示例#1
0
        public static void print(Stream output, ZMatrix mat, string format)
        {
            string type = "dense64";

            Console.WriteLine("Type = " + type + " complex , numRows = " + mat.getNumRows() + " , numCols = " +
                              mat.getNumCols());

            format += " ";

            Complex_F64 c = new Complex_F64();

            for (int y = 0; y < mat.getNumRows(); y++)
            {
                for (int x = 0; x < mat.getNumCols(); x++)
                {
                    mat.get(y, x, c);
                    Console.Write(format, c.real, c.imaginary);
                    if (x < mat.getNumCols() - 1)
                    {
                        Console.Write(" , ");
                    }
                }
                Console.WriteLine();
            }
        }
示例#2
0
        public static void assertEquals(ZMatrix A, ZMatrix B, double tol)
        {
            assertShape(A, B);

            Complex_F64 a = new Complex_F64();
            Complex_F64 b = new Complex_F64();

            for (int i = 0; i < A.getNumRows(); i++)
            {
                for (int j = 0; j < A.getNumCols(); j++)
                {
                    A.get(i, j, a);
                    B.get(i, j, b);

                    assertTrue(!double.IsNaN(a.real) && !double.IsNaN(b.real),
                               "Real At (" + i + "," + j + ") A = " + a.real + " B = " + b.real);
                    assertTrue(!double.IsInfinity(a.real) && !double.IsInfinity(b.real),
                               "Real At (" + i + "," + j + ") A = " + a.real + " B = " + b.real);
                    assertTrue(Math.Abs(a.real - b.real) <= tol,
                               "Real At (" + i + "," + j + ") A = " + a.real + " B = " + b.real);

                    assertTrue(!double.IsNaN(a.imaginary) && !double.IsNaN(b.imaginary),
                               "Img At (" + i + "," + j + ") A = " + a.imaginary + " B = " + b.imaginary);
                    assertTrue(!double.IsInfinity(a.imaginary) && !double.IsInfinity(b.imaginary),
                               "Img At (" + i + "," + j + ") A = " + a.imaginary + " B = " + b.imaginary);
                    assertTrue(Math.Abs(a.imaginary - b.imaginary) <= tol,
                               "Img At (" + i + "," + j + ") A = " + a.imaginary + " B = " + b.imaginary);
                }
            }
        }
示例#3
0
        /**
         * Checks to see if the provided matrix is within tolerance to an identity matrix.
         *
         * @param mat Matrix being examined.  Not modified.
         * @param tol Tolerance.
         * @return True if it is within tolerance to an identify matrix.
         */
        public static bool isIdentity(ZMatrix mat, double tol)
        {
            // see if the result is an identity matrix
            Complex_F64 c = new Complex_F64();

            for (int i = 0; i < mat.getNumRows(); i++)
            {
                for (int j = 0; j < mat.getNumCols(); j++)
                {
                    mat.get(i, j, c);
                    if (i == j)
                    {
                        if (!(Math.Abs(c.real - 1) <= tol))
                        {
                            return(false);
                        }
                        if (!(Math.Abs(c.imaginary) <= tol))
                        {
                            return(false);
                        }
                    }
                    else
                    {
                        if (!(Math.Abs(c.real) <= tol))
                        {
                            return(false);
                        }
                        if (!(Math.Abs(c.imaginary) <= tol))
                        {
                            return(false);
                        }
                    }
                }
            }

            return(true);
        }