Sparse Reconstruction with Compressed Sensing: Difference between revisions

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Revision as of 02:27, 28 November 2021

Author: Ngoc Ly (SysEn 5800 Fall 2021)

Introduction

$x\in \mathbb {R} ^{N}$ often not really sparse but aproximently sparse

Φ ∈ R M × N $\Phi \in \mathbb {R} ^{M\times N}$ for M � N i $M\ll N$ s a Random Gaussian or Bernoulli matrix

y ∈ R M $y\in \mathbb {R} ^{M}$ are the observed y samples

e ∈ R M nosie vector k e k 2 ≤ η

s.t.

How can we reconstruct x from y = Φx + e

The goal is to reconstruct x 0 ∈ R N given y and Φ

Sensing matrix Φ must satisfy RIP i.e. Random Gaussian or Bernoulli ma-

traxies satsifies (cite)

let [ N ] = { 1, . . . , N } be an index set

[ N ] enumerates the colums of Φ and x

Φ is an underdetermined systems with infinite solutions. Why l 2 norm does

not work

What is compression is sunomunus with to the sparcity.

The problem formulation is to recover sparse data x 0 ∈ R N

The support of x 0 is supp ( x 0 ) = { i ∈ [ N ] : x 0 ( i ) 6 = 0 }

we say x is k sparse when | supp ( x )| ≤ k

We are interested in the smallest supp ( x ) , i.e. min(supp ( x ) )

Restricted isometry property (RIP) Introduced by Candes, Tao

Random Gausian and Bernoulli satsifies RIP

Let Φ ∈ R M × N satsify RIP, Let [ N ] be an index set

Before we get into RIP lets talk about RIC

Resiricted Isometry Constant (RIC) is the smallest δ | s s.t. s ⊆ [ N ] that satsi-

fies the RIP condition

For s is a restrciton on x denoted by x | s x ∈ R N tos k-sparse x s.t. RIP is

satisified the s = | Γ | i.e. s ⊆ [ N ] and Φ | s ⊆ Φ where the columns of Φ | s is

indexed by i ∈ S

�

x i , i f i ∈ S

( x | S ) i =

0 otherwise

RIP defined as

( 1 − δ s )k x k 22 ≤ k Φx k 22 ≤ ( 1 + δ s )k x k 22

3 Lemmas Page 267 Blumensath Davies IHT for CS

Lemma 1(Blumensath, Davis 2009 Iterative hard thresholding for compressed

sensing), For all index sets Γ and all Φ for which RIP holds with s = | Γ | that is

s = supp ( x )

1k Φ Γ T k 2 ≤

q

1 + δ | Γ | k y k 2

( 1 − δ | Γ | )k x Γ k 22 ≤ k Φ Γ T Φ Γ x Γ k 22 ≤ ( 1 + δ | Γ | )k x Γ k 22

and

k( I − Φ Γ T Φ Γ )k 2 ≤ δ | Γ | k x Γ k 2

SupposeΓ ∩ Λ = ∅

k Φ Γ T Φ Λ ) x Λ k 2 ≤ δ s k x Λ k 2

Lemma 2 (Needell Tropp, Prop 3.5 in CoSaMP: Iterative signal recovery

from incomplete and inaccurate √ samples)

If Φ satisfies RIP k Φx s k 2 ≤ 1 + δ s k x s k 2 , ∀ x s : k x s k 0 ≤ s, Then ∀ x

k Φx k 2 ≤

p

1 + δ s k x k 2 +

p

1 + δ s

k x k 1

sqrts

Lemma 3 (Needell Tropp, Prop 3.5 in CoSaMP: Iterative signal recovery

from incomplete and inaccurate samples)

Let x s be the best s-term approximation to x. Let x r = x − x s Let

y = Φx + e = Φx s + Φx r + e = Φx s + ẽ

If Φ statisfies RIP for sparcity s, then the norm of error ẽ is bounded by

k ẽ k 2 ≤

p

1 + δ s k x − x s k 2 +

p

1 + δ s

k x − x s k 1

√

+ k e k 2

s

∀ x

Theory

Gel’fend n-width

Errors E ( S, Φ, D )

Definition Mutual Coherence

LetA ∈ R M × N , themutualcoherenceµ A isde f inedby :

µ A =

|h a i , a j i|

k a i kk a j k

i 6 = j

We want a small µ A because it will be close ot the normal matrix, which

will satisfie RIP

Numerical Example

Basis Persuit

Iterative Hard Thresholding IHT

Solver

2

@@ Line 1: / Line 1: @@
 Author: Ngoc Ly (SysEn 5800 Fall 2021)
+Introduction
+<math>x \in \mathbb{R}^N</math>often not really sparse but aproximently sparse
+Φ ∈ R M × N <math>\Phi \in \mathbb{R}^{M \times N}</math>for M � N i<math>M \ll N</math>s a Random Gaussian or Bernoulli matrix
+y ∈ R M <math>y \in \mathbb{R}^M</math>are the observed y samples
+e ∈ R M nosie vector k e k 2 ≤ η
+s.t.
+How can we reconstruct x from y = Φx + e
+The goal is to reconstruct x 0 ∈ R N given y and Φ
+Sensing matrix Φ must satisfy RIP i.e. Random Gaussian or Bernoulli ma-
+traxies satsifies (cite)
+let [ N ] = { 1, . . . , N } be an index set
+[ N ] enumerates the colums of Φ and x
+Φ is an underdetermined systems with infinite solutions. Why l 2 norm does
+not work
+What is compression is sunomunus with to the sparcity.
+The problem formulation is to recover sparse data x 0 ∈ R N
+The support of x 0 is supp ( x 0 ) = { i ∈ [ N ] : x 0 ( i ) 6 = 0 }
+we say x is k sparse when | supp ( x )| ≤ k
+We are interested in the smallest supp ( x ) , i.e. min(supp ( x ) )
+Restricted isometry property (RIP) Introduced by Candes, Tao
+Random Gausian and Bernoulli satsifies RIP
+Let Φ ∈ R M × N satsify RIP, Let [ N ] be an index set
+Before we get into RIP lets talk about RIC
+Resiricted Isometry Constant (RIC) is the smallest δ | s s.t. s ⊆ [ N ] that satsi-
+fies the RIP condition
+For s is a restrciton on x denoted by x | s x ∈ R N tos k-sparse x s.t. RIP is
+satisified the s = | Γ | i.e. s ⊆ [ N ] and Φ | s ⊆ Φ where the columns of Φ | s is
+indexed by i ∈ S
+�
+x i , i f i ∈ S
+( x | S ) i =
+otherwise
+RIP defined as
+( 1 − δ s )k x k 22 ≤ k Φx k 22 ≤ ( 1 + δ s )k x k 22
+Lemmas Page 267 Blumensath Davies IHT for CS
+Lemma 1(Blumensath, Davis 2009 Iterative hard thresholding for compressed
+sensing), For all index sets Γ and all Φ for which RIP holds with s = | Γ | that is
+s = supp ( x )
+k Φ Γ T k 2 ≤
+q
++ δ | Γ | k y k 2
+( 1 − δ | Γ | )k x Γ k 22 ≤ k Φ Γ T Φ Γ x Γ k 22 ≤ ( 1 + δ | Γ | )k x Γ k 22
+and
+k( I − Φ Γ T Φ Γ )k 2 ≤ δ | Γ | k x Γ k 2
+SupposeΓ ∩ Λ = ∅
+k Φ Γ T Φ Λ ) x Λ k 2 ≤ δ s k x Λ k 2
+Lemma 2 (Needell Tropp, Prop 3.5 in CoSaMP: Iterative signal recovery
+from incomplete and inaccurate √ samples)
+If Φ satisfies RIP k Φx s k 2 ≤ 1 + δ s k x s k 2 , ∀ x s : k x s k 0 ≤ s, Then ∀ x
+k Φx k 2 ≤
+p
++ δ s k x k 2 +
+p
++ δ s
+k x k 1
+sqrts
+Lemma 3 (Needell Tropp, Prop 3.5 in CoSaMP: Iterative signal recovery
+from incomplete and inaccurate samples)
+Let x s be the best s-term approximation to x. Let x r = x − x s Let
+y = Φx + e = Φx s + Φx r + e = Φx s + ẽ
+If Φ statisfies RIP for sparcity s, then the norm of error ẽ is bounded by
+k ẽ k 2 ≤
+p
++ δ s k x − x s k 2 +
+p
++ δ s
+k x − x s k 1
+√
++ k e k 2
+s
+∀ x
+Theory
+Gel’fend n-width
+Errors E ( S, Φ, D )
+Definition Mutual Coherence
+LetA ∈ R M × N , themutualcoherenceµ A isde f inedby :
+µ A =
+|h a i , a j i|
+k a i kk a j k
+i 6 = j
+We want a small µ A because it will be close ot the normal matrix, which
+will satisfie RIP
+Numerical Example
+Basis Persuit
+Iterative Hard Thresholding IHT
+Solver

Sparse Reconstruction with Compressed Sensing: Difference between revisions

Revision as of 02:27, 28 November 2021

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