Geant4  10.00.p02
G4JTPolynomialSolver.hh
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27 // $Id: G4JTPolynomialSolver.hh 67970 2013-03-13 10:10:06Z gcosmo $
28 //
29 // Class description:
30 //
31 // G4JTPolynomialSolver implements the Jenkins-Traub algorithm
32 // for real polynomial root finding.
33 // The solver returns -1, if the leading coefficient is zero,
34 // the number of roots found, otherwise.
35 //
36 // ----------------------------- INPUT --------------------------------
37 //
38 // op - double precision vector of coefficients in order of
39 // decreasing powers
40 // degree - integer degree of polynomial
41 //
42 // ----------------------------- OUTPUT -------------------------------
43 //
44 // zeror,zeroi - double precision vectors of the
45 // real and imaginary parts of the zeros
46 //
47 // ---------------------------- EXAMPLE -------------------------------
48 //
49 // G4JTPolynomialSolver trapEq ;
50 // G4double coef[8] ;
51 // G4double zr[7] , zi[7] ;
52 // G4int num = trapEq.FindRoots(coef,7,zr,zi);
53 
54 // ---------------------------- HISTORY -------------------------------
55 //
56 // Translated from original TOMS493 Fortran77 routine (ANSI C, by C.Bond).
57 // Translated to C++ and adapted to use STL vectors,
58 // by Oliver Link (Oliver.Link@cern.ch)
59 //
60 // --------------------------------------------------------------------
61 
62 #ifndef G4JTPOLYNOMIALSOLVER_HH
63 #define G4JTPOLYNOMIALSOLVER_HH
64 
65 #include <cmath>
66 #include <vector>
67 
68 #include "globals.hh"
69 
70 class G4JTPolynomialSolver
71 {
72 
73  public:
74 
75  G4JTPolynomialSolver();
76  ~G4JTPolynomialSolver();
77 
78  G4int FindRoots(G4double *op, G4int degree,
79  G4double *zeror, G4double *zeroi);
80 
81  private:
82 
83  std::vector<G4double> p;
84  std::vector<G4double> qp;
85  std::vector<G4double> k;
86  std::vector<G4double> qk;
87  std::vector<G4double> svk;
88 
89  G4double sr;
90  G4double si;
91  G4double u,v;
92  G4double a,b,c,d;
93  G4double a1,a3,a7;
94  G4double e,f,g,h;
95  G4double szr,szi;
96  G4double lzr,lzi;
97  G4int n;
98 
99  /* The following statements set machine constants */
100 
101  static const G4double base;
102  static const G4double eta;
103  static const G4double infin;
104  static const G4double smalno;
105  static const G4double are;
106  static const G4double mre;
107  static const G4double lo;
108 
109  void Quadratic(G4double a,G4double b1,G4double c,
110  G4double *sr,G4double *si, G4double *lr,G4double *li);
111  void ComputeFixedShiftPolynomial(G4int l2, G4int *nz);
112  void QuadraticPolynomialIteration(G4double *uu,G4double *vv,G4int *nz);
113  void RealPolynomialIteration(G4double *sss, G4int *nz, G4int *iflag);
114  void ComputeScalarFactors(G4int *type);
115  void ComputeNextPolynomial(G4int *type);
116  void ComputeNewEstimate(G4int type,G4double *uu,G4double *vv);
117  void QuadraticSyntheticDivision(G4int n, G4double *u, G4double *v,
118  std::vector<G4double> &p,
119  std::vector<G4double> &q,
120  G4double *a, G4double *b);
121 };
122 
123 #endif
G4JTPolynomialSolver::are
static const G4double are
Definition: G4JTPolynomialSolver.hh:105
G4JTPolynomialSolver::ComputeFixedShiftPolynomial
void ComputeFixedShiftPolynomial(G4int l2, G4int *nz)
Definition: G4JTPolynomialSolver.cc:309
G4JTPolynomialSolver::svk
std::vector< G4double > svk
Definition: G4JTPolynomialSolver.hh:87
G4JTPolynomialSolver::qk
std::vector< G4double > qk
Definition: G4JTPolynomialSolver.hh:86
G4JTPolynomialSolver::mre
static const G4double mre
Definition: G4JTPolynomialSolver.hh:106
G4JTPolynomialSolver::ComputeScalarFactors
void ComputeScalarFactors(G4int *type)
Definition: G4JTPolynomialSolver.cc:690
G4JTPolynomialSolver::p
std::vector< G4double > p
Definition: G4JTPolynomialSolver.hh:83
G4int
int G4int
Definition: G4Types.hh:78
G4JTPolynomialSolver::smalno
static const G4double smalno
Definition: G4JTPolynomialSolver.hh:104
G4JTPolynomialSolver::qp
std::vector< G4double > qp
Definition: G4JTPolynomialSolver.hh:84
G4JTPolynomialSolver::ComputeNewEstimate
void ComputeNewEstimate(G4int type, G4double *uu, G4double *vv)
Definition: G4JTPolynomialSolver.cc:777
G4JTPolynomialSolver::eta
static const G4double eta
Definition: G4JTPolynomialSolver.hh:102
G4JTPolynomialSolver::k
std::vector< G4double > k
Definition: G4JTPolynomialSolver.hh:85
G4JTPolynomialSolver::infin
static const G4double infin
Definition: G4JTPolynomialSolver.hh:103
G4JTPolynomialSolver::ComputeNextPolynomial
void ComputeNextPolynomial(G4int *type)
Definition: G4JTPolynomialSolver.cc:732
G4JTPolynomialSolver::RealPolynomialIteration
void RealPolynomialIteration(G4double *sss, G4int *nz, G4int *iflag)
Definition: G4JTPolynomialSolver.cc:582
G4JTPolynomialSolver::base
static const G4double base
Definition: G4JTPolynomialSolver.hh:101
sss
static const char sss[MAX_N_PAR+2]
Definition: Evaluator.cc:64
G4JTPolynomialSolver::QuadraticSyntheticDivision
void QuadraticSyntheticDivision(G4int n, G4double *u, G4double *v, std::vector< G4double > &p, std::vector< G4double > &q, G4double *a, G4double *b)
Definition: G4JTPolynomialSolver.cc:825
degree
static const double degree
Definition: G4SIunits.hh:125
b1
static const G4double b1
Definition: G4BetheHeitlerModel.cc:76
G4double
double G4double
Definition: G4Types.hh:76
G4JTPolynomialSolver::QuadraticPolynomialIteration
void QuadraticPolynomialIteration(G4double *uu, G4double *vv, G4int *nz)
Definition: G4JTPolynomialSolver.cc:478
G4JTPolynomialSolver::lo
static const G4double lo
Definition: G4JTPolynomialSolver.hh:107
G4JTPolynomialSolver::FindRoots
G4int FindRoots(G4double *op, G4int degree, G4double *zeror, G4double *zeroi)
Definition: G4JTPolynomialSolver.cc:61
G4JTPolynomialSolver::Quadratic
void Quadratic(G4double a, G4double b1, G4double c, G4double *sr, G4double *si, G4double *lr, G4double *li)
Definition: G4JTPolynomialSolver.cc:846