S-Procedure的基本形式及使用

理论

在这里插入图片描述

$\textbf{Lemma 1. ( S- Procedure[ 34] ) : Define the quadratic func- }$
tions w.r.t. $\mathbf{x}\in\mathbb{C}^M\times1$ as
$f_m\left(\mathbf{x}\right)=\mathbf{x}^H\mathbf{A}_m\mathbf{x}+2Re\left\{\mathbf{b}_m^H\mathbf{x}\right\}+c_m,m=1,2,$
where $\mathbf{A}_m\in\mathbb{C}^{M\times M},\mathbf{b}_m\in\mathbb{C}^{M\times1},and$ $c_m\in \mathbb{R} . \textit{The}$

$condition~f_1\leq0\Rightarrow f_2\leq0~holds~if~and~only~if~there~exists$

$a\textit{ variable }\omega \geq 0\textit{ such that}$

(19)
$\omega\begin{bmatrix}\mathbf{A}_1&\mathbf{b}_1\\\mathbf{b}_1^H&c_1\end{bmatrix}-\begin{bmatrix}\mathbf{A}_2&\mathbf{b}_2\\\mathbf{b}_2^H&c_2\end{bmatrix}\succeq\mathbf{0}_{M+1}.$

理论重述

Let $f (x)$ and $g (x)$ be two quadratic forms defined as:
$x^H A x + 2 \Re(b^H x) + c$
and
$x^H D x + 2 \Re(e^H x) + f$
where $\in \mathbb{C}^{n \times n}$ are Hermitian matrices, $\in \mathbb{C}^n$ are complex vectors, and $\in \mathbb{R}$ are real constants. The superscript $H$ denotes the Hermitian (conjugate transpose) of the matrix or vector.

The implication
$\leq 0 \implies g(x) \leq 0$
holds if and only if there exists a scalar $\lambda \geq 0$ such that:
$\lambda g(x) \leq 0$
or equivalently:
$x^H (A + \lambda D) x + 2 \Re \left( (b + \lambda e)^H x \right) + (c + \lambda f) \leq 0 \quad \text{for all } x.$

This condition can be rewritten as the following matrix inequality:
$\begin{pmatrix} A + \lambda D & b + \lambda e \\ (b + \lambda e)^H & c + \lambda f \end{pmatrix} \succeq 0$
where $\succeq 0$ denotes that the matrix is positive semidefinite (PSD).

Thus, the S-Procedure states that if such a non-negative $\lambda$ exists, then the implication $\leq 0 \implies g(x) \leq 0$ holds.

实际案例

已知
$\Delta\mathbf{h}^H \Delta\mathbf{h} \leq a$

如何根据S-Procedure 理论把下列形式转化成线性矩阵不等式呢
$g(\Delta\mathbf{h}) = \Delta\mathbf{h}^H \mathbf{D} \Delta\mathbf{h} + 2 \Re(\mathbf{h}^H \mathbf{D} \Delta\mathbf{h}) + \mathbf{h}^H \mathbf{D} \mathbf{h} - z \geq 0$

实际案例详细说明

\section*{S-Procedure 推导}

\textbf{已知条件}

不等式 $f_1(\Delta \mathbf{h})$ ：
$f_1(\Delta \mathbf{h}) = \Delta \mathbf{h}^H \Delta \mathbf{h} - a \leq 0$
这表示：
$\Delta \mathbf{h}^H \Delta \mathbf{h} \leq a$
需要证明的不等式 $f_2(\Delta \mathbf{h})$ ：
$f_2(\Delta \mathbf{h}) = - \left( \Delta \mathbf{h}^H \mathbf{D} \Delta \mathbf{h} + 2 \Re (\mathbf{h}^H \mathbf{D} \Delta \mathbf{h}) + \mathbf{h}^H \mathbf{D} \mathbf{h} - z \right) \leq 0$
等价于：
$\Delta \mathbf{h}^H \mathbf{D} \Delta \mathbf{h} + 2 \Re (\mathbf{h}^H \mathbf{D} \Delta \mathbf{h}) + \mathbf{h}^H \mathbf{D} \mathbf{h} - z \geq 0$

\textbf{应用 S-Procedure}

为了应用 S-Procedure，我们需要构造两个二次型 $f_1$ 和 $f_2$ 的矩阵形式，并构造相应的线性矩阵不等式 (LMI)。

构造 $f_1(\Delta \mathbf{h})$ 的矩阵形式：
$f_1(\Delta \mathbf{h}) = \Delta \mathbf{h}^H \Delta \mathbf{h} - a$
其矩阵形式为：
$\begin{bmatrix} \mathbf{I} & \mathbf{0} \\ \mathbf{0} & -a \end{bmatrix}$
构造 $f_2(\Delta \mathbf{h})$ 的矩阵形式：
$f_2(\Delta \mathbf{h}) = - \left( \Delta \mathbf{h}^H \mathbf{D} \Delta \mathbf{h} + 2 \Re (\mathbf{h}^H \mathbf{D} \Delta \mathbf{h}) + \mathbf{h}^H \mathbf{D} \mathbf{h} - z \right)$
可以简化为：
$f_2(\Delta \mathbf{h}) = - \Delta \mathbf{h}^H \mathbf{D} \Delta \mathbf{h} - 2 \Re (\mathbf{h}^H \mathbf{D} \Delta \mathbf{h}) - (\mathbf{h}^H \mathbf{D} \mathbf{h} - z)$
其矩阵形式为：
$\begin{bmatrix} -\mathbf{D} & -\mathbf{D} \mathbf{h} \\ -\mathbf{h}^H \mathbf{D} & -(\mathbf{h}^H \mathbf{D} \mathbf{h} - z) \end{bmatrix}$
构造 S-Procedure 矩阵：

根据 S-Procedure，存在 $\mu \geq 0$ 使得：
$\mu \begin{bmatrix} \mathbf{I} & \mathbf{0} \\ \mathbf{0} & -a \end{bmatrix} - \begin{bmatrix} -\mathbf{D} & -\mathbf{D} \mathbf{h} \\ -\mathbf{h}^H \mathbf{D} & -(\mathbf{h}^H \mathbf{D} \mathbf{h} - z) \end{bmatrix} \succeq \mathbf{0}$
进一步简化为：
$\begin{bmatrix} \mu \mathbf{I} + \mathbf{D} & \mathbf{D} \mathbf{h} \\ \mathbf{h}^H \mathbf{D} & -\mu a + (\mathbf{h}^H \mathbf{D} \mathbf{h} - z) \end{bmatrix} \succeq \mathbf{0}$