Esempio n. 1
0
        /// <summary>
        /// This function executes the backward reduction algorithm provided in
        /// the assignment text given an augmented matrix in row Echelon form.
        /// </summary>
        ///
        /// <param name="a">
        /// An N-by-M augmented matrix in row Echelon form.
        /// </param>
        ///
        /// <returns>
        /// The resulting N-by-M matrix after executing the algorithm.
        /// </returns>
        public static Matrix BackwardReduction(this Matrix a)
        {
            Vector pRow      = new Vector(0);
            int    pRowIndex = -1;
            int    uCol      = -1;

            // Finds pivot row
            for (int i = a.M_Rows - 1; i >= 0; i--)
            {
                pRow = a.Row(i);
                if (BasicExtensions.IsZeroVector(pRow))
                {
                    continue;
                }

                pRowIndex = i;
                uCol      = BasicExtensions.FirstValueIndex(pRow);
                break;
            }

            // Scale pivot row to 1
            a.ElementaryRowScaling(pRowIndex, 1.0 / pRow[uCol]);

            // Using pivot row to reduce entries to zero
            for (int i = 0; i < a.M_Rows; i++)
            {
                if (i == pRowIndex)
                {
                    break;
                }
                a.ElementaryRowReplacement(i, -a[i, uCol], pRowIndex);
            }

            // If this was the last row to be scaled end of recursion is reached.
            if (a.M_Rows - 1 <= 0)
            {
                return(a);
            }

            // step 2 forming submatrix to process other rows. Last row of a is excluded.
            Vector[] subMatrixVectors = new Vector[a.M_Rows - 1];
            for (int i = 0; i < subMatrixVectors.Length; i++)
            {
                subMatrixVectors[i] = a.Row(i);
            }

            Matrix subMatrix = BasicExtensions.VectorCombine(subMatrixVectors);

            subMatrix = subMatrix.BackwardReduction();

            Vector[] retVectors = new Vector[a.M_Rows];

            retVectors[a.M_Rows - 1] = a.Row(a.M_Rows - 1);

            for (int i = 0; i < a.M_Rows - 1; i++)
            {
                retVectors[i] = subMatrix.Row(i);
            }

            return(BasicExtensions.VectorCombine(retVectors));
        }
Esempio n. 2
0
        /// <summary>
        /// This function executes the forward reduction algorithm provided in
        /// the assignment text to achieve row Echelon form of a given
        /// augmented matrix.
        /// </summary>
        ///
        /// <param name="a">
        /// An N-by-M augmented matrix.
        /// </param>
        ///
        /// <returns>
        /// An N-by-M matrix that is the row Echelon form.
        /// </returns>
        public static Matrix ForwardReduction(this Matrix a)
        {
            // If submatrix has zero rows, end of recursion is reached
            if (a.M_Rows - 1 <= 0)
            {
                return(a);
            }

            Vector colJ = new Vector(0);
            var    pRow = -1;

            // step 1 locate pivot column
            for (var colLoop = 0; colLoop < a.N_Cols; colLoop++)
            {
                colJ = a.Column(colLoop);
                if (BasicExtensions.IsZeroVector(colJ))
                {
                    continue;
                }

                // step 2 find first non-zero entry
                pRow = BasicExtensions.FirstValueIndex(colJ);

                break;
            }

            // if all rows are zero rows end of recursion is reached.
            if (pRow == -1)
            {
                return(a);
            }


            // step 2 reduction
            a.ElementaryRowInterchange(0, pRow);
            for (var i = 1; i < colJ.Size; i++)
            {
                a.ElementaryRowReplacement(i, (-colJ[i] / colJ[0]), 0);
            }

            // step 3 forming submatrix.
            Vector[] subMatrixVectors = new Vector[a.M_Rows - 1];
            for (int i = 1; i < a.M_Rows; i++)
            {
                subMatrixVectors[i - 1] = a.Row(i);
            }

            Matrix subMatrix = BasicExtensions.VectorCombine(subMatrixVectors);

            // applying steps 1 and 2 on submatrix
            subMatrix = subMatrix.ForwardReduction();

            // building return matrix with vectors
            Vector[] retVectors = new Vector[a.M_Rows];

            retVectors[0] = a.Row(0);

            for (int i = 1; i < a.M_Rows; i++)
            {
                retVectors[i] = subMatrix.Row(i - 1);
            }

            return(BasicExtensions.VectorCombine(retVectors));
        }