// @(#)root/mathcore:$Id: PtEtaPhiE4D.h 22516 2008-03-07 15:14:26Z moneta $
// Authors: W. Brown, M. Fischler, L. Moneta    2005  

/**********************************************************************
*                                                                    *
* Copyright (c) 2005 , LCG ROOT FNAL MathLib Team                    *
*                                                                    *
*                                                                    *
**********************************************************************/

// Header file for class PtEtaPhiE4D
// 
// Created by: fischler at Wed Jul 20 2005
//   based on CylindricalEta4D by moneta
// 
// Last update: $Id: PtEtaPhiE4D.h 22516 2008-03-07 15:14:26Z moneta $
// 
#ifndef ROOT_Math_GenVector_PtEtaPhiE4D 
#define ROOT_Math_GenVector_PtEtaPhiE4D  1

#ifndef ROOT_Math_Math
#include "Math/Math.h"
#endif

#ifndef ROOT_Math_GenVector_etaMax
#include "Math/GenVector/etaMax.h"
#endif

#ifndef ROOT_Math_GenVector_GenVector_exception 
#include "Math/GenVector/GenVector_exception.h"
#endif



//#define TRACE_CE
#ifdef TRACE_CE
#include <iostream>
#endif



namespace ROOT {   

namespace Math { 
       
//__________________________________________________________________________________________
/** 
    Class describing a 4D cylindrical coordinate system
    using Pt , Phi, Eta and E (or rho, phi, eta , T) 
    The metric used is (-,-,-,+). 
    Phi is restricted to be in the range [-PI,PI)
    
    @ingroup GenVector
*/ 

template <class ScalarType> 
class PtEtaPhiE4D { 

public : 

   typedef ScalarType Scalar;

   // --------- Constructors ---------------

   /**
      Default constructor gives zero 4-vector  
   */
   PtEtaPhiE4D() : fPt(0), fEta(0), fPhi(0), fE(0) { }

   /**
      Constructor  from pt, eta, phi, e values
   */
   PtEtaPhiE4D(Scalar pt, Scalar eta, Scalar phi, Scalar e) : 
      fPt(pt), fEta(eta), fPhi(phi), fE(e) { Restrict(); }

   /**
      Generic constructor from any 4D coordinate system implementing 
      Pt(), Eta(), Phi() and E()  
   */ 
   template <class CoordSystem > 
   explicit PtEtaPhiE4D(const CoordSystem & c) : 
      fPt(c.Pt()), fEta(c.Eta()), fPhi(c.Phi()), fE(c.E())  { }

   // for g++  3.2 and 3.4 on 32 bits found that the compiler generated copy ctor and assignment are much slower 
   // so we decided to re-implement them ( there is no no need to have them with g++4)

   /**
      copy constructor
    */
   PtEtaPhiE4D(const PtEtaPhiE4D & v) : 
      fPt(v.fPt), fEta(v.fEta), fPhi(v.fPhi), fE(v.fE) { }
      
   /**
      assignment operator 
    */
   PtEtaPhiE4D & operator = (const PtEtaPhiE4D & v) { 
      fPt  = v.fPt;  
      fEta = v.fEta;  
      fPhi = v.fPhi;  
      fE   = v.fE;
      return *this;
   }


   /**
      Set internal data based on an array of 4 Scalar numbers
   */ 
   void SetCoordinates( const Scalar src[] ) 
   { fPt=src[0]; fEta=src[1]; fPhi=src[2]; fE=src[3]; Restrict(); }

   /**
      get internal data into an array of 4 Scalar numbers
   */ 
   void GetCoordinates( Scalar dest[] ) const 
   { dest[0] = fPt; dest[1] = fEta; dest[2] = fPhi; dest[3] = fE; }

   /**
      Set internal data based on 4 Scalar numbers
   */ 
   void SetCoordinates(Scalar pt, Scalar eta, Scalar phi, Scalar e) 
   { fPt=pt; fEta = eta; fPhi = phi; fE = e; Restrict(); }

   /**
      get internal data into 4 Scalar numbers
   */ 
   void 
   GetCoordinates(Scalar& pt, Scalar & eta, Scalar & phi, Scalar& e) const 
   { pt=fPt; eta=fEta; phi = fPhi; e = fE; }

   // --------- Coordinates and Coordinate-like Scalar properties -------------

   // 4-D Cylindrical eta coordinate accessors  

   Scalar Pt()  const { return fPt;  }
   Scalar Eta() const { return fEta; }
   Scalar Phi() const { return fPhi; }
   Scalar E()   const { return fE;   }

   Scalar Perp()const { return Pt(); }
   Scalar Rho() const { return Pt(); }
   Scalar T()   const { return E();  }
  
   // other coordinate representation

   Scalar Px() const { return fPt*cos(fPhi);}
   Scalar X () const { return Px();         }
   Scalar Py() const { return fPt*sin(fPhi);}
   Scalar Y () const { return Py();         }
   Scalar Pz() const {
      return fPt >   0 ? fPt*std::sinh(fEta)     : 
         fEta == 0 ? 0                       :
         fEta >  0 ? fEta - etaMax<Scalar>() :
         fEta + etaMax<Scalar>() ; 
   }
   Scalar Z () const { return Pz(); }

   /** 
       magnitude of momentum
   */
   Scalar P() const { 
      return  fPt  > 0                 ?  fPt*std::cosh(fEta)       :
         fEta >  etaMax<Scalar>() ?  fEta - etaMax<Scalar>()   :
         fEta < -etaMax<Scalar>() ? -fEta - etaMax<Scalar>()   :
         0                         ; 
   }
   Scalar R() const { return P(); }

   /** 
       squared magnitude of spatial components (momentum squared)
   */
   Scalar P2() const { Scalar p = P(); return p*p; }

   /**
      vector magnitude squared (or mass squared)
   */
   Scalar M2() const { Scalar p = P(); return fE*fE - p*p; }
   Scalar Mag2() const { return M2(); } 

   /**
      invariant mass 
   */
   Scalar M() const    { 
      Scalar mm = M2();
      if (mm >= 0) {
         return std::sqrt(mm);
      } else {
         GenVector_exception e ("PtEtaPhiE4D::M() - Tachyonic:\n"
                                "    Pt and Eta give P such that P^2 > E^2, so the mass would be imaginary");
         Throw(e);  
         return -std::sqrt(-mm);
      }
   }
   Scalar Mag() const    { return M(); }

   /** 
       transverse spatial component squared  
   */
   Scalar Pt2()   const { return fPt*fPt;}
   Scalar Perp2() const { return Pt2();  }

   /** 
       transverse mass squared
   */
   Scalar Mt2() const {  Scalar pz = Pz(); return fE*fE  - pz*pz; } 

   /**
      transverse mass
   */
   Scalar Mt() const { 
      Scalar mm = Mt2();
      if (mm >= 0) {
         return std::sqrt(mm);
      } else {
         GenVector_exception e ("PtEtaPhiE4D::Mt() - Tachyonic:\n"
                                "    Pt and Eta give Pz such that Pz^2 > E^2, so the mass would be imaginary");
         Throw(e);  
         return -std::sqrt(-mm);
      }
   } 

   /**
      transverse energy
   */
   /**
      transverse energy
   */
   Scalar Et() const { 
      return fE / std::cosh(fEta); // faster using eta
   }

   /** 
       transverse energy squared
   */
   Scalar Et2() const { Scalar et = Et(); return et*et; }


private:
   inline static Scalar pi() { return M_PI; } 
   inline void Restrict() {
      if ( fPhi <= -pi() || fPhi > pi() ) 
         fPhi = fPhi - std::floor( fPhi/(2*pi()) +.5 ) * 2*pi();
      return;
   } 
public:

   /**
      polar angle
   */
   Scalar Theta() const {
      if (fPt  >  0) return 2* std::atan( exp( - fEta ) );
      if (fEta >= 0) return 0;
      return pi();
   }

   // --------- Set Coordinates of this system  ---------------

   /**
      set Pt value 
   */
   void SetPt( Scalar  pt) { 
      fPt = pt; 
   }
   /**
      set eta value 
   */
   void SetEta( Scalar  eta) { 
      fEta = eta; 
   }
   /**
      set phi value 
   */
   void SetPhi( Scalar  phi) { 
      fPhi = phi; 
      Restrict();
   }
   /**
      set E value 
   */
   void SetE( Scalar  e) { 
      fE = e; 
   }

   /** 
       set values using cartesian coordinate system  
   */
   void SetPxPyPzE(Scalar px, Scalar py, Scalar pz, Scalar e);


   // ------ Manipulations -------------

   /**
      negate the 4-vector
   */
   void Negate( ) { fPhi = - fPhi; fEta = - fEta; fE = - fE; }

   /**
      Scale coordinate values by a scalar quantity a
   */
   void Scale( Scalar a) { 
      if (a < 0) {
         Negate(); a = -a;
      }
      fPt *= a; 
      fE  *= a; 
   }

   /**
      Assignment from a generic coordinate system implementing 
      Pt(), Eta(), Phi() and E()  
   */ 
   template <class CoordSystem > 
   PtEtaPhiE4D & operator = (const CoordSystem & c) { 
      fPt  = c.Pt(); 
      fEta = c.Eta();
      fPhi = c.Phi(); 
      fE   = c.E(); 
      return *this;
   }

   /**
      Exact equality
   */  
   bool operator == (const PtEtaPhiE4D & rhs) const {
      return fPt == rhs.fPt && fEta == rhs.fEta 
         && fPhi == rhs.fPhi && fE == rhs.fE;
   }
   bool operator != (const PtEtaPhiE4D & rhs) const {return !(operator==(rhs));}

   // ============= Compatibility secition ==================

   // The following make this coordinate system look enough like a CLHEP
   // vector that an assignment member template can work with either
   Scalar x() const { return X(); }
   Scalar y() const { return Y(); }
   Scalar z() const { return Z(); } 
   Scalar t() const { return E(); } 



#if defined(__MAKECINT__) || defined(G__DICTIONARY) 

   // ====== Set member functions for coordinates in other systems =======

   void SetPx(Scalar px);  

   void SetPy(Scalar py);

   void SetPz(Scalar pz);

   void SetM(Scalar m);


#endif

private:

   ScalarType fPt;
   ScalarType fEta;
   ScalarType fPhi;
   ScalarType fE; 

};    
    
    
} // end namespace Math  
} // end namespace ROOT



// move implementations here to avoid circle dependencies

#include "Math/GenVector/PxPyPzE4D.h"
#include "Math/GenVector/PtEtaPhiM4D.h"

namespace ROOT { 

namespace Math { 

template <class ScalarType>  
inline void PtEtaPhiE4D<ScalarType>::SetPxPyPzE(Scalar px, Scalar py, Scalar pz, Scalar e) {  
   *this = PxPyPzE4D<Scalar> (px, py, pz, e);
}


#if defined(__MAKECINT__) || defined(G__DICTIONARY) 
     
  // ====== Set member functions for coordinates in other systems =======

template <class ScalarType>  
inline void PtEtaPhiE4D<ScalarType>::SetPx(Scalar px) {  
   GenVector_exception e("PtEtaPhiE4D::SetPx() is not supposed to be called");
   Throw(e);
   PxPyPzE4D<Scalar> v(*this); v.SetPx(px); *this = PtEtaPhiE4D<Scalar>(v);
}
template <class ScalarType>  
inline void PtEtaPhiE4D<ScalarType>::SetPy(Scalar py) {  
   GenVector_exception e("PtEtaPhiE4D::SetPx() is not supposed to be called");
   Throw(e);
   PxPyPzE4D<Scalar> v(*this); v.SetPy(py); *this = PtEtaPhiE4D<Scalar>(v);
}
template <class ScalarType>  
inline void PtEtaPhiE4D<ScalarType>::SetPz(Scalar pz) {  
   GenVector_exception e("PtEtaPhiE4D::SetPx() is not supposed to be called");
   Throw(e);
   PxPyPzE4D<Scalar> v(*this); v.SetPz(pz); *this = PtEtaPhiE4D<Scalar>(v);
}
template <class ScalarType>  
inline void PtEtaPhiE4D<ScalarType>::SetM(Scalar m) {  
   GenVector_exception e("PtEtaPhiE4D::SetM() is not supposed to be called");
   Throw(e);
   PtEtaPhiM4D<Scalar> v(*this); v.SetM(m); 
   *this = PtEtaPhiE4D<Scalar>(v);
}

#endif  // endif __MAKE__CINT || G__DICTIONARY

} // end namespace Math

} // end namespace ROOT




#endif // ROOT_Math_GenVector_PtEtaPhiE4D