dd/d46/linalg_8h_source.html

 // forward declarations

 class TLinAlg;

 class TLAMisc;


 // Matrix

 class TMatrix {

 private:

     bool Transposed;

 protected:

     virtual void PMultiply(const TFltVV& B, int ColId, TFltV& Result) const = 0;

     virtual void PMultiply(const TFltV& Vec, TFltV& Result) const = 0;

     virtual void PMultiplyT(const TFltVV& B, int ColId, TFltV& Result) const = 0;

     virtual void PMultiplyT(const TFltV& Vec, TFltV& Result) const = 0;


     virtual int PGetRows() const = 0;

     virtual int PGetCols() const = 0;

 public:

     TMatrix(): Transposed(false) {}

     virtual ~TMatrix() { }


     // Result = A * B(:,ColId)

     void Multiply(const TFltVV& B, int ColId, TFltV& Result) const {

         if (Transposed) { PMultiplyT(B, ColId, Result); }

         else { PMultiply(B, ColId, Result); }

     }

     // Result = A * Vec

     void Multiply(const TFltV& Vec, TFltV& Result) const {

         if (Transposed) { PMultiplyT(Vec, Result); }

         else { PMultiply(Vec, Result); }

     }

     // Result = A' * B(:,ColId)

     void MultiplyT(const TFltVV& B, int ColId, TFltV& Result) const {

         if (Transposed) { PMultiply(B, ColId, Result); }

         else { PMultiplyT(B, ColId, Result); }

     }

     // Result = A' * Vec

     void MultiplyT(const TFltV& Vec, TFltV& Result) const{

         if (Transposed) { PMultiply(Vec, Result); }

         else { PMultiplyT(Vec, Result); }

     }


     // number of rows

     int GetRows() const { return Transposed ? PGetCols() : PGetRows(); }

     // number of columns

     int GetCols() const { return Transposed ? PGetRows() : PGetCols(); }


     void Transpose() { Transposed = !Transposed; }

 };


 // Sparse-Column-Matrix

 //  matrix is given with columns as sparse vectors

 class TSparseColMatrix: public TMatrix {

 public:

     // number of rows and columns of matrix

     int RowN, ColN;

     // vector of sparse columns

     TVec<TIntFltKdV> ColSpVV;

 protected:

     // Result = A * B(:,ColId)

     virtual void PMultiply(const TFltVV& B, int ColId, TFltV& Result) const;

     // Result = A * Vec

     virtual void PMultiply(const TFltV& Vec, TFltV& Result) const;

     // Result = A' * B(:,ColId)

     virtual void PMultiplyT(const TFltVV& B, int ColId, TFltV& Result) const;

     // Result = A' * Vec

     virtual void PMultiplyT(const TFltV& Vec, TFltV& Result) const;


     int PGetRows() const { return RowN; }

     int PGetCols() const { return ColN; }


 public:

     TSparseColMatrix(): TMatrix() {}

     TSparseColMatrix(TVec<TIntFltKdV> _ColSpVV): TMatrix(), ColSpVV(_ColSpVV) {}

     TSparseColMatrix(TVec<TIntFltKdV> _ColSpVV, const int& _RowN, const int& _ColN):

                 TMatrix(), RowN(_RowN), ColN(_ColN), ColSpVV(_ColSpVV) {}

     // loads Matlab sparse matrix format: row, column, value.

     //   Indexes start with 1.

     void Save(TSOut& SOut) {

         SOut.Save(RowN); SOut.Save(ColN); ColSpVV.Save(SOut); }

     void Load(TSIn& SIn) {

         SIn.Load(RowN); SIn.Load(ColN); ColSpVV = TVec<TIntFltKdV>(SIn); }

 };


 // Sparse-Row-Matrix

 //  matrix is given with rows as sparse vectors

 class TSparseRowMatrix: public TMatrix {

 public:

     // number of rows and columns of matrix

     int RowN, ColN;

     // vector of sparse rows

     TVec<TIntFltKdV> RowSpVV;

 protected:

     // Result = A * B(:,ColId)

     virtual void PMultiply(const TFltVV& B, int ColId, TFltV& Result) const;

     // Result = A * Vec

     virtual void PMultiply(const TFltV& Vec, TFltV& Result) const;

     // Result = A' * B(:,ColId)

     virtual void PMultiplyT(const TFltVV& B, int ColId, TFltV& Result) const;

     // Result = A' * Vec

     virtual void PMultiplyT(const TFltV& Vec, TFltV& Result) const;


     int PGetRows() const { return RowN; }

     int PGetCols() const { return ColN; }


 public:

     TSparseRowMatrix(): TMatrix() {}

     TSparseRowMatrix(TVec<TIntFltKdV> _RowSpVV): TMatrix(), RowSpVV(_RowSpVV) {}

     TSparseRowMatrix(TVec<TIntFltKdV> _RowSpVV, const int& _RowN, const int& _ColN):

                 TMatrix(), RowN(_RowN), ColN(_ColN), RowSpVV(_RowSpVV) {}

         // loads Matlab sparse matrix format: row, column, value.

     //   Indexes start with 1.

     TSparseRowMatrix(const TStr& MatlabMatrixFNm);

     void Save(TSOut& SOut) {

         SOut.Save(RowN); SOut.Save(ColN); RowSpVV.Save(SOut); }

     void Load(TSIn& SIn) {

         SIn.Load(RowN); SIn.Load(ColN); RowSpVV = TVec<TIntFltKdV>(SIn); }

 };


 // Full-Col-Matrix

 //  matrix is given with columns of full vectors

 class TFullColMatrix: public TMatrix {

 public:

     // number of rows and columns of matrix

     int RowN, ColN;

     // vector of sparse columns

     TVec<TFltV> ColV;

 protected:

     // Result = A * B(:,ColId)

     virtual void PMultiply(const TFltVV& B, int ColId, TFltV& Result) const;

     // Result = A * Vec

     virtual void PMultiply(const TFltV& Vec, TFltV& Result) const;

     // Result = A' * B(:,ColId)

     virtual void PMultiplyT(const TFltVV& B, int ColId, TFltV& Result) const;

     // Result = A' * Vec

     virtual void PMultiplyT(const TFltV& Vec, TFltV& Result) const;


     int PGetRows() const { return RowN; }

     int PGetCols() const { return ColN; }


 public:

     TFullColMatrix(): TMatrix() {}

     // loads matrix saved in matlab with command:

     //  save -ascii Matrix.dat M

     TFullColMatrix(const TStr& MatlabMatrixFNm);

     void Save(TSOut& SOut) { ColV.Save(SOut); }

     void Load(TSIn& SIn) { ColV.Load(SIn); }

 };


 // Basic Linear Algebra Operations

 class TLinAlg {

 public:

     // <x,y>

     static double DotProduct(const TFltV& x, const TFltV& y);

     // <X(:,ColIdX), Y(:,ColIdY)>

     static double DotProduct(const TFltVV& X, int ColIdX, const TFltVV& Y, int ColIdY);

     // <X(:,ColId), Vec>

     static double DotProduct(const TFltVV& X, int ColId, const TFltV& Vec);

     // sparse dot products:

     // <x,y> where x AND y are sparse

     static double DotProduct(const TIntFltKdV& x, const TIntFltKdV& y);

     // <x,y> where only y is sparse

     static double DotProduct(const TFltV& x, const TIntFltKdV& y);

     // <X(:,ColId),y> where only y is sparse

     static double DotProduct(const TFltVV& X, int ColId, const TIntFltKdV& y);


     // z := p * x + q * y

     static void LinComb(const double& p, const TFltV& x,

         const double& q, const TFltV& y, TFltV& z);

     // z := p * x + (1 - p) * y

     static void ConvexComb(const double& p, const TFltV& x, const TFltV& y, TFltV& z);


     // z := k * x + y

     static void AddVec(const double& k, const TFltV& x, const TFltV& y, TFltV& z);

     // z := k * x + y

     static void AddVec(const double& k, const TIntFltKdV& x, const TFltV& y, TFltV& z);

     // y := k * x + y

     static void AddVec(const double& k, const TIntFltKdV& x, TFltV& y);

     // Y(:,Col) += k * X(:,Col)

     static void AddVec(double k, const TFltVV& X, int ColIdX, TFltVV& Y, int ColIdY);

     // Result += k * X(:,Col)

     static void AddVec(double k, const TFltVV& X, int ColId, TFltV& Result);

         // z = x + y

     static void AddVec(const TIntFltKdV& x, const TIntFltKdV& y, TIntFltKdV& z);


     // Result = SUM(x)

     static double SumVec(const TFltV& x);

     // Result = SUM(k*x + y)

     static double SumVec(double k, const TFltV& x, const TFltV& y);


     // Result = ||x-y||^2 (Euclidian)

     static double EuclDist2(const TFltV& x, const TFltV& y);

     static double EuclDist2(const TFltPr& x, const TFltPr& y);

     // Result = ||x-y|| (Euclidian)

     static double EuclDist(const TFltV& x, const TFltV& y);

     static double EuclDist(const TFltPr& x, const TFltPr& y);


     // ||x||^2 (Euclidian)

     static double Norm2(const TFltV& x);

     // ||x|| (Euclidian)

     static double Norm(const TFltV& x);

     // x := x / ||x||

     static void Normalize(TFltV& x);


     // ||x||^2 (Euclidian), x is sparse

     static double Norm2(const TIntFltKdV& x);

     // ||x|| (Euclidian), x is sparse

     static double Norm(const TIntFltKdV& x);

     // x := x / ||x||, x is sparse

     static void Normalize(TIntFltKdV& x);


     // ||X(:,ColId)||^2 (Euclidian)

     static double Norm2(const TFltVV& X, int ColId);

     // ||X(:,ColId)|| (Euclidian)

     static double Norm(const TFltVV& X, int ColId);


     // L1 norm of x (Sum[|xi|, i = 1..n])

     static double NormL1(const TFltV& x);

     // L1 norm of k*x+y (Sum[|k*xi+yi|, i = 1..n])

     static double NormL1(double k, const TFltV& x, const TFltV& y);

     // L1 norm of x (Sum[|xi|, i = 1..n])

     static double NormL1(const TIntFltKdV& x);

     // x := x / ||x||_inf

     static void NormalizeL1(TFltV& x);

     // x := x / ||x||_inf

     static void NormalizeL1(TIntFltKdV& x);


     // Linf norm of x (Max{|xi|, i = 1..n})

     static double NormLinf(const TFltV& x);

     // Linf norm of x (Max{|xi|, i = 1..n})

     static double NormLinf(const TIntFltKdV& x);

     // x := x / ||x||_inf

     static void NormalizeLinf(TFltV& x);

     // x := x / ||x||_inf, , x is sparse

     static void NormalizeLinf(TIntFltKdV& x);


     // y := k * x

     static void MultiplyScalar(const double& k, const TFltV& x, TFltV& y);

     // y := k * x

     static void MultiplyScalar(const double& k, const TIntFltKdV& x, TIntFltKdV& y);


     // y := A * x

     static void Multiply(const TFltVV& A, const TFltV& x, TFltV& y);

     // C(:, ColId) := A * x

     static void Multiply(const TFltVV& A, const TFltV& x, TFltVV& C, int ColId);

     // y := A * B(:, ColId)

     static void Multiply(const TFltVV& A, const TFltVV& B, int ColId, TFltV& y);

     // C(:, ColIdC) := A * B(:, ColIdB)

     static void Multiply(const TFltVV& A, const TFltVV& B, int ColIdB, TFltVV& C, int ColIdC);


     // y := A' * x

     static void MultiplyT(const TFltVV& A, const TFltV& x, TFltV& y);


     // C = A * B

     static void Multiply(const TFltVV& A, const TFltVV& B, TFltVV& C);


         // D = alpha * A(') * B(') + beta * C(')

         typedef enum { GEMM_NO_T = 0, GEMM_A_T = 1, GEMM_B_T = 2, GEMM_C_T = 4 } TLinAlgGemmTranspose;

         static void Gemm(const double& Alpha, const TFltVV& A, const TFltVV& B, const double& Beta,

                 const TFltVV& C, TFltVV& D, const int& TransposeFlags);


         // B = A^(-1)

         typedef enum { DECOMP_SVD } TLinAlgInverseType;

         static void Inverse(const TFltVV& A, TFltVV& B, const TLinAlgInverseType& DecompType);

         // subtypes of finding an inverse

         static void InverseSVD(const TFltVV& A, TFltVV& B);


         // transpose matrix - B = A'

         static void Transpose(const TFltVV& A, TFltVV& B);


     // performes Gram-Schmidt ortogonalization on elements of Q

     static void GS(TVec<TFltV>& Q);

     // Gram-Schmidt on columns of matrix Q

     static void GS(TFltVV& Q);


     // rotates vector (OldX,OldY) for angle Angle (in radians!)

     static void Rotate(const double& OldX, const double& OldY, const double& Angle, double& NewX, double& NewY);


     // checks if set of vectors is ortogonal

     static void AssertOrtogonality(const TVec<TFltV>& Vecs, const double& Threshold);

     static void AssertOrtogonality(const TFltVV& Vecs, const double& Threshold);

 };


 // Numerical-Recepies-Exception

 class TNSException : public TExcept {

 public:

     TStr Message;

 public:

     TNSException(const TStr& Msg): TExcept(Msg) {}

 };


 // Numerical-Linear-Algebra (copied from Numerical Recepies)

 class TNumericalStuff {

 private:

   static double sqr(double a);

   static double sign(double a, double b);


   // Computes (a^2 + b^2)^(1/2) without

   // destructive underflow or overflow.

   static double pythag(double a, double b);


   //displays error message to screen

   static void nrerror(const TStr& error_text);


 public:

     // Householder reduction of a real, symmetric matrix a[1..n][1..n].

     // On output, a is replaced by the orthogonal matrix Q eecting the

     // transformation. d[1..n] returns the diagonal elements of the

     // tridiagonal matrix, and e[1..n] the o-diagonal elements, with

     // e[1]=0. Several statements, as noted in comments, can be omitted

     // if only eigenvalues are to be found, in which case a contains no

     // useful information on output. Otherwise they are to be included.

     static void SymetricToTridiag(TFltVV& a, int n, TFltV& d, TFltV& e);


         // QL algorithm with implicit shifts, to determine the eigenvalues

         // and eigenvectors of a real, symmetric, tridiagonal matrix, or of

         // a real, symmetric matrix previously reduced by tred2 x11.2. On

         // input, d[1..n] contains the diagonal elements of the tridiagonal

         // matrix. On output, it returns the eigenvalues. The vector e[1..n]

         // inputs the subdiagonal elements of the tridiagonal matrix, with

         // e[1] arbitrary. On output e is destroyed. When finding only the

         // eigenvalues, several lines may be omitted, as noted in the comments.

         // If the eigenvectors of a tridiagonal matrix are desired, the matrix

         // z[1..n][1..n] is input as the identity matrix. If the eigenvectors

         // of a matrix that has been reduced by tred2 are required, then z is

         // input as the matrix output by tred2. In either case, the kth column

         // of z returns the normalized eigenvector corresponding to d[k].

         static void EigSymmetricTridiag(TFltV& d, TFltV& e, int n, TFltVV& z);


         // Given a positive-dedinite symmetric matrix A(n,n), this routine

         // constructs its Cholesky decomposition, A = L * L^T . On input, only

         // the upper triangle of A need be given; it is not modified. The

         // Cholesky factor L is returned in the lower triangle of A, except for

         // its diagonal elements which are returned in p(n).

         static void CholeskyDecomposition(TFltVV& A, TFltV& p);


         // Solves the set of n linear equations A * x = b, where A is a

         // positive-definite symmetric matrix. A(n,n) and p[1..n] are input

         // as the output of the routine choldc. Only the lower triangle of A

         // is accessed. b(n) is input as the right-hand side vector. The

         // solution vector is returned in x(n). A  and p are not modified and

         // can be left in place for successive calls with diferent right-hand

         // sides b. b is not modified unless you identify b and x in the calling

         // sequence, which is allowed.

         static void CholeskySolve(const TFltVV& A, const TFltV& p, const TFltV& b, TFltV& x);


         // Solves system of linear equations A * x = b, where A is symetric

         // positive-definite matrix. A is first decomposed using

         // CholeskyDecomposition and after solved using CholeskySolve. Only

         // upper triangle of A need be given and it is not modified. However,

         // lower triangle is modified!

         static void SolveSymetricSystem(TFltVV& A, const TFltV& b, TFltV& x);


     // solve system A x_i = e_i for i = 1..n, where A and p are output

     // from CholeskyDecomposition. Result is stored to upper triangule

     // (possible since inverse of symetric matrix is also symetric! Sigh...)

     static void InverseSubstitute(TFltVV& A, const TFltV& p);


     // Calculates inverse of symetric positiv definit matrix

     // Matrix is given as upper triangule of A, result is stored

     // in upper triangule of A. Lower triangule is random (actually

     // it has part of Choleksy decompositon of A)

     static void InverseSymetric(TFltVV& A);


     // calcualtes inverse of upper triagonal matrix A

     // lower triangle is messed up...

     static void InverseTriagonal(TFltVV& A);


     // Given a matrix a[1..n][1..n], this routine replaces it by the LU

     // decomposition of a rowwise permutation of itself. a and n are input.

     // a is output, arranged as in equation (2.3.14) above; indx[1..n] is

     // an output vector that records the row permutation efected by the partial

     // pivoting; d is output as +-1 depending on whether the number of row

     // interchanges was even or odd, respectively. This routine is used in

     // combination with lubksb to solve linear equations or invert a matrix.

     static void LUDecomposition(TFltVV& A, TIntV& indx, double& d);


     // Solves the set of n linear equations A*X = B. Here a[1..n][1..n] is input,

     // not as the matrix A but rather as its LU decomposition, determined by the

     // routine ludcmp. indx[1..n] is input as the permutation vector returned by

     // ludcmp. b[1..n] is input as the right-hand side vector B, and returns with

     // the solution vector X. a, n, and indx are not modified by this routine and

     // can be left in place for successive calls with diferent right-hand sides b.

     // This routine takes into account the possibility that b will begin with many

     // zero elements, so it is efficient for use in matrix inversion.

     static void LUSolve(const TFltVV& A, const TIntV& indx, TFltV& b);


     // Solves system of linear equations A * x = b. A is first decomposed using

     // LUDecomposition and after solved using LUSolve. A is modified!

     static void SolveLinearSystem(TFltVV& A, const TFltV& b, TFltV& x);

 };


 // Sparse-SVD

 //   Calculates singular-value-decompositon for sparse matrixes.

 //   If A is a matrix than A is decomposed to A = U S V'

 //   where S is diagonal with singular values on diagonal and U

 //   and V are ortogonal (U'*U = V'*V = I).

 typedef enum { ssotNoOrto, ssotSelective, ssotFull } TSpSVDReOrtoType;

 class TSparseSVD {

 private:

     // Result = Matrix' * Matrix * Vec(:,ColId)

     static void MultiplyATA(const TMatrix& Matrix,

         const TFltVV& Vec, int ColId, TFltV& Result);

     // Result = Matrix' * Matrix * Vec

     static void MultiplyATA(const TMatrix& Matrix,

         const TFltV& Vec, TFltV& Result);

 public:

     // calculates NumEig eigen values of symetric matrix

     // if SvdMatrixProductP than matrix Matrix'*Matrix is used

     static void SimpleLanczos(const TMatrix& Matrix,

         const int& NumEig, TFltV& EigValV,

         const bool& DoLocalReortoP = false,

         const bool& SvdMatrixProductP = false);

     // fast, calculates NumEig largers eigen values and vectors

     // kk should be something like 4*NumEig

     // if SvdMatrixProductP than matrix Matrix'*Matrix is used

     static void Lanczos(const TMatrix& Matrix,

         int NumEig, int Iters, const TSpSVDReOrtoType& ReOrtoType,

         TFltV& EigValV, TFltVV& EigVecVV,

         const bool& SvdMatrixProductP = false);

     static void Lanczos2(const TMatrix& Matrix,

         int MaxNumEig, int MaxSecs, const TSpSVDReOrtoType& ReOrtoType,

         TFltV& EigValV, TFltVV& EigVecVV,

         const bool& SvdMatrixProductP = false);


     // calculates only singular values (based on SimpleLanczos)

     static void SimpleLanczosSVD(const TMatrix& Matrix,

         const int& CalcSV, TFltV& SngValV,

         const bool& DoLocalReortoP = false);

     // fast, calculates NumSV largers SV (based on Lanczos)

     static void LanczosSVD(const TMatrix& Matrix,

         int NumSV, int Iters, const TSpSVDReOrtoType& ReOrtoType,

         TFltV& SgnValV, TFltVV& LeftSgnVecVV, TFltVV& RightSgnVecVV);


     // slow - ortogonal iteration

     static void OrtoIterSVD(const TMatrix& Matrix,

         int NumSV, int IterN, TFltV& SgnValV);


     // projects sparse vector to space spanned by columns of matrix U

     static void Project(const TIntFltKdV& Vec, const TFltVV& U, TFltV& ProjVec);

 };


 // Sigmoid  --  made by Janez(TM)

 //  (y = 1/[1 + exp[-Ax+B]])

 class TSigmoid {

 private:

     TFlt A;

     TFlt B;

 private:

   // Evaluates how well the sigmoid function fits the data.

   // J(A, B) = - ln prod_i P(Y = y_i | Z = z_i).  The 'data' parameter

   // should contain (z_i, y_i) pairs.  Smaller J means a better fit.

   static double EvaluateFit(const TFltIntKdV& data, const double A, const double B);

   // Computes not only J but also its partial derivatives.

   static void EvaluateFit(const TFltIntKdV& data, const double A,

         const double B, double& J, double& JA, double& JB);

   // Let J(lambda) = J(A + lambda U, B + lambda V).

     // This function computes J and its first and second derivatives.

   // They can be used to choose a good lambda (using Newton's method)

     // when minimizing J. -- This method has not been tested yet.

   static void EvaluateFit(const TFltIntKdV& data, const double A,

         const double B, const double U, const double V, const double lambda,

     double& J, double& JJ, double& JJJ);

 public:

     TSigmoid() { };

     TSigmoid(const double& A_, const double& B_): A(A_), B(B_) { };

         // Tries to find a pair (A, B) that minimizes J(A, B).

     // Uses gradient descent.

     TSigmoid(const TFltIntKdV& data);


     TSigmoid(TSIn& SIn) { A.Load(SIn); B.Load(SIn); }

     void Load(TSIn& SIn) { A.Load(SIn); B.Load(SIn); }

     void Save(TSOut& SOut) const {A.Save(SOut); B.Save(SOut);}


     double GetVal(const double& x) const {

         return 1.0 / (1.0 + exp(-A * x + B)); }

     double operator()(const double& x) const {

         return GetVal(x); }


     void GetSigmoidAB(double& A_, double& B_) { A_=A; B_=B; }

 };


 // Useful stuff (hopefuly)

 class TLAMisc {

 public:

         // Dumps vector to file so Excel can read it

     static void SaveCsvTFltV(const TFltV& Vec, TSOut& SOut);

         // Dumps sparse vector to file so Matlab can read it

     static void SaveMatlabTFltIntKdV(const TIntFltKdV& SpV, const int& ColN, TSOut& SOut);

         // Dumps vector to file so Matlab can read it

     static void SaveMatlabTFltV(const TFltV& m, const TStr& FName);

         // Dumps vector to file so Matlab can read it

     static void SaveMatlabTIntV(const TIntV& m, const TStr& FName);

         // Dumps column ColId from m to file so Matlab can read it

     static void SaveMatlabTFltVVCol(const TFltVV& m, int ColId, const TStr& FName);

         // Dumps matrix to file so Matlab can read it

     static void SaveMatlabTFltVV(const TFltVV& m, const TStr& FName);

         // Dumps main minor rowN x colN to file so Matlab can read it

         static void SaveMatlabTFltVVMjrSubMtrx(const TFltVV& m, int rowN, int colN, const TStr& FName);

     // loads matlab full matrix

     static void LoadMatlabTFltVV(const TStr& FNm, TVec<TFltV>& ColV);

     // loads matlab full matrix

     static void LoadMatlabTFltVV(const TStr& FNm, TFltVV& MatrixVV);

     // prints vector to screen

     static void PrintTFltV(const TFltV& Vec, const TStr& VecNm);

         // print matrixt to screen

         static void PrintTFltVV(const TFltVV& A, const TStr& MatrixNm);

     // prints vector to screen

     static void PrintTIntV(const TIntV& Vec, const TStr& VecNm);

     // fills vector with random numbers

     static void FillRnd(TFltV& Vec) { TRnd Rnd(0); FillRnd(Vec, Rnd); }

     static void FillRnd(TFltV& Vec, TRnd& Rnd);

     // set all components

     static void Fill(TFltVV& M, const double& Val);

     // sets all compnents to zero

     static void FillZero(TFltV& Vec) { Vec.PutAll(0.0); }

     static void FillZero(TFltVV& M) { Fill(M, 0.0); }

     // set matrix to identity

     static void FillIdentity(TFltVV& M);

     static void FillIdentity(TFltVV& M, const double& Elt);

     // sums elements in vector

     static int SumVec(const TIntV& Vec);

     static double SumVec(const TFltV& Vec);

     // converts full vector to sparse

     static void ToSpVec(const TFltV& Vec, TIntFltKdV& SpVec,

         const double& CutWordWgtSumPrc = 0.0);

     // converts sparse vector to full

     static void ToVec(const TIntFltKdV& SpVec, TFltV& Vec, const int& VecLen);

 };


 // Template-ised Sparse Operations

 template <class TKey, class TDat>

 class TSparseOps {

 private:

         typedef TVec<TKeyDat<TKey, TDat> > TKeyDatV;

 public:

         static void SparseMerge(const TKeyDatV& SrcV1, const TKeyDatV& SrcV2, TKeyDatV& DstV) {

                 DstV.Clr();

                 const int Src1Len = SrcV1.Len();

                 const int Src2Len = SrcV2.Len();

                 int Src1N = 0, Src2N = 0;

                 while (Src1N < Src1Len && Src2N < Src2Len) {

                         if (SrcV1[Src1N].Key < SrcV2[Src2N].Key) {

                                 DstV.Add(SrcV1[Src1N]); Src1N++;

                         } else if (SrcV1[Src1N].Key > SrcV2[Src2N].Key) {

                                 DstV.Add(SrcV2[Src2N]); Src2N++;

                         } else {

                                 DstV.Add(TKeyDat<TKey, TDat>(SrcV1[Src1N].Key, SrcV1[Src1N].Dat + SrcV2[Src2N].Dat));

                                 Src1N++;  Src2N++;

                         }

                 }

                 while (Src1N < Src1Len) { DstV.Add(SrcV1[Src1N]); Src1N++; }

                 while (Src2N < Src2Len) { DstV.Add(SrcV2[Src2N]); Src2N++; }

         }

 };


 typedef TSparseOps<TInt, TFlt> TSparseOpsIntFlt;

TKeyDat
Definition: ds.h:345

TNSException::TNSException
TNSException(const TStr &Msg)
Definition: linalg.h:295

TMatrix::PMultiplyT
virtual void PMultiplyT(const TFltVV &B, int ColId, TFltV &Result) const =0

TLinAlg::EuclDist
static double EuclDist(const TFltV &x, const TFltV &y)
Definition: linalg.cpp:312

TSigmoid::GetVal
double GetVal(const double &x) const
Definition: linalg.h:484

TLinAlg::Transpose
static void Transpose(const TFltVV &A, TFltVV &B)
Definition: linalg.cpp:539

TSparseRowMatrix::PGetCols
int PGetCols() const
Definition: linalg.h:107

TSpSVDReOrtoType
TSpSVDReOrtoType
Definition: linalg.h:406

ssotNoOrto
Definition: linalg.h:406

TNSException::Message
TStr Message
Definition: linalg.h:293

TSparseOps::TKeyDatV
TVec< TKeyDat< TKey, TDat > > TKeyDatV
Definition: linalg.h:546

TLinAlg::Norm
static double Norm(const TFltV &x)
Definition: linalg.cpp:324

TSparseOpsIntFlt
TSparseOps< TInt, TFlt > TSparseOpsIntFlt
Definition: linalg.h:568

TSparseRowMatrix::PGetRows
int PGetRows() const
Definition: linalg.h:106

TFullColMatrix::PGetCols
int PGetCols() const
Definition: linalg.h:143

TLinAlg::AssertOrtogonality
static void AssertOrtogonality(const TVec< TFltV > &Vecs, const double &Threshold)
Definition: linalg.cpp:616

TLAMisc::SaveMatlabTFltIntKdV
static void SaveMatlabTFltIntKdV(const TIntFltKdV &SpV, const int &ColN, TSOut &SOut)
Definition: linalg.cpp:1605

TMatrix::Transpose
void Transpose()
Definition: linalg.h:49

TLinAlg::TLinAlgInverseType
TLinAlgInverseType
Definition: linalg.h:268

TSparseRowMatrix::Save
void Save(TSOut &SOut)
Definition: linalg.h:117

TSparseOps
Definition: linalg.h:544

TFullColMatrix
Definition: linalg.h:126

TRnd
Definition: dt.h:11

TLinAlg::SumVec
static double SumVec(const TFltV &x)
Definition: linalg.cpp:279

TLAMisc
Definition: linalg.h:494

TNumericalStuff::sqr
static double sqr(double a)
Definition: linalg.cpp:647

TSigmoid::EvaluateFit
static double EvaluateFit(const TFltIntKdV &data, const double A, const double B)
Definition: linalg.cpp:1490

TSparseColMatrix::PMultiplyT
virtual void PMultiplyT(const TFltVV &B, int ColId, TFltV &Result) const
Definition: linalg.cpp:27

TLinAlg::GS
static void GS(TVec< TFltV > &Q)
Definition: linalg.cpp:584

TSparseRowMatrix::RowN
int RowN
Definition: linalg.h:93

TMatrix::PGetRows
virtual int PGetRows() const =0

TLAMisc::FillRnd
static void FillRnd(TFltV &Vec)
Definition: linalg.h:521

TMatrix::MultiplyT
void MultiplyT(const TFltVV &B, int ColId, TFltV &Result) const
Definition: linalg.h:34

TSparseSVD::Lanczos
static void Lanczos(const TMatrix &Matrix, int NumEig, int Iters, const TSpSVDReOrtoType &ReOrtoType, TFltV &EigValV, TFltVV &EigVecVV, const bool &SvdMatrixProductP=false)
Definition: linalg.cpp:1134

TLAMisc::ToVec
static void ToVec(const TIntFltKdV &SpVec, TFltV &Vec, const int &VecLen)
Definition: linalg.cpp:1805

ssotSelective
Definition: linalg.h:406

TMatrix::PMultiply
virtual void PMultiply(const TFltVV &B, int ColId, TFltV &Result) const =0

TSparseSVD::SimpleLanczosSVD
static void SimpleLanczosSVD(const TMatrix &Matrix, const int &CalcSV, TFltV &SngValV, const bool &DoLocalReortoP=false)
Definition: linalg.cpp:1440

TFullColMatrix::PGetRows
int PGetRows() const
Definition: linalg.h:142

TSigmoid::Save
void Save(TSOut &SOut) const
Definition: linalg.h:482

TSparseRowMatrix::RowSpVV
TVec< TIntFltKdV > RowSpVV
Definition: linalg.h:95

TSparseSVD::Lanczos2
static void Lanczos2(const TMatrix &Matrix, int MaxNumEig, int MaxSecs, const TSpSVDReOrtoType &ReOrtoType, TFltV &EigValV, TFltVV &EigVecVV, const bool &SvdMatrixProductP=false)
Definition: linalg.cpp:1290

TLAMisc::SaveMatlabTFltVV
static void SaveMatlabTFltVV(const TFltVV &m, const TStr &FName)
Definition: linalg.cpp:1643

TSparseColMatrix::Load
void Load(TSIn &SIn)
Definition: linalg.h:83

TVec::Len
TSizeTy Len() const
Returns the number of elements in the vector.
Definition: ds.h:547

TLinAlg::TLinAlgGemmTranspose
TLinAlgGemmTranspose
Definition: linalg.h:263

TLinAlg::GEMM_NO_T
Definition: linalg.h:263

TLinAlg
Definition: linalg.h:156

TSparseColMatrix::TSparseColMatrix
TSparseColMatrix(TVec< TIntFltKdV > _ColSpVV)
Definition: linalg.h:76

TSparseColMatrix::Save
void Save(TSOut &SOut)
Definition: linalg.h:81

TSigmoid::A
TFlt A
Definition: linalg.h:456

TNumericalStuff::SolveLinearSystem
static void SolveLinearSystem(TFltVV &A, const TFltV &b, TFltV &x)
Definition: linalg.cpp:994

TLAMisc::FillZero
static void FillZero(TFltV &Vec)
Definition: linalg.h:526

TLAMisc::SaveMatlabTFltVVCol
static void SaveMatlabTFltVVCol(const TFltVV &m, int ColId, const TStr &FName)
Definition: linalg.cpp:1632

TSparseColMatrix::TSparseColMatrix
TSparseColMatrix(TVec< TIntFltKdV > _ColSpVV, const int &_RowN, const int &_ColN)
Definition: linalg.h:77

TSparseRowMatrix::TSparseRowMatrix
TSparseRowMatrix()
Definition: linalg.h:110

TSparseSVD::LanczosSVD
static void LanczosSVD(const TMatrix &Matrix, int NumSV, int Iters, const TSpSVDReOrtoType &ReOrtoType, TFltV &SgnValV, TFltVV &LeftSgnVecVV, TFltVV &RightSgnVecVV)
Definition: linalg.cpp:1454

TFullColMatrix::ColN
int ColN
Definition: linalg.h:129

TSigmoid::Load
void Load(TSIn &SIn)
Definition: linalg.h:481

TLinAlg::MultiplyT
static void MultiplyT(const TFltVV &A, const TFltV &x, TFltV &y)
Definition: linalg.cpp:468

TMatrix::PGetCols
virtual int PGetCols() const =0

TNSException
Definition: linalg.h:291

TLinAlg::InverseSVD
static void InverseSVD(const TFltVV &A, TFltVV &B)
Definition: linalg.cpp:555

TNumericalStuff::InverseTriagonal
static void InverseTriagonal(TFltVV &A)
Definition: linalg.cpp:881

TFlt
Definition: dt.h:1293

TSIn
Definition: fl.h:58

TLinAlg::Normalize
static void Normalize(TFltV &x)
Definition: linalg.cpp:328

TLinAlg::NormalizeLinf
static void NormalizeLinf(TFltV &x)
Definition: linalg.cpp:404

TSparseSVD::Project
static void Project(const TIntFltKdV &Vec, const TFltVV &U, TFltV &ProjVec)
Definition: linalg.cpp:1476

TSparseRowMatrix::TSparseRowMatrix
TSparseRowMatrix(TVec< TIntFltKdV > _RowSpVV)
Definition: linalg.h:111

TLAMisc::SaveMatlabTFltVVMjrSubMtrx
static void SaveMatlabTFltVVMjrSubMtrx(const TFltVV &m, int rowN, int colN, const TStr &FName)
Definition: linalg.cpp:1657

TSparseOps::SparseMerge
static void SparseMerge(const TKeyDatV &SrcV1, const TKeyDatV &SrcV2, TKeyDatV &DstV)
Definition: linalg.h:548

TFullColMatrix::TFullColMatrix
TFullColMatrix()
Definition: linalg.h:146

TLAMisc::SumVec
static int SumVec(const TIntV &Vec)
Definition: linalg.cpp:1769

TLinAlg::Rotate
static void Rotate(const double &OldX, const double &OldY, const double &Angle, double &NewX, double &NewY)
Definition: linalg.cpp:611

TLinAlg::MultiplyScalar
static void MultiplyScalar(const double &k, const TFltV &x, TFltV &y)
Definition: linalg.cpp:414

TVec::Clr
void Clr(const bool &DoDel=true, const TSizeTy &NoDelLim=-1)
Clears the contents of the vector.
Definition: ds.h:971

TLinAlg::NormalizeL1
static void NormalizeL1(TFltV &x)
Definition: linalg.cpp:380

TSigmoid::operator()
double operator()(const double &x) const
Definition: linalg.h:486

TNumericalStuff::LUSolve
static void LUSolve(const TFltVV &A, const TIntV &indx, TFltV &b)
Definition: linalg.cpp:974

TLinAlg::Norm2
static double Norm2(const TFltV &x)
Definition: linalg.cpp:320

ssotFull
Definition: linalg.h:406

TVVec< TFlt >

TVec::PutAll
void PutAll(const TVal &Val)
Sets all elements of the vector to value Val.
Definition: ds.h:1166

TMatrix::GetRows
int GetRows() const
Definition: linalg.h:45

TLinAlg::GEMM_B_T
Definition: linalg.h:263

TNumericalStuff::CholeskyDecomposition
static void CholeskyDecomposition(TFltVV &A, TFltV &p)
Definition: linalg.cpp:797

TSIn::Load
void Load(bool &Bool)
Definition: fl.h:84

TFullColMatrix::RowN
int RowN
Definition: linalg.h:129

TLinAlg::NormLinf
static double NormLinf(const TFltV &x)
Definition: linalg.cpp:390

TLinAlg::AddVec
static void AddVec(const double &k, const TFltV &x, const TFltV &y, TFltV &z)
Definition: linalg.cpp:232

TLinAlg::DECOMP_SVD
Definition: linalg.h:268

TLinAlg::GEMM_A_T
Definition: linalg.h:263

TSparseColMatrix::PGetRows
int PGetRows() const
Definition: linalg.h:71

TSparseRowMatrix::PMultiply
virtual void PMultiply(const TFltVV &B, int ColId, TFltV &Result) const
Definition: linalg.cpp:101

TSigmoid::TSigmoid
TSigmoid()
Definition: linalg.h:474

TLAMisc::PrintTIntV
static void PrintTIntV(const TIntV &Vec, const TStr &VecNm)
Definition: linalg.cpp:1735

TMatrix::GetCols
int GetCols() const
Definition: linalg.h:47

TSigmoid::GetSigmoidAB
void GetSigmoidAB(double &A_, double &B_)
Definition: linalg.h:489

TSparseColMatrix::ColN
int ColN
Definition: linalg.h:58

TNumericalStuff::nrerror
static void nrerror(const TStr &error_text)
Definition: linalg.cpp:655

TSparseRowMatrix::Load
void Load(TSIn &SIn)
Definition: linalg.h:119

TNumericalStuff::EigSymmetricTridiag
static void EigSymmetricTridiag(TFltV &d, TFltV &e, int n, TFltVV &z)
Definition: linalg.cpp:740

TSparseColMatrix::ColSpVV
TVec< TIntFltKdV > ColSpVV
Definition: linalg.h:60

TLAMisc::PrintTFltVV
static void PrintTFltVV(const TFltVV &A, const TStr &MatrixNm)
Definition: linalg.cpp:1724

TNumericalStuff::SolveSymetricSystem
static void SolveSymetricSystem(TFltVV &A, const TFltV &b, TFltV &x)
Definition: linalg.cpp:837

TLAMisc::FillZero
static void FillZero(TFltVV &M)
Definition: linalg.h:527

TFullColMatrix::Load
void Load(TSIn &SIn)
Definition: linalg.h:151

TMatrix::Transposed
bool Transposed
Definition: linalg.h:10

TSOut
Definition: fl.h:128

TLAMisc::Fill
static void Fill(TFltVV &M, const double &Val)

TLAMisc::SaveMatlabTIntV
static void SaveMatlabTIntV(const TIntV &m, const TStr &FName)
Definition: linalg.cpp:1622

TSparseColMatrix::PMultiply
virtual void PMultiply(const TFltVV &B, int ColId, TFltV &Result) const
Definition: linalg.cpp:3

TMatrix
Definition: linalg.h:8

TSOut::Save
void Save(const bool &Bool)
Definition: fl.h:173

TLinAlg::Multiply
static void Multiply(const TFltVV &A, const TFltV &x, TFltV &y)
Definition: linalg.cpp:428

TSigmoid::TSigmoid
TSigmoid(TSIn &SIn)
Definition: linalg.h:480

TNumericalStuff::SymetricToTridiag
static void SymetricToTridiag(TFltVV &a, int n, TFltV &d, TFltV &e)
Definition: linalg.cpp:668

TNumericalStuff::CholeskySolve
static void CholeskySolve(const TFltVV &A, const TFltV &p, const TFltV &b, TFltV &x)
Definition: linalg.cpp:815

TSparseSVD::SimpleLanczos
static void SimpleLanczos(const TMatrix &Matrix, const int &NumEig, TFltV &EigValV, const bool &DoLocalReortoP=false, const bool &SvdMatrixProductP=false)
Definition: linalg.cpp:1053

TMatrix::Multiply
void Multiply(const TFltVV &B, int ColId, TFltV &Result) const
Definition: linalg.h:24

TExcept
Definition: ut.h:161

TFullColMatrix::ColV
TVec< TFltV > ColV
Definition: linalg.h:131

TPair< TFlt, TFlt >

TSparseColMatrix::RowN
int RowN
Definition: linalg.h:58

TLinAlg::NormL1
static double NormL1(const TFltV &x)
Definition: linalg.cpp:357

TSparseColMatrix
Definition: linalg.h:55

TLAMisc::LoadMatlabTFltVV
static void LoadMatlabTFltVV(const TStr &FNm, TVec< TFltV > &ColV)
Definition: linalg.cpp:1670

TSparseRowMatrix::PMultiplyT
virtual void PMultiplyT(const TFltVV &B, int ColId, TFltV &Result) const
Definition: linalg.cpp:79

TLinAlg::GEMM_C_T
Definition: linalg.h:263

TMatrix::Multiply
void Multiply(const TFltV &Vec, TFltV &Result) const
Definition: linalg.h:29

TNumericalStuff
Definition: linalg.h:300

TLAMisc::SaveCsvTFltV
static void SaveCsvTFltV(const TFltV &Vec, TSOut &SOut)
Definition: linalg.cpp:1598

TNumericalStuff::pythag
static double pythag(double a, double b)
Definition: linalg.cpp:660

TStr
Definition: dt.h:412

TSigmoid
Definition: linalg.h:454

TSigmoid::B
TFlt B
Definition: linalg.h:457

TLAMisc::SaveMatlabTFltV
static void SaveMatlabTFltV(const TFltV &m, const TStr &FName)
Definition: linalg.cpp:1612

TLAMisc::FillIdentity
static void FillIdentity(TFltVV &M)
Definition: linalg.cpp:1751

TSparseRowMatrix::TSparseRowMatrix
TSparseRowMatrix(TVec< TIntFltKdV > _RowSpVV, const int &_RowN, const int &_ColN)
Definition: linalg.h:112

TFlt::Load
void Load(TSIn &SIn)
Definition: dt.h:1312

TNumericalStuff::LUDecomposition
static void LUDecomposition(TFltVV &A, TIntV &indx, double &d)
Definition: linalg.cpp:909

TFullColMatrix::PMultiply
virtual void PMultiply(const TFltVV &B, int ColId, TFltV &Result) const
Definition: linalg.cpp:147

TLinAlg::DotProduct
static double DotProduct(const TFltV &x, const TFltV &y)
Definition: linalg.cpp:165

TSparseRowMatrix::ColN
int ColN
Definition: linalg.h:93

TSigmoid::TSigmoid
TSigmoid(const double &A_, const double &B_)
Definition: linalg.h:475

TNumericalStuff::InverseSubstitute
static void InverseSubstitute(TFltVV &A, const TFltV &p)
Definition: linalg.cpp:843

TFullColMatrix::Save
void Save(TSOut &SOut)
Definition: linalg.h:150

TMatrix::~TMatrix
virtual ~TMatrix()
Definition: linalg.h:21

TLinAlg::Inverse
static void Inverse(const TFltVV &A, TFltVV &B, const TLinAlgInverseType &DecompType)
Definition: linalg.cpp:548

TLAMisc::ToSpVec
static void ToSpVec(const TFltV &Vec, TIntFltKdV &SpVec, const double &CutWordWgtSumPrc=0.0)
Definition: linalg.cpp:1785

TSparseSVD::OrtoIterSVD
static void OrtoIterSVD(const TMatrix &Matrix, int NumSV, int IterN, TFltV &SgnValV)
Definition: linalg.cpp:1021

TVec::Add
TSizeTy Add()
Adds a new element at the end of the vector, after its current last element.
Definition: ds.h:574

TMatrix::TMatrix
TMatrix()
Definition: linalg.h:20

TLinAlg::Gemm
static void Gemm(const double &Alpha, const TFltVV &A, const TFltVV &B, const double &Beta, const TFltVV &C, TFltVV &D, const int &TransposeFlags)
Definition: linalg.cpp:493

TLinAlg::LinComb
static void LinComb(const double &p, const TFltV &x, const double &q, const TFltV &y, TFltV &z)
Definition: linalg.cpp:218

TLinAlg::ConvexComb
static void ConvexComb(const double &p, const TFltV &x, const TFltV &y, TFltV &z)
Definition: linalg.cpp:227

TMatrix::MultiplyT
void MultiplyT(const TFltV &Vec, TFltV &Result) const
Definition: linalg.h:39

TNumericalStuff::InverseSymetric
static void InverseSymetric(TFltVV &A)
Definition: linalg.cpp:872

TSparseColMatrix::PGetCols
int PGetCols() const
Definition: linalg.h:72

TFlt::Save
void Save(TSOut &SOut) const
Definition: dt.h:1309

TLAMisc::PrintTFltV
static void PrintTFltV(const TFltV &Vec, const TStr &VecNm)
Definition: linalg.cpp:1714

TSparseSVD
Definition: linalg.h:407

TFullColMatrix::PMultiplyT
virtual void PMultiplyT(const TFltVV &B, int ColId, TFltV &Result) const
Definition: linalg.cpp:133

TSparseSVD::MultiplyATA
static void MultiplyATA(const TMatrix &Matrix, const TFltVV &Vec, int ColId, TFltV &Result)
Definition: linalg.cpp:1003

TLinAlg::EuclDist2
static double EuclDist2(const TFltV &x, const TFltV &y)
Definition: linalg.cpp:298

TVec< TFlt >

TNumericalStuff::sign
static double sign(double a, double b)
Definition: linalg.cpp:651

TSparseColMatrix::TSparseColMatrix
TSparseColMatrix()
Definition: linalg.h:75

TSparseRowMatrix
Definition: linalg.h:90