Graph dynamical system

Template:One source In control theory, dynamical systems are in strict-feedback form when they can be expressed as

${\displaystyle \{\begin{array}{l}\dot{\mathbf{x}}=f_0(\mathbf{x})+g_0(\mathbf{x})z_1\\ {\dot{z}}_1=f_1(\mathbf{x},z_1)+g_1(\mathbf{x},z_1)z_2\\ {\dot{z}}_2=f_2(\mathbf{x},z_1,z_2)+g_2(\mathbf{x},z_1,z_2)z_3\\ ⋮\\ {\dot{z}}_i=f_i(\mathbf{x},z_1,z_2,\dots ,z_{i-1},z_i)+g_i(\mathbf{x},z_1,z_2,\dots ,z_{i-1},z_i)z_{i+1}\text{ for }1\le i<k-1\\ ⋮\\ {\dot{z}}_{k-1}=f_{k-1}(\mathbf{x},z_1,z_2,\dots ,z_{k-1})+g_{k-1}(\mathbf{x},z_1,z_2,\dots ,z_{k-1})z_k\\ {\dot{z}}_k=f_k(\mathbf{x},z_1,z_2,\dots ,z_{k-1},z_k)+g_k(\mathbf{x},z_1,z_2,\dots ,z_{k-1},z_k)u\end{array}}$

where

• ${\displaystyle \mathbf{x}\in {\mathbb{ℝ}}^n}$ with ${\displaystyle n\ge 1}$,
• ${\displaystyle z_1,z_2,\dots ,z_i,\dots ,z_{k-1},z_k}$ are scalars,
• ${\displaystyle u}$ is a scalar input to the system,
• ${\displaystyle f_0,f_1,f_2,\dots ,f_i,\dots ,f_{k-1},f_k}$ vanish at the origin (i.e., ${\displaystyle f_i(0,0,\dots ,0)=0}$),
• ${\displaystyle g_1,g_2,\dots ,g_i,\dots ,g_{k-1},g_k}$ are nonzero over the domain of interest (i.e., ${\displaystyle g_i(\mathbf{x},z_1,\dots ,z_k)\ne 0}$ for ${\displaystyle 1\le i\le k}$).

Here, strict feedback refers to the fact that the nonlinear functions ${\displaystyle f_i}$ and ${\displaystyle g_i}$ in the ${\displaystyle {\dot{z}}_i}$ equation only depend on states ${\displaystyle x,z_1,\dots ,z_i}$ that are fed back to that subsystem.^[1] That is, the system has a kind of lower triangular form.

Stabilization

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Systems in strict-feedback form can be stabilized by recursive application of backstepping.^[1] That is,

1. It is given that the system

   ${\displaystyle \dot{\mathbf{x}}=f_0(\mathbf{x})+g_0(\mathbf{x})u_x(\mathbf{x})}$

   is already stabilized to the origin by some control ${\displaystyle u_x(\mathbf{x})}$ where ${\displaystyle u_x(\mathbf{0})=0}$. That is, choice of ${\displaystyle u_x}$ to stabilize this system must occur using some other method. It is also assumed that a Lyapunov function ${\displaystyle V_x}$ for this stable subsystem is known.

2. A control ${\displaystyle u_1(\mathbf{x},z_1)}$ is designed so that the system

   ${\displaystyle {\dot{z}}_1=f_1(\mathbf{x},z_1)+g_1(\mathbf{x},z_1)u_1(\mathbf{x},z_1)}$

   is stabilized so that ${\displaystyle z_1}$ follows the desired ${\displaystyle u_x}$ control. The control design is based on the augmented Lyapunov function candidate

   ${\displaystyle V_1(\mathbf{x},z_1)=V_x(\mathbf{x})+\frac{1}{2}(z_1-u_x(\mathbf{x}){)}^2}$

   The control ${\displaystyle u_1}$ can be picked to bound ${\displaystyle {\dot{V}}_1}$ away from zero.

3. A control ${\displaystyle u_2(\mathbf{x},z_1,z_2)}$ is designed so that the system

   ${\displaystyle {\dot{z}}_2=f_2(\mathbf{x},z_1,z_2)+g_2(\mathbf{x},z_1,z_2)u_2(\mathbf{x},z_1,z_2)}$

   is stabilized so that ${\displaystyle z_2}$ follows the desired ${\displaystyle u_1}$ control. The control design is based on the augmented Lyapunov function candidate

   ${\displaystyle V_2(\mathbf{x},z_1,z_2)=V_1(\mathbf{x},z_1)+\frac{1}{2}(z_2-u_1(\mathbf{x},z_1){)}^2}$

   The control ${\displaystyle u_2}$ can be picked to bound ${\displaystyle {\dot{V}}_2}$ away from zero.

4. This process continues until the actual ${\displaystyle u}$ is known, and
   • The real control ${\displaystyle u}$ stabilizes ${\displaystyle z_k}$ to fictitious control ${\displaystyle u_{k-1}}$.
   • The fictitious control ${\displaystyle u_{k-1}}$ stabilizes ${\displaystyle z_{k-1}}$ to fictitious control ${\displaystyle u_{k-2}}$.
   • The fictitious control ${\displaystyle u_{k-2}}$ stabilizes ${\displaystyle z_{k-2}}$ to fictitious control ${\displaystyle u_{k-3}}$.
   • ...
   • The fictitious control ${\displaystyle u_2}$ stabilizes ${\displaystyle z_2}$ to fictitious control ${\displaystyle u_1}$.
   • The fictitious control ${\displaystyle u_1}$ stabilizes ${\displaystyle z_1}$ to fictitious control ${\displaystyle u_x}$.
   • The fictitious control ${\displaystyle u_x}$ stabilizes ${\displaystyle \mathbf{x}}$ to the origin.

This process is known as backstepping because it starts with the requirements on some internal subsystem for stability and progressively steps back out of the system, maintaining stability at each step. Because

• ${\displaystyle f_i}$ vanish at the origin for ${\displaystyle 0\le i\le k}$,
• ${\displaystyle g_i}$ are nonzero for ${\displaystyle 1\le i\le k}$,
• the given control ${\displaystyle u_x}$ has ${\displaystyle u_x(\mathbf{0})=0}$,

then the resulting system has an equilibrium at the origin (i.e., where ${\displaystyle \mathbf{x}=\mathbf{0}}$, ${\displaystyle z_1=0}$, ${\displaystyle z_2=0}$, ... , ${\displaystyle z_{k-1}=0}$, and ${\displaystyle z_k=0}$) that is globally asymptotically stable.

See also

• Nonlinear control
• Backstepping

References

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