In adaptive nonlinear control Lyapunov's 2nd or Direct method became a fundamental tool in control design. Recently the application of the "Sigmoid Generated Fixed Point Transformation (SGFPT)" has been introduced for replacing the Lyapunov technique. This systematic method has been presented for the generation of whole families of Fixed Point Transformations and has been extended from Single Input Single Output (SISO) to Multiple Input Multiple Output (MIMO) systems. Furthermore, the Stretched Sigmoid Functions have been introduced. In this paper a new function of this family have been investigated in order to obtain a more precise positioning of the function in the vicinity of the solution of the control task. The applicability and effect...
This paper introduces a new scheme for sliding mode control using symmetry principles for a rotating...
The traditional approach in the design of adaptive controllers for nonlinear dynamic systems normall...
This paper considers the stabilization problem of Inertia Wheel Pendulum, a widely studied benchmark...
Recently a systematic method was presented for the generation of whole families of "Fixed Point Tran...
Lately a systematic method was presented for the generation of whole families of Fixed Point Transfo...
With the aim of evading the difficulties of the Lyapunov function-based techniques in the control of...
Lyapunov\u2019s 2nd or Direct method is recognized as being the primary tool of adaptive control of ...
The great majority of the adaptive nonlinear control design are based on Lyapunov's 2nd or commonly ...
Up to now the fundamental tool of adaptive nonlinear control design is Lyapunov's 2nd or "Direct" Me...
In this paper a further step towards a novel approach to adaptive nonlinear control developed at Bud...
Despite its excellent performance as a controller for linear and non-linear systems, the fuzzy logic...
In this paper a further step towards a novel approach to adaptive nonlinear control developed at Bud...
The neurons as living cells work as essentially nonlinear oscillators or spike generators. In the ca...
Due to the nature of Proportional-Integrative-Derivative (PID) controller, the inverted pendulum wil...
In this manuscript, an adaptive control strategy is presented for the inverted pendulum motion and p...
This paper introduces a new scheme for sliding mode control using symmetry principles for a rotating...
The traditional approach in the design of adaptive controllers for nonlinear dynamic systems normall...
This paper considers the stabilization problem of Inertia Wheel Pendulum, a widely studied benchmark...
Recently a systematic method was presented for the generation of whole families of "Fixed Point Tran...
Lately a systematic method was presented for the generation of whole families of Fixed Point Transfo...
With the aim of evading the difficulties of the Lyapunov function-based techniques in the control of...
Lyapunov\u2019s 2nd or Direct method is recognized as being the primary tool of adaptive control of ...
The great majority of the adaptive nonlinear control design are based on Lyapunov's 2nd or commonly ...
Up to now the fundamental tool of adaptive nonlinear control design is Lyapunov's 2nd or "Direct" Me...
In this paper a further step towards a novel approach to adaptive nonlinear control developed at Bud...
Despite its excellent performance as a controller for linear and non-linear systems, the fuzzy logic...
In this paper a further step towards a novel approach to adaptive nonlinear control developed at Bud...
The neurons as living cells work as essentially nonlinear oscillators or spike generators. In the ca...
Due to the nature of Proportional-Integrative-Derivative (PID) controller, the inverted pendulum wil...
In this manuscript, an adaptive control strategy is presented for the inverted pendulum motion and p...
This paper introduces a new scheme for sliding mode control using symmetry principles for a rotating...
The traditional approach in the design of adaptive controllers for nonlinear dynamic systems normall...
This paper considers the stabilization problem of Inertia Wheel Pendulum, a widely studied benchmark...