We Can Do It
Our Control is based on the most modern electronics: Analog Devices Floating point DSP, Altera FLEX, ACEX or APEX programmable devices, Flash Memories.Not only algorithms, but also the control H/W may be customized and optimized by means of S/W,Our Control is based on more than 100 men/year our total experience in Control Area,
…. So when you ask “Can you do…?” the answer is: "Yes, we can do it"

Any Types of Motors
DC, DC Brushless rotary and linear(AC servo), AC Induction, Voice coils, Step and Microstep,Hydraulics and Piezo motors;

Advanced Control Algorithms
Cascaded PID algorithms, velocity and acceleration feedforward, non linear correction, antiwindup correction, notch filters, backlash compensation filters, advanced 1/T algorithms;

Fast Sample Rate
50 msec (20 kHz) Update Rate for Position, Velocity and Current loops, not depending on the number of motors;

Excellent DC Brushless Control
SW Sine Commutation for DC Brushless motors using incremental encoder only,No Hall sensors are required, No startup motion is required, Phase advance control for high speed applications;Full Digital Control, including motor currents control

Various Step Motors Control
Pulse/Direction and CW/CCW control for Step and Microstep motors, 2 and 5 phases;
DC Vector control for 2 phase step motors Micro Stepping control, Detent Torque and Torque Ripple Compensation

Step Motor as DC Brushless
With Our DC Vector Control together with S/W commutation and startup algorithms a standard Step Motors,equipped with a shaft encoder, feature a DC Brushless specifications: No Resonant, No Skip, Minimal Current consumption, Excellent Close Loop characteristic

Powerful Motion Profiles
“On the fly” Trapezoidal and S-curve profiles generation,
Target , Velocity, Acceleration and Deceleration may be changed “on the fly”;
Parabolic profile for high power applications, User Defined Profiles

Various types of interpolation between all axes
Linear, Circular, Cubic interpolation, Tables interpolation, Toroidal Interpolation, User defined Polynomial interpolation