinResolution::resolE().

 {
     switch (parametrization) {
         // ======= ENERGY BASED ==========
         case pat::CandKinResolution::ECart:    
         case pat::CandKinResolution::ESpher:
             return sqrt(covariance(3,3));
             // ======= ET BASED ==========
         case pat::CandKinResolution::EtThetaPhi: 
             {
                 // E = Et/Sin(theta)
                 double a = 1.0/sin(p4.Theta()); // dE/dEt
                 double b = - a*a* p4.Et() * cos(p4.Theta()); // dE/dTh
                 return sqrt(a*a*covariance(0,0) + b*b*covariance(1,1) + 2*a*b*covariance(0,1));
             }
         case pat::CandKinResolution::EtEtaPhi: 
             {
                 // E = Et/Sin(Theta(eta))
                 double th = p4.Theta();
                 double a = 1.0/sin(th); // dE/dEt
                 double b =  a* p4.Et() * cos(th);   // dE/dEta: dTh/dEta = - 1.0/sin(theta) = - dE/dEt
                 return sqrt(a*a*covariance(0,0) + b*b*covariance(1,1) + 2*a*b*covariance(0,1));
             }
             // ======= MASS BASED ==========
         case pat::CandKinResolution::Cart:
             {
                 AlgebraicVector4 xoE(p4.X(), p4.Y(), p4.Z(), p4.M()); 
                 xoE *= 1/p4.E();
                 return sqrt(ROOT::Math::Similarity(xoE, covariance));
             }
         case pat::CandKinResolution::MCCart:
             {
                 AlgebraicVector4 xoE(p4.X(), p4.Y(), p4.Z(), 0);
                 xoE *= 1/p4.E();
                 return sqrt(ROOT::Math::Similarity(xoE, covariance));
             }
         case pat::CandKinResolution::Spher:  
             {
                 // E = sqrt(P^2 + m^2)
                 double einv = 1.0/p4.E();
                 double a  = p4.P()*einv; // dE/dP
                 double b  = p4.M()*einv; // dE/dm
                 return sqrt(a*a*covariance(0,0) + b*b*covariance(3,3) + 2*a*b*covariance(0,3));
             }
         case pat::CandKinResolution::MCSpher:  
             {
                 // E = sqrt(P^2 + m^2); |dE/dP| = |P/E| = P/E
                 return p4.P()/p4.E() * sqrt(covariance(0,0));
             }
         case pat::CandKinResolution::MCPInvSpher:   //  
             {
                 // E = sqrt(P^2 + m^2); |dE/d(1/P)| = P^2 |dE/dP| = P^3/E
                 double p = p4.P();
                 return p*p*p/p4.E()*sqrt(covariance(0,0));
             }
             // ======= OTHER ==========
         case pat::CandKinResolution::Invalid:
             throw cms::Exception("Invalid parametrization") << parametrization;
         default:
             throw cms::Exception("Not Implemented") << "getResolE not yet implemented for parametrization " << parametrization ;
     }
 }

double pat::helper::ResolutionHelper::getResolEt	(	pat::CandKinResolution::Parametrization	parametrization,
		const AlgebraicSymMatrix44 &	covariance,
		const pat::CandKinResolution::LorentzVector &	p4
	)

dEt/dPx * Et

Definition at line 340 of file ResolutionHelper.cc.

Referenced by pat::CandKinResolution::resolEt().

 {
     switch (parametrization) {
         // ======= ENERGY BASED ==========
         case pat::CandKinResolution::ECart:    
             {
                 // Et^2 = E^2 * (Pt^2/P^2)  
                 double pt2 = p4.Perp2();
                 double pz2 = ROOT::Math::Square(p4.Pz()), p2 = pt2 + pz2;
                 double e2OverP4 = ROOT::Math::Square(p4.E()/p2);
                 AlgebraicVector4 derivs(p4.Px(), p4.Py(), p4.Pz(), p4.E());
                 derivs    *= (1.0/p4.Et());
                 derivs[0] *=  pz2 * e2OverP4;
                 derivs[1] *=  pz2 * e2OverP4;
                 derivs[2] *= -pt2 * e2OverP4;
                 derivs[3] *=  pt2/p2;
                 return sqrt(ROOT::Math::Similarity(derivs, covariance));
             }
         case pat::CandKinResolution::ESpher:
             {
                 // Et = E * Sin(Theta)
                 double st = sin(p4.Theta()), ct = cos(p4.Theta());
                 return sqrt(  st*st                         * covariance(3,3) +
                               ROOT::Math::Square(ct*p4.E()) * covariance(1,1) + 
                               2*st*ct*p4.E()                * covariance(1,3)
                         );
             }
             // ======= ET BASED ==========
         case pat::CandKinResolution::EtThetaPhi: 
         case pat::CandKinResolution::EtEtaPhi: 
             return sqrt(covariance(0,0));
             // ======= MASS BASED ==========
         case pat::CandKinResolution::Cart:
         case pat::CandKinResolution::MCCart:
             {
                 // Et^2 = E^2 Sin^2(th) = (p^2 + m^2) * (pt^2) / p^2
                 double pt2 = p4.Perp2();
                 double p2  = pt2 + ROOT::Math::Square(p4.Pz());
                 double e2  = p2 + p4.M2();
                 double s2  = pt2/p2, pi2 = 1.0/p2;
                 double et  = sqrt(e2 * s2);
                 AlgebraicVector4 derivs(p4.Px(), p4.Py(), p4.Pz(), p4.M());
                 derivs *= 1.0/et;
                 derivs[0] *= (s2 + e2*pi2*(1.0 - pt2*pi2) );   
                 derivs[1] *= (s2 + e2*pi2*(1.0 - pt2*pi2) );   
                 derivs[2] *= (s2 - e2*pt2*pi2*pi2);    
                 if (parametrization == pat::CandKinResolution::Cart) {
                     derivs[3] *= s2;
                     return sqrt(ROOT::Math::Similarity(derivs, covariance));
                 } else {
                     derivs[3] = 0;
                     return sqrt(ROOT::Math::Similarity(derivs, covariance)); // test if Sub<33> is faster
                 }
             }
         case pat::CandKinResolution::Spher:  
             {
                 // Et = E sin(theta); dE/dM = M/E, dE/dP = P/E
                 double s = sin(p4.Theta()), c = cos(p4.Theta());
                 double e = p4.E(); 
                 AlgebraicVector4 derivs( p4.P()/e * s, e * c, 0, p4.M()/e * s);
                 return sqrt(ROOT::Math::Similarity(derivs, covariance));
             }
         case pat::CandKinResolution::MCSpher:
             {
                 // Et = E sin(theta); dE/dP = P/E
                 double s = sin(p4.Theta()), c = cos(p4.Theta());
                 double e = p4.E(); 
                 double a = p4.P()* s / e;
                 double b = e * c;
                 return sqrt(a*a*covariance(0,0) + b*b*covariance(1,1) + 2*a*b*covariance(0,1));
             }
         case pat::CandKinResolution::MCPInvSpher:   
             {
                 // Et = E sin(theta); dE/dP = P/E -> dE/d(1/P) = - P^2 dE/dP = - P^3 / E
                 double s = sin(p4.Theta()), c = cos(p4.Theta());
                 double p = p4.P(), e = p4.E(); 
                 double a = ( - p * p * p / e ) * s;
                 double b = e * c;
                 return sqrt(a*a*covariance(0,0) + b*b*covariance(1,1) + 2*a*b*covariance(0,1));
             }
             // ======= OTHER ==========
         case pat::CandKinResolution::Invalid:
             throw cms::Exception("Invalid parametrization") << parametrization;
         default:
             throw cms::Exception("Not Implemented") << "getResolEt not yet implemented for parametrization " << parametrization ;
     }
 }

double pat::helper::ResolutionHelper::getResolEta	(	pat::CandKinResolution::Parametrization	parametrization,
		const AlgebraicSymMatrix44 &	covariance,
		const pat::CandKinResolution::LorentzVector &	p4
	)

Definition at line 479 of file ResolutionHelper.cc.

References abs, pat::CandKinResolution::Cart, DetaDtheta(), pat::CandKinResolution::ECart, pat::CandKinResolution::ESpher, pat::CandKinResolution::EtEtaPhi, pat::CandKinResolution::EtThetaPhi, edm::hlt::Exception, getResolTheta(), pat::CandKinResolution::Invalid, pat::CandKinResolution::MCCart, pat::CandKinResolution::MCPInvSpher, pat::CandKinResolution::MCSpher, pat::CandKinResolution::Spher, and mathSSE::sqrt().

Referenced by pat::CandKinResolution::resolEta().

 {
     switch (parametrization) {
         case pat::CandKinResolution::Cart:
         case pat::CandKinResolution::ECart:
         case pat::CandKinResolution::MCCart:
             // dEta = dTheta * dEta/dTheta 
             return abs(DetaDtheta(p4.Theta())) * getResolTheta(parametrization, covariance, p4);
         case pat::CandKinResolution::ESpher:        //  all the ones which have
         case pat::CandKinResolution::MCPInvSpher:   //  theta as parameter 1
         case pat::CandKinResolution::MCSpher:      
         case pat::CandKinResolution::EtThetaPhi: 
         case pat::CandKinResolution::Spher:  
             return sqrt(covariance(1,1))*abs(DetaDtheta(p4.Theta()));
         case pat::CandKinResolution::EtEtaPhi:      // as simple as that
             return sqrt(covariance(1,1));
         case pat::CandKinResolution::Invalid:
             throw cms::Exception("Invalid parametrization") << parametrization;
         default:
             throw cms::Exception("Not Implemented") << "getResolEta not yet implemented for parametrization " << parametrization ;
     }
 }

double pat::helper::ResolutionHelper::getResolM	(	pat::CandKinResolution::Parametrization	parametrization,
		const AlgebraicSymMatrix44 &	covariance,
		const pat::CandKinResolution::LorentzVector &	p4
	)

Definition at line 430 of file ResolutionHelper.cc.

References pat::CandKinResolution::Cart, pat::CandKinResolution::ECart, pat::CandKinResolution::ESpher, pat::CandKinResolution::EtEtaPhi, pat::CandKinResolution::EtThetaPhi, edm::hlt::Exception, pat::CandKinResolution::Invalid, pat::CandKinResolution::MCCart, pat::CandKinResolution::MCPInvSpher, pat::CandKinResolution::MCSpher, pat::CandKinResolution::Spher, and mathSSE::sqrt().

Referenced by pat::CandKinResolution::resolM().

 {
     switch (parametrization) {
         // ====== MASS CONSTRAINED =====
         case pat::CandKinResolution::MCSpher:
         case pat::CandKinResolution::MCPInvSpher:   
         case pat::CandKinResolution::MCCart:
         case pat::CandKinResolution::EtThetaPhi: 
         case pat::CandKinResolution::EtEtaPhi: 
             return 0;
         // ======= MASS BASED ==========
         case pat::CandKinResolution::Cart:
         case pat::CandKinResolution::Spher:  
             return sqrt(covariance(3,3));
         // ======= ENERGY BASED ==========
         case pat::CandKinResolution::ESpher:
             { // M^2 = E^2 - P^2
               double dMdE = p4.E()/p4.M(), dMdP = - p4.P()/p4.M();
               return sqrt(  dMdP*dMdP*covariance(0,0) +
                           2*dMdP*dMdE*covariance(0,3) +
                             dMdE*dMdE*covariance(3,3));
             }
         case pat::CandKinResolution::ECart:    
             { // M^2 = E^2 - sum_i P_i^2
                 AlgebraicVector4 derivs(-p4.Px(), -p4.Py(), -p4.Pz(), p4.E());
                 derivs *= 1.0/p4.M();
                 return sqrt(ROOT::Math::Similarity(derivs, covariance));
             }
             throw cms::Exception("Not Implemented") << "getResolM not yet implemented for parametrization " << parametrization ;
         case pat::CandKinResolution::Invalid:
             throw cms::Exception("Invalid parametrization") << parametrization;
         default:
             throw cms::Exception("Not Implemented") << "getResolM not yet implemented for parametrization " << parametrization ;
     }
 }

double pat::helper::ResolutionHelper::getResolP	(	pat::CandKinResolution::Parametrization	parametrization,
		const AlgebraicSymMatrix44 &	covariance,
		const pat::CandKinResolution::LorentzVector &	p4
	)

Definition at line 37 of file ResolutionHelper.cc.

References pat::CandKinResolution::Cart, pat::CandKinResolution::ECart, pat::CandKinResolution::ESpher, pat::CandKinResolution::EtEtaPhi, pat::CandKinResolution::EtThetaPhi, edm::hlt::Exception, getResolE(), pat::CandKinResolution::Invalid, pat::CandKinResolution::MCCart, pat::CandKinResolution::MCPInvSpher, pat::CandKinResolution::MCSpher, pat::CandKinResolution::Spher, and mathSSE::sqrt().

Referenced by getResolPInv(), and pat::CandKinResolution::resolP().

 {
     switch (parametrization) {
         // ==== CARTESIAN ====
         case pat::CandKinResolution::Cart:
         case pat::CandKinResolution::ECart:
         case pat::CandKinResolution::MCCart:
             {
                 // p2 = px^2 + py^2 + pz^2
                 // dp/dp_i = p_i/p ==> it is a unit vector!
                 AlgebraicVector3 derivs(p4.X(), p4.Y(), p4.Z());
                 derivs.Unit(); 
                 return sqrt(ROOT::Math::Similarity(derivs, covariance.Sub<AlgebraicSymMatrix33>(0,0)));
             }
         // ==== SPHERICAL (P)  ====
         case pat::CandKinResolution::Spher:  
         case pat::CandKinResolution::ESpher:
         case pat::CandKinResolution::MCSpher:      
             return sqrt(covariance(0,0));
         // ==== SPHERICAL (1/P)  ====
         case pat::CandKinResolution::MCPInvSpher:
             return sqrt(covariance(0,0)) * (p4.P2());
         // ==== HEP CYLINDRICAL (with Pt = Et, P = E) ====
         case pat::CandKinResolution::EtThetaPhi: 
         case pat::CandKinResolution::EtEtaPhi:     
             return  getResolE(parametrization,covariance,p4);
         // ==== OTHER ====
         case pat::CandKinResolution::Invalid:
             throw cms::Exception("Invalid parametrization") << parametrization;
         default:
             throw cms::Exception("Not Implemented") << "getResolP not yet implemented for parametrization " << parametrization ;
     }
 }

double pat::helper::ResolutionHelper::getResolPhi	(	pat::CandKinResolution::Parametrization	parametrization,
		const AlgebraicSymMatrix44 &	covariance,
		const pat::CandKinResolution::LorentzVector &	p4
	)

Definition at line 534 of file ResolutionHelper.cc.

References pat::CandKinResolution::Cart, pat::CandKinResolution::ECart, pat::CandKinResolution::ESpher, pat::CandKinResolution::EtEtaPhi, pat::CandKinResolution::EtThetaPhi, edm::hlt::Exception, pat::CandKinResolution::Invalid, pat::CandKinResolution::MCCart, pat::CandKinResolution::MCPInvSpher, pat::CandKinResolution::MCSpher, pat::CandKinResolution::Spher, and mathSSE::sqrt().

Referenced by pat::CandKinResolution::resolPhi().

 {
     double pt2 = p4.Perp2();
     switch (parametrization) {
         case pat::CandKinResolution::Cart:         
         case pat::CandKinResolution::ECart:        
         case pat::CandKinResolution::MCCart:
             return sqrt( ROOT::Math::Square(p4.Px()) * covariance(1,1) +
                          ROOT::Math::Square(p4.Py()) * covariance(0,0) +
                          -2*p4.Px()*p4.Py()          * covariance(0,1)
                     )/pt2;
         case pat::CandKinResolution::ESpher:        //  all the ones which have
         case pat::CandKinResolution::MCPInvSpher:   //  phi as parameter 2
         case pat::CandKinResolution::MCSpher:      
         case pat::CandKinResolution::EtThetaPhi: 
         case pat::CandKinResolution::Spher:  
         case pat::CandKinResolution::EtEtaPhi:      
             return sqrt(covariance(2,2)); 
         case pat::CandKinResolution::Invalid:
             throw cms::Exception("Invalid parametrization") << parametrization;
         default:
             throw cms::Exception("Not Implemented") << "getResolPhi not yet implemented for parametrization " << parametrization ;
     }
 }

double pat::helper::ResolutionHelper::getResolPInv	(	pat::CandKinResolution::Parametrization	parametrization,
		const AlgebraicSymMatrix44 &	covariance,
		const pat::CandKinResolution::LorentzVector &	p4
	)

Definition at line 115 of file ResolutionHelper.cc.

References pat::CandKinResolution::Cart, pat::CandKinResolution::ECart, pat::CandKinResolution::ESpher, pat::CandKinResolution::EtEtaPhi, pat::CandKinResolution::EtThetaPhi, edm::hlt::Exception, getResolP(), pat::CandKinResolution::Invalid, pat::CandKinResolution::MCCart, pat::CandKinResolution::MCPInvSpher, pat::CandKinResolution::MCSpher, pat::CandKinResolution::Spher, and mathSSE::sqrt().

Referenced by pat::CandKinResolution::resolPInv().

 {
      switch (parametrization) {
         // ==== SPHERICAL (P)  ====
         case pat::CandKinResolution::Spher:  
         case pat::CandKinResolution::ESpher:
         case pat::CandKinResolution::MCSpher:      
             return 1.0/p4.P2() * sqrt(covariance(0,0));
         // ==== SPHERICAL (1/P)  ====
         case pat::CandKinResolution::MCPInvSpher:
             return sqrt(covariance(0,0));
         // ==== OTHER ====
         case pat::CandKinResolution::Cart:
         case pat::CandKinResolution::ECart:
         case pat::CandKinResolution::MCCart:
         case pat::CandKinResolution::EtThetaPhi: 
         case pat::CandKinResolution::EtEtaPhi:
             return 1.0/p4.P2() * getResolP(parametrization, covariance, p4);
         case pat::CandKinResolution::Invalid:
             throw cms::Exception("Invalid parametrization") << parametrization;
         default:
             throw cms::Exception("Not Implemented") << "getResolPInv not yet implemented for parametrization " << parametrization ;
     }
 }

double pat::helper::ResolutionHelper::getResolPt	(	pat::CandKinResolution::Parametrization	parametrization,
		const AlgebraicSymMatrix44 &	covariance,
		const pat::CandKinResolution::LorentzVector &	p4
	)

Definition at line 71 of file ResolutionHelper.cc.

References a, b, pat::CandKinResolution::Cart, funct::cos(), pat::CandKinResolution::ECart, pat::CandKinResolution::ESpher, pat::CandKinResolution::EtEtaPhi, pat::CandKinResolution::EtThetaPhi, edm::hlt::Exception, pat::CandKinResolution::Invalid, pat::CandKinResolution::MCCart, pat::CandKinResolution::MCPInvSpher, pat::CandKinResolution::MCSpher, AlCaHLTBitMon_ParallelJobs::p, funct::sin(), pat::CandKinResolution::Spher, and mathSSE::sqrt().

Referenced by pat::CandKinResolution::resolPt().

 {
      switch (parametrization) {
         // ==== CARTESIAN ====
         case pat::CandKinResolution::Cart:
         case pat::CandKinResolution::ECart:
         case pat::CandKinResolution::MCCart:
             {
                 double pti2 = 1.0/(p4.Perp2());
                 return sqrt(   (  covariance(0,0) * p4.Px()*p4.Px() +
                                   covariance(1,1) * p4.Py()*p4.Py() +
                                 2*covariance(0,1) * p4.Px()*p4.Py()) * pti2 );
             }
         // ==== SPHERICAL (P, Theta)  ====
         case pat::CandKinResolution::Spher:  
         case pat::CandKinResolution::ESpher:
         case pat::CandKinResolution::MCSpher:      
             {
                 // pt = p * sin(theta)
                 double a = sin(p4.Theta());
                 double b = p4.P() * cos(p4.Theta());
                 return sqrt(a*a*covariance(0,0)  + b*b*covariance(1,1) + 2*a*b*covariance(0,1));
             }
         // ==== SPHERICAL (1/P)  ====
         case pat::CandKinResolution::MCPInvSpher:
             {
                 // pt = (1/pi) * sin(theta)
                 double p = p4.P(); 
                 double a = - (p*p) * sin(p4.Theta());
                 double b = p * cos(p4.Theta());
                 return sqrt(a*a*covariance(0,0)  + b*b*covariance(1,1) + 2*a*b*covariance(0,1));
             }
         // ==== HEP CYLINDRICAL (with Pt = Et) ====
         case pat::CandKinResolution::EtThetaPhi: 
         case pat::CandKinResolution::EtEtaPhi:
             return sqrt(covariance(0,0));
         case pat::CandKinResolution::Invalid:
             throw cms::Exception("Invalid parametrization") << parametrization;
         default:
             throw cms::Exception("Not Implemented") << "getResolPt not yet implemented for parametrization " << parametrization ;
     }
 }

double pat::helper::ResolutionHelper::getResolPx	(	pat::CandKinResolution::Parametrization	parametrization,
		const AlgebraicSymMatrix44 &	covariance,
		const pat::CandKinResolution::LorentzVector &	p4
	)

Definition at line 141 of file ResolutionHelper.cc.

References a, b, pat::CandKinResolution::Cart, funct::cos(), pat::CandKinResolution::ECart, pat::CandKinResolution::ESpher, pat::CandKinResolution::EtEtaPhi, pat::CandKinResolution::EtThetaPhi, edm::hlt::Exception, pat::CandKinResolution::Invalid, pat::CandKinResolution::MCCart, pat::CandKinResolution::MCPInvSpher, pat::CandKinResolution::MCSpher, AlCaHLTBitMon_ParallelJobs::p, funct::sin(), pat::CandKinResolution::Spher, and mathSSE::sqrt().

Referenced by pat::CandKinResolution::resolPx().

 {
      switch (parametrization) {
         // ==== CARTESIAN ====
         case pat::CandKinResolution::Cart:
         case pat::CandKinResolution::ECart:
         case pat::CandKinResolution::MCCart:
             return sqrt(covariance(0,0));
         // ==== SPHERICAL (P)  ====
         case pat::CandKinResolution::Spher:  
         case pat::CandKinResolution::ESpher:
         case pat::CandKinResolution::MCSpher:      
         case pat::CandKinResolution::MCPInvSpher:
             {
                 // Px = P * sin(theta) * cos(phi)
                 double p = p4.P();
                 AlgebraicVector3 derivs; 
                 derivs[0] = sin(p4.Theta()) * cos(p4.Phi()); // now let's hope gcc does common subexpr optimiz.
                 if (parametrization == pat::CandKinResolution::MCPInvSpher) {
                     derivs[0] *= -(p*p);
                 } 
                 derivs[1] = p *  cos(p4.Theta()) * cos(p4.Phi()); 
                 derivs[2] = p *  sin(p4.Theta()) * -sin(p4.Phi()); 
                 return sqrt(ROOT::Math::Similarity(derivs, covariance.Sub<AlgebraicSymMatrix33>(0,0)));
             }
         // ==== HEP CYLINDRICAL (with Pt = Et) ====
         case pat::CandKinResolution::EtThetaPhi: 
         case pat::CandKinResolution::EtEtaPhi:
             {
                 // Px = Pt * cos(phi)
                 double a = cos(p4.Phi());
                 double b = - p4.Pt() * sin(p4.Phi());
                 return sqrt(a*a*covariance(0,0) + 2*a*b*covariance(2,0) + b*b*covariance(2,2));
             }
         // ==== OTHERS ====
         case pat::CandKinResolution::Invalid:
             throw cms::Exception("Invalid parametrization") << parametrization;
         default:
             throw cms::Exception("Not Implemented") << "getResolPx not yet implemented for parametrization " << parametrization ;
     }
 }

double pat::helper::ResolutionHelper::getResolPy	(	pat::CandKinResolution::Parametrization	parametrization,
		const AlgebraicSymMatrix44 &	covariance,
		const pat::CandKinResolution::LorentzVector &	p4
	)

Definition at line 183 of file ResolutionHelper.cc.

References a, b, pat::CandKinResolution::Cart, funct::cos(), pat::CandKinResolution::ECart, pat::CandKinResolution::ESpher, pat::CandKinResolution::EtEtaPhi, pat::CandKinResolution::EtThetaPhi, edm::hlt::Exception, pat::CandKinResolution::Invalid, pat::CandKinResolution::MCCart, pat::CandKinResolution::MCPInvSpher, pat::CandKinResolution::MCSpher, AlCaHLTBitMon_ParallelJobs::p, funct::sin(), pat::CandKinResolution::Spher, and mathSSE::sqrt().

Referenced by pat::CandKinResolution::resolPy().

 {
      switch (parametrization) {
         // ==== CARTESIAN ====
         case pat::CandKinResolution::Cart:
         case pat::CandKinResolution::ECart:
         case pat::CandKinResolution::MCCart:
             return sqrt(covariance(1,1));
         // ==== SPHERICAL (P)  ====
         case pat::CandKinResolution::Spher:  
         case pat::CandKinResolution::ESpher:
         case pat::CandKinResolution::MCSpher:      
         case pat::CandKinResolution::MCPInvSpher:
             {
                 // Py = P * sin(theta) * sin(phi)
                 double p = p4.P();
                 AlgebraicVector3 derivs; 
                 derivs[0] = sin(p4.Theta()) * sin(p4.Phi()); // now let's hope gcc does common subexpr optimiz.
                 if (parametrization == pat::CandKinResolution::MCPInvSpher) {
                     derivs[0] *= -(p*p);
                 }
                 derivs[1] = p *  cos(p4.Theta()) * sin(p4.Phi()); 
                 derivs[2] = p *  sin(p4.Theta()) * cos(p4.Phi()); 
                 return sqrt(ROOT::Math::Similarity(derivs, covariance.Sub<AlgebraicSymMatrix33>(0,0)));
             }
         // ==== HEP CYLINDRICAL (with Pt = Et) ====
         case pat::CandKinResolution::EtThetaPhi: 
         case pat::CandKinResolution::EtEtaPhi:
             {
                 // Py = Pt * sin(phi)
                 double a = sin(p4.Phi());
                 double b = p4.Pt() * cos(p4.Phi());
                 return sqrt(a*a*covariance(0,0) + 2*a*b*covariance(2,0) + b*b*covariance(2,2));
             }
         // ==== OTHERS ====
         case pat::CandKinResolution::Invalid:
             throw cms::Exception("Invalid parametrization") << parametrization;
         default:
             throw cms::Exception("Not Implemented") << "getResolPy not yet implemented for parametrization " << parametrization ;
     }
 }

double pat::helper::ResolutionHelper::getResolPz	(	pat::CandKinResolution::Parametrization	parametrization,
		const AlgebraicSymMatrix44 &	covariance,
		const pat::CandKinResolution::LorentzVector &	p4
	)

Definition at line 225 of file ResolutionHelper.cc.

References a, b, trackerHits::c, pat::CandKinResolution::Cart, funct::cos(), pat::CandKinResolution::ECart, pat::CandKinResolution::ESpher, pat::CandKinResolution::EtEtaPhi, pat::CandKinResolution::EtThetaPhi, edm::hlt::Exception, pat::CandKinResolution::Invalid, pat::CandKinResolution::MCCart, pat::CandKinResolution::MCPInvSpher, pat::CandKinResolution::MCSpher, AlCaHLTBitMon_ParallelJobs::p, alignCSCRings::s, funct::sin(), pat::CandKinResolution::Spher, and mathSSE::sqrt().

Referenced by pat::CandKinResolution::resolPz().

 {
      switch (parametrization) {
         // ==== CARTESIAN ====
         case pat::CandKinResolution::Cart:
         case pat::CandKinResolution::ECart:
         case pat::CandKinResolution::MCCart:
             return sqrt(covariance(2,2));
         // ==== SPHERICAL (P)  ====
         case pat::CandKinResolution::Spher:  
         case pat::CandKinResolution::ESpher:
         case pat::CandKinResolution::MCSpher:      
             {
                 // Pz = P * cos(theta) 
                 double a = cos(p4.Theta());
                 double b = -p4.P() * sin(p4.Theta());
                 return sqrt(a*a*covariance(0,0) + 2*a*b*covariance(1,0) + b*b*covariance(1,1));
             }
         case pat::CandKinResolution::MCPInvSpher:
             {
                 // Pz = P * cos(theta) 
                 double p = p4.P(); 
                 double a = -p*p*cos(p4.Theta());
                 double b = -p * sin(p4.Theta());
                 return sqrt(a*a*covariance(0,0) + 2*a*b*covariance(1,0) + b*b*covariance(1,1));
             }
         // ==== HEP CYLINDRICAL (with Pt = Et) ====
         case pat::CandKinResolution::EtThetaPhi: 
             {
                 // Pz = Pt * ctg(theta)    d ctg(x) = -1/sin^2(x)    
                 double s = sin(p4.Theta()), c = cos(p4.Theta());
                 double a = c/s;
                 double b = - p4.Pt() / (s*s);
                 return sqrt(a*a*covariance(0,0) + 2*a*b*covariance(1,0) + b*b*covariance(1,1));
             }
         case pat::CandKinResolution::EtEtaPhi:
             {
                 // Pz = Pt * sinh(eta)
                 double a = sinh(p4.Eta());
                 double b = p4.Et() * cosh(p4.Eta());
                 return sqrt(a*a*covariance(0,0) + 2*a*b*covariance(1,0) + b*b*covariance(1,1));
             }
         // ==== OTHERS ====
         case pat::CandKinResolution::Invalid:
             throw cms::Exception("Invalid parametrization") << parametrization;
         default:
             throw cms::Exception("Not Implemented") << "getResolPz not yet implemented for parametrization " << parametrization ;
     }
 }

double pat::helper::ResolutionHelper::getResolTheta	(	pat::CandKinResolution::Parametrization	parametrization,
		const AlgebraicSymMatrix44 &	covariance,
		const pat::CandKinResolution::LorentzVector &	p4
	)

Definition at line 502 of file ResolutionHelper.cc.

References abs, pat::CandKinResolution::Cart, DthetaDeta(), pat::CandKinResolution::ECart, pat::CandKinResolution::ESpher, pat::CandKinResolution::EtEtaPhi, pat::CandKinResolution::EtThetaPhi, edm::hlt::Exception, pat::CandKinResolution::Invalid, pat::CandKinResolution::MCCart, pat::CandKinResolution::MCPInvSpher, pat::CandKinResolution::MCSpher, AlCaHLTBitMon_ParallelJobs::p, pi, pat::CandKinResolution::Spher, and mathSSE::sqrt().

Referenced by getResolEta(), and pat::CandKinResolution::resolTheta().

 {
     switch (parametrization) {
         case pat::CandKinResolution::Cart:
         case pat::CandKinResolution::ECart:
         case pat::CandKinResolution::MCCart:
             {
                 // theta = acos( pz / p )        ; d acos(x) = - 1 / sqrt( 1 - x*x) dx = - p/pt dx
                 double pt2 = p4.Perp2();
                 double p   = p4.P(), pi = 1.0/p, pi3 = pi*pi*pi;
                 double dacos = - p/sqrt(pt2);
                 AlgebraicVector3 derivs;
                 derivs[0] = -p4.Px() * p4.Pz() * dacos * pi3;
                 derivs[1] = -p4.Py() * p4.Pz() * dacos * pi3;
                 derivs[2] =  pt2 * dacos * pi3;
                 return sqrt(ROOT::Math::Similarity(derivs, covariance.Sub<AlgebraicSymMatrix33>(0,0)));
             }
         case pat::CandKinResolution::ESpher:        //  all the ones which have
         case pat::CandKinResolution::MCPInvSpher:   //  theta as parameter 1
         case pat::CandKinResolution::MCSpher:      
         case pat::CandKinResolution::EtThetaPhi: 
         case pat::CandKinResolution::Spher:  
             return sqrt(covariance(1,1)); 
         case pat::CandKinResolution::EtEtaPhi:      
             return sqrt(covariance(1,1))*abs(DthetaDeta(p4.Eta())); 
         case pat::CandKinResolution::Invalid:
             throw cms::Exception("Invalid parametrization") << parametrization;
         default:
             throw cms::Exception("Not Implemented") << "getResolTheta not yet implemented for parametrization " << parametrization ;
     }
 }

void pat::helper::ResolutionHelper::rescaleForKinFitter	(	const pat::CandKinResolution::Parametrization	parametrization,
		AlgebraicSymMatrix44 &	covariance,
		const math::XYZTLorentzVector &	initialP4
	)

Definition at line 9 of file ResolutionHelper.cc.

References pat::CandKinResolution::Cart, pat::CandKinResolution::ESpher, i, python.tagInventory::inv, and pat::CandKinResolution::Spher.

 {
     double inv;
     switch (parametrization) {
         case pat::CandKinResolution::Cart:         
         case pat::CandKinResolution::Spher:  
             // for us parameter[3] = mass, for KinFitter parameter[3] = mass/initialP4.mass();
             inv = 1.0/initialP4.mass();
             for (int i = 0; i < 4; i++) {
                 covariance(3,i) *= inv;
             }
             covariance(3,3) *= inv; 
             break;
         case pat::CandKinResolution::ESpher:       
              // for us parameter[3] = energy, for KinFitter parameter[3] = energy/initialP4.energy();
             inv = 1.0/initialP4.energy();
             for (int i = 0; i < 4; i++) {
                 covariance(3,i) *= inv;
             }
             covariance(3,3) *= inv; 
             break;
        default:
             ;// nothing to do
     }
 }

Functions

Function Documentation