#define C_7x T(64)*pow7(x)-T(112)*pow5(x)+T(56)*pow3(x)-T(7)*x |
the analytic form of the distortion pattern that we will use to fit to the arc lamp spectra 2-dimensional chebychev polynomials
Referenced by Cheby2D_7< coeff_t, coeff_t >::get_nth_basis().
#define C_6x T(32)*pow6(x)-T(48)*pow4(x)+T(18)*pow2(x)-T(1) |
Referenced by Cheby2D_7< coeff_t, coeff_t >::get_nth_basis().
#define C_5x T(16)*pow5(x)-T(20)*pow3(x)+T(5)*x |
Referenced by Cheby2D_5< T, Tpar >::get_nth_basis(), and Cheby2D_7< coeff_t, coeff_t >::get_nth_basis().
#define C_4x T(8)*pow4(x)-T(8)*pow2(x)+1 |
Referenced by Cheby2D_5< T, Tpar >::get_nth_basis(), and Cheby2D_7< coeff_t, coeff_t >::get_nth_basis().
#define C_3x T(4)*pow3(x)-T(3)*x |
Referenced by Cheby2D_5< T, Tpar >::get_nth_basis(), and Cheby2D_7< coeff_t, coeff_t >::get_nth_basis().
#define C_2x T(2)*pow2(x)-T(1) |
Referenced by Cheby2D_5< T, Tpar >::get_nth_basis(), and Cheby2D_7< coeff_t, coeff_t >::get_nth_basis().
#define C_1x x |
Referenced by Cheby2D_5< T, Tpar >::get_nth_basis(), and Cheby2D_7< coeff_t, coeff_t >::get_nth_basis().
#define C_7y T(64)*pow7(y)-T(112)*pow5(y)+T(56)*pow3(y)-T(7)*y |
Referenced by Cheby2D_7< coeff_t, coeff_t >::get_nth_basis().
#define C_6y T(32)*pow6(y)-T(48)*pow4(y)+T(18)*pow2(y)-T(1) |
Referenced by Cheby2D_7< coeff_t, coeff_t >::get_nth_basis().
#define C_5y T(16)*pow5(y)-T(20)*pow3(y)+T(5)*y |
Referenced by Cheby2D_5< T, Tpar >::get_nth_basis(), and Cheby2D_7< coeff_t, coeff_t >::get_nth_basis().
#define C_4y T(8)*pow4(y)-T(8)*pow2(y)+1 |
Referenced by Cheby2D_5< T, Tpar >::get_nth_basis(), and Cheby2D_7< coeff_t, coeff_t >::get_nth_basis().
#define C_3y T(4)*pow3(y)-T(3)*y |
Referenced by Cheby2D_5< T, Tpar >::get_nth_basis(), and Cheby2D_7< coeff_t, coeff_t >::get_nth_basis().
#define C_2y T(2)*pow2(y)-T(1) |
Referenced by Cheby2D_5< T, Tpar >::get_nth_basis(), and Cheby2D_7< coeff_t, coeff_t >::get_nth_basis().
#define C_1y y |
Referenced by Cheby2D_5< T, Tpar >::get_nth_basis(), and Cheby2D_7< coeff_t, coeff_t >::get_nth_basis().