You need to ‘invert’ the bilinear transform using the Symbolic Math Toolbox, then solve:
syms H(s) T z Z
assume(T > 0)
Eq = s == 2/T * (z - 1)/(z + 1);
Z = solve(Eq, z)
b0 = 12.575612;
b1 = -18.9426445;
b2 = 6.4607418;
b = [b0 b1 b2];
bz = poly2sym(b, z)
bs = subs(bz,z,Z)
bs = vpa(expand(simplify(bs, 'Steps', 10)), 5)
a0 = 1.7892133;
a1 = -0.7892133;
a2 = 0;
a = [a0 a1 a2];
az = poly2sym(a, z)
as = subs(az,z,Z)
as = vpa(expand(simplify(as, 'Steps', 10)), 5)
producing:
bs = (176.38*T*s)/(T^2*s^2 - 4.0*T*s + 4.0) - 151.54/(T^2*s^2 - 4.0*T*s + 4.0) + 37.979
as = (17.471*T*s)/(T^2*s^2 - 4.0*T*s + 4.0) - 6.3137/(T^2*s^2 - 4.0*T*s + 4.0) + 2.5784
The ‘T’ variable is the sampling interval (inverse of the sampling frequency). Substitute your actual sampling interval for ‘T’, then use the numden and sym2poly functions (in that order) to create your polynomials to give to the Control System Toolbox tf function.
I leave prewarping and other design decisions to you. Incorporate it as necessary.
