User:Aene

The image segmentation problem is concerned with partitioning an image into multiple regions according to some homogeneity criterion. This article is primarily concerned with graph theoretic approaches to image segmentation.

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Applications of Image Segmentation[edit]

• Image Compression
  • Segment the image into homogeneous components, and use the most suitable compression algorithm for each component to improve compression.
• Medical Diagnosis
  • Automatic segmentation of MRI images for identification of cancerous regions.
• Mapping and Measurement
  • Automatic analysis of remote sensing data from satellites to identify and measure regions of interest.

Segmentation using Normalized Cuts[edit]

Graph theoretic formulation[edit]

The set of points in an arbitrary feature space can be represented as a weighted undirected complete graph G = (V, E), where the nodes of the graph are the points in the feature space. The weight ${\displaystyle w_{ij}}$ of an edge ${\displaystyle (i,j)\in E}$ is a function of the similarity between the nodes ${\displaystyle i}$ and ${\displaystyle j}$. In this context, we can formulate the image segmentation problem as a graph partitioning problem that asks for a partition ${\displaystyle V_{1},\cdots ,V_{k}}$ of the vertex set ${\displaystyle V}$, where, according to some measure, the vertices in any set ${\displaystyle V_{i}}$ have high similarity, and the vertices in two different sets ${\displaystyle V_{i},V_{j}}$ have low similarity.

Normalized Cuts[edit]

Let G = (V, E) be a weighted graph. Let ${\displaystyle A}$ and ${\displaystyle B}$ be two subsets of vertices.

Let:

 ${\displaystyle w(A,B)=\sum \limits _{i\in A,j\in B}w_{ij}}$

 ${\displaystyle ncut(A,B)={\frac {w(A,B)}{w(A,V)}}+{\frac {w(A,B)}{w(B,V)}}}$

 ${\displaystyle nassoc(A,B)={\frac {w(A,A)}{w(A,V)}}+{\frac {w(B,B)}{w(B,V)}}}$

In the normalized cuts approach^[1], for any cut ${\displaystyle (S,{\overline {S}})}$ in ${\displaystyle G}$, ${\displaystyle ncut(S,{\overline {S}})}$ measures the similarity between different parts, and ${\displaystyle nassoc(S,{\overline {S}})}$ measures the total similarity of vertices in the same part.

Since ${\displaystyle ncut(S,{\overline {S}})=2-nassoc(S,{\overline {S}})}$, a cut ${\displaystyle (S^{*},{\overline {S}}^{*})}$ that minimizes ${\displaystyle ncut(S,{\overline {S}})}$ also maximizes ${\displaystyle nassoc(S,{\overline {S}})}$.

Computing a cut ${\displaystyle (S^{*},{\overline {S}}^{*})}$ that minimizes ${\displaystyle ncut(S,{\overline {S}})}$ is an NP-hard problem. However, we can find in polynomial time a cut ${\displaystyle (S,{\overline {S}})}$ of small normalized weight ${\displaystyle ncut(S,{\overline {S}})}$ using spectral techniques.

The Ncut Algorithm[edit]

Let D be an ${\displaystyle n\times n}$ diagonal matrix with ${\displaystyle d}$ on the diagonal, and let ${\displaystyle W}$ be an ${\displaystyle n\times n}$ symmetrical matrix with ${\displaystyle W_{ij}=w_{ij}}$.

After some algebraic manipulations, we get:

 ${\displaystyle \min \limits _{(S,{\overline {S}})}ncut(S,{\overline {S}})=\min \limits _{y}{\frac {y^{t}(D-W)y}{y^{t}Dy}}}$

subject to the constraints:

• ${\displaystyle y_{i}\in \{1,-b\}}$, for some constant ${\displaystyle -b}$
• ${\displaystyle y^{t}D1=0}$

Minimizing ${\displaystyle {\frac {y^{t}(D-W)y}{y^{t}Dy}}}$ subject to the constraints above is NP-hard. To make the problem tractable, we relax the constraints on ${\displaystyle y}$, and allow it to take real values. The relaxed problem can be solved by solving the generalized eigenvalue problem ${\displaystyle (D-W)y=\lambda Dy}$for the second smallest generalized eigenvector.

The partitioning algoritm:

1. Given a set of features, set up a weighted graph ${\displaystyle G=(V,E)}$, compute the weight of each edge, and summarize the information in ${\displaystyle D}$ and ${\displaystyle W}$.
2. Solve ${\displaystyle (D-W)y=\lambda Dy}$ for eigenvectors with the smallest eigenvalues.
3. Use the eigenvector with the smallest eigenvalue to bipartition the graph.
4. Decide if the current partition should be subdivided.
5. Recursively partition the segmented parts, if necessary.

Example[edit]

Figures 1-7 exemplify the Ncut algorithm.

Limitations[edit]

Solving a standard eigenvalue problem for all eigenvectors (using the QR algorithm, for instance) takes ${\displaystyle O(n^{3})}$ time. This is impractical for image segmentation applications where ${\displaystyle n}$ is the number of pixels in the image.

OBJ CUT[edit]

 This section is under major construction.

OBJ CUT^[2] is an efficient method that automatically segments an object. The OBJ CUT method is a generic method, and therefore it is applicable to any object category model. Given an image D containing an instance of a known object category, e.g. cows, the OBJ CUT algorithm computes a segmentation of the object, that is, it infers a set of labels m.

Let m be a set of binary labels, and let ${\displaystyle \Theta }$ be a shape parameter(${\displaystyle \Theta }$ is a shape prior on the labels from a Layered Pictorial Structure (LPS) model). We define an energy function ${\displaystyle E(m,\Theta )}$ as follows.

 ${\displaystyle E(m,\Theta )=\sum \phi _{x}(D|m_{x})+\phi _{x}(m_{x}|\Theta )+\sum \Psi _{xy}(m_{x},m_{y})+\phi (D|m_{x},m_{y})}$  (1)

The term ${\displaystyle \phi _{x}(D|m_{x})+\phi _{x}(m_{x}|\Theta )}$ is called an unary term, and the term ${\displaystyle \Psi _{xy}(m_{x},m_{y})+\phi (D|m_{x},m_{y})}$ is called a pairwise term. An unary term consists of the likelihood ${\displaystyle \phi _{x}(D|m_{x})}$ based on color, and the unary potential ${\displaystyle \phi _{x}(m_{x}|\Theta )}$ based on the distance from ${\displaystyle \Theta }$. A pairwise term consists of a prior ${\displaystyle \Psi _{xy}(m_{x},m_{y})}$ and a contrast term ${\displaystyle \phi (D|m_{x},m_{y})}$.

The best labeling ${\displaystyle m^{*}}$ minimizes ${\displaystyle \sum \limits _{i}w_{i}E(m,\Theta _{i})}$, where ${\displaystyle w_{i}}$ is the weight of the parameter ${\displaystyle \Theta _{i}}$.

 ${\displaystyle m^{*}=\arg \min \limits _{m}\sum \limits _{i}w_{i}E(m,\Theta _{i})}$  (2)

The OBJ CUT algorithm[edit]

1. Given an image D, an object category is chosen, e.g. cows or horses.
2. The corresponding LPS model is matched to D to obtain the samples ${\displaystyle \Theta _{1},\cdots ,\Theta _{s}}$
3. The objective function given by equation (2) is determined by computing ${\displaystyle E(m,\Theta _{i})}$ and using ${\displaystyle w_{i}=g(\Theta _{i}|Z)}$
4. The objective function is minimized using a single MINCUT operation to obtain the segmentation m.

Example[edit]

Figures 8-11 exemplify the OBJ CUT algorithm.

Other approaches[edit]

• Jigsaw approach^[3]
• Image parsing ^[4]
• Interleaved segmentation ^[5]
• LOCUS ^[6]
• LayoutCRF ^[7]

References[edit]