We solve the output controller synthesis problem for multidimensional systems, guaranteeing
the following parameters, either predefined or achievable: control errors, stability
margin radius, and control time under the action of polyharmonic external disturbances with
unknown amplitudes (with a limit on their sum), frequencies, and an unbounded number of
harmonics. Our approach to solving the problem is based on a specially designed standard
H-inf-optimization problem and a new rule for choosing a weight matrix for a given accuracy.
For the first time, we give a physical interpretation of the stability margin radius of multidimensional
systems in terms of Nyquist hodographs for individual contours that are open at
the output of the object. We prove a connection between the absolute stability property of a
closed system and the radius of stability margin. We consider the example of synthesis for an
interconnected electric drive.