.Modelica.Blocks.Continuous.Internal.Filter.roots.bandStop .Modelica.Blocks.Continuous.Internal.Filter.roots.bandStopThe goal is to implement the filter in the following form:
// complex conjugate poles:
der(x1) = a*x1 - b*x2 + ku*u;
der(x2) = b*x1 + a*x2;
y = k1*x1 + k2*x2 + u;
ku = (a^2 + b^2)/b
k1 = 2*a/ku
k2 = (c0 + a^2 - b^2)/(b*ku)
This representation has the following transfer function:
// complex conjugate poles
s*x2 = a*x2 + b*x1
s*x1 = -b*x2 + a*x1 + ku*u
or
(s-a)*x2 = b*x1 -> x2 = b/(s-a)*x1
(s + b^2/(s-a) - a)*x1 = ku*u -> (s(s-a) + b^2 - a*(s-a))*x1 = ku*(s-a)*u
-> (s^2 - 2*a*s + a^2 + b^2)*x1 = ku*(s-a)*u
or
x1 = ku*(s-a)/(s^2 - 2*a*s + a^2 + b^2)*u
x2 = b/(s-a)*ku*(s-a)/(s^2 - 2*a*s + a^2 + b^2)*u
= b*ku/(s^2 - 2*a*s + a^2 + b^2)*u
y = k1*x1 + k2*x2 + u
= (k1*ku*(s-a) + k2*b*ku + s^2 - 2*a*s + a^2 + b^2) / (s^2 - 2*a*s + a^2 + b^2)*u
= (s^2 + (k1*ku-2*a)*s + k2*b*ku - k1*ku*a + a^2 + b^2) / (s^2 - 2*a*s + a^2 + b^2)*u
= (s^2 + c0 + a^2 - b^2 - 2*a^2 + a^2 + b^2) / (s^2 - 2*a*s + a^2 + b^2)*u
= (s^2 + c0) / (s^2 - 2*a*s + a^2 + b^2)*u
comparing coefficients with
y = (s^2 + c0) / (s^2 + c1*s + c0)*u -> a = -c1/2
b = sqrt(c0 - a^2)
comparing with eigenvalue representation:
(s - (a+jb))*(s - (a-jb)) = s^2 -2*a*s + a^2 + b^2
shows that:
a: real part of eigenvalue
b: imaginary part of eigenvalue
function bandStop extends Modelica.Icons.Function; input Real cr_in[:] "Coefficients of real poles of base filter"; input Real c0_in[:] "Coefficients of s^0 term of base filter if conjugate complex pole"; input Real c1_in[size(c0_in, 1)] "Coefficients of s^1 term of base filter if conjugate complex pole"; input Modelica.SIunits.Frequency f_min "Band of band stop filter is f_min (A=-3db) .. f_max (A=-3db)"; input Modelica.SIunits.Frequency f_max "Upper band frequency"; output Real a[size(cr_in, 1) + 2 * size(c0_in, 1)] "Real parts of complex conjugate eigenvalues"; output Real b[size(cr_in, 1) + 2 * size(c0_in, 1)] "Imaginary parts of complex conjugate eigenvalues"; output Real ku[size(cr_in, 1) + 2 * size(c0_in, 1)] "Gains of input terms"; output Real k1[size(cr_in, 1) + 2 * size(c0_in, 1)] "Gains of y = k1*x1 + k2*x"; output Real k2[size(cr_in, 1) + 2 * size(c0_in, 1)] "Gains of y = k1*x1 + k2*x"; end bandStop;