7.3 ℓ_1 minimization proof

An introduction to compressive Page 1 / 1

In this module we prove one of the core lemmas that is used throughout this course to establish results regarding ℓ_1 minimization.

We now establish one of the core lemmas that we will use throughout this course . Specifically, [link] is used in establishing the relationship between the RIP and the NSP as well as establishing results on $ℓ_{1}$ minimization in the context of sparse recovery in both the noise-free and noisy settings. In order to establish [link] , we establish the following preliminary lemmas.

Suppose $u, v$ are orthogonal vectors. Then

{∥u∥}_{2} + {∥v∥}_{2} \leq \sqrt{2} {∥u + v∥}_{2} .

We begin by defining the $2 \times 1$ vector $w = {[{∥u∥}_{2}, {∥v∥}_{2}]}^{T}$ . By applying standard bounds on $ℓ_{p}$ norms (Lemma 1 from "The RIP and the NSP" ) with $K = 2$ , we have ${∥w∥}_{1} \leq \sqrt{2} {∥w∥}_{2}$ . From this we obtain

{∥u∥}_{2} + {∥v∥}_{2} \leq \sqrt{2} \sqrt{{∥u∥}_{2}^{2} + {∥v∥}_{2}^{2}} .

Since $u$ and $v$ are orthogonal, ${∥u∥}_{2}^{2} + {∥v∥}_{2}^{2} = {∥u + v∥}_{2}^{2}$ , which yields the desired result.

If $Φ$ satisfies the restricted isometry property (RIP) of order $2 K$ , then for any pair of vectors $u, v \in Σ_{K}$ with disjoint support,

|〈Φ u, Φ v〉| \leq δ_{2 K} {∥u∥}_{2} {∥v∥}_{2} .

Suppose $u, v \in Σ_{K}$ with disjoint support and that ${∥u∥}_{2} = {∥v∥}_{2} = 1 .$ Then, $u \pm v \in Σ_{2 K}$ and ${∥u \pm v∥}_{2}^{2} = 2$ . Using the RIP we have

2 (1 - δ_{2 K}) \leq {∥Φ u \pm Φ v∥}_{2}^{2} \leq 2 (1 + δ_{2 K}) .

Finally, applying the parallelogram identity

|〈Φ u, Φ v〉| \leq \frac{1}{4} |{∥Φ u + Φ v∥}_{2}^{2} - {∥Φ u - Φ v∥}_{2}^{2}| \leq δ_{2 K}

establishes the lemma.

Let $Λ_{0}$ be an arbitrary subset of ${1, 2, ..., N}$ such that $| Λ_{0} | \leq K$ . For any vector $u \in R^{N}$ , define $Λ_{1}$ as the index set corresponding to the $K$ largest entries of $u_{Λ_{0}^{c}}$ (in absolute value), $Λ_{2}$ as the index set corresponding to the next $K$ largest entries, and so on. Then

\sum_{j \geq 2} {∥u_{Λ_{j}}∥}_{2} \leq \frac{{∥u_{Λ_{0}^{c}}∥}_{1}}{\sqrt{K}} .

We begin by observing that for $j \geq 2$ ,

{∥u_{Λ_{j}}∥}_{\infty} \leq \frac{{∥u_{Λ_{j - 1}}∥}_{1}}{K}

since the $Λ_{j}$ sort $u$ to have decreasing magnitude. Applying standard bounds on $ℓ_{p}$ norms (Lemma 1 from "The RIP and the NSP" ) we have

\sum_{j \geq 2} {∥u_{Λ_{j}}∥}_{2} \leq \sqrt{K} \sum_{j \geq 2} {∥u_{Λ_{j}}∥}_{\infty} \leq \frac{1}{\sqrt{K}} \sum_{j \geq 1} {∥u_{Λ_{j}}∥}_{1} = \frac{{∥u_{Λ_{0}^{c}}∥}_{1}}{\sqrt{K}},

proving the lemma.

We are now in a position to prove our main result. The key ideas in this proof follow from [link] .

Suppose that $Φ$ satisfies the RIP of order $2 K$ . Let $Λ_{0}$ be an arbitrary subset of ${1, 2, ..., N}$ such that $| Λ_{0} | \leq K$ , and let $h \in R^{N}$ be given. Define $Λ_{1}$ as the index set corresponding to the $K$ entries of $h_{Λ_{0}^{c}}$ with largest magnitude, and set $Λ = Λ_{0} \cup Λ_{1}$ . Then

{∥h_{Λ}∥}_{2} \leq α \frac{{∥h_{Λ_{0}^{c}}∥}_{1}}{\sqrt{K}} + β \frac{|〈Φ h_{Λ}, Φ h〉|}{{∥h_{Λ}∥}_{2}},

where

α = \frac{\sqrt{2} δ_{2 K}}{1 - δ_{2 K}}, β = \frac{1}{1 - δ_{2 K}} .

Since $h_{Λ} \in Σ_{2 K}$ , the lower bound on the RIP immediately yields

(1 - δ_{2 K}) {∥h_{Λ}∥}_{2}^{2} \leq {∥Φ, h_{Λ}∥}_{2}^{2} .

Define $Λ_{j}$ as in [link] , then since $Φ h_{Λ} = Φ h - \sum_{j \geq 2} Φ h_{Λ_{j}}$ , we can rewrite [link] as

(1 - δ_{2 K}) {∥h_{Λ}∥}_{2}^{2} \leq 〈Φ h_{Λ}, Φ h〉 - 〈Φ h_{Λ}, \sum_{j \geq 2} Φ h_{Λ_{j}}〉 .

In order to bound the second term of [link] , we use [link] , which implies that

|〈Φ h_{Λ_{i}}, Φ h_{Λ_{j}}〉| \leq δ_{2 K} {∥h_{Λ_{i}}∥}_{2} {∥h_{Λ_{j}}∥}_{2},

for any $i, j$ . Furthermore, [link] yields ${∥h_{Λ_{0}}∥}_{2} + {∥h_{Λ_{1}}∥}_{2} \leq \sqrt{2} {∥h_{Λ}∥}_{2}$ . Substituting into [link] we obtain

\begin{matrix} |〈Φ h_{Λ}, \sum_{j \geq 2} Φ h_{Λ_{j}}〉| & = |\sum_{j \geq 2} 〈Φ h_{Λ_{0}}, Φ h_{Λ_{j}}〉 + \sum_{j \geq 2} 〈Φ h_{Λ_{1}}, Φ h_{Λ_{j}}〉| \\ \leq \sum_{j \geq 2} |〈Φ h_{Λ_{0}}, Φ h_{Λ_{j}}〉| + \sum_{j \geq 2} |〈Φ h_{Λ_{1}}, Φ h_{Λ_{j}}〉| \\ \leq δ_{2 K} {∥h_{Λ_{0}}∥}_{2} \sum_{j \geq 2} {∥h_{Λ_{j}}∥}_{2} + δ_{2 K} {∥h_{Λ_{1}}∥}_{2} \sum_{j \geq 2} {∥h_{Λ_{j}}∥}_{2} \\ \leq \sqrt{2} δ_{2 K} {∥h_{Λ}∥}_{2} \sum_{j \geq 2} {∥h_{Λ_{j}}∥}_{2} . \end{matrix}

From [link] , this reduces to

|〈Φ h_{Λ}, \sum_{j \geq 2} Φ h_{Λ_{j}}〉| \leq \sqrt{2} δ_{2 K} {∥h_{Λ}∥}_{2} \frac{{∥h_{Λ_{0}^{c}}∥}_{1}}{\sqrt{K}} .

Combining [link] with [link] we obtain

\begin{matrix} (1 - δ_{2 K}) {∥h_{Λ}∥}_{2}^{2} & \leq |〈Φ h_{Λ}, Φ h〉 - 〈Φ h_{Λ}, \sum_{j \geq 2} Φ h_{Λ_{j}}〉| \\ \leq |〈Φ h_{Λ}, Φ h〉| + |〈Φ h_{Λ}, \sum_{j \geq 2} Φ h_{Λ_{j}}〉| \\ \leq |〈Φ h_{Λ}, Φ h〉| + \sqrt{2} δ_{2 K} {∥h_{Λ}∥}_{2} \frac{{∥h_{Λ_{0}^{c}}∥}_{1}}{\sqrt{K}}, \end{matrix}

which yields the desired result upon rearranging.

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Source: OpenStax, An introduction to compressive sensing. OpenStax CNX. Apr 02, 2011 Download for free at http://legacy.cnx.org/content/col11133/1.5

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