Conceptual Clustering - PowerPoint PPT Presentation

About This Presentation
Title:

Conceptual Clustering

Description:

Conceptual Clustering Unsupervised, spontaneous - categorizes or postulates concepts without a teacher Conceptual clustering forms a classification tree - all initial ... – PowerPoint PPT presentation

Number of Views:64
Avg rating:3.0/5.0
Slides: 12
Provided by: TonyMa48
Learn more at: https://axon.cs.byu.edu
Category:

less

Transcript and Presenter's Notes

Title: Conceptual Clustering


1
Conceptual Clustering
  • Unsupervised, spontaneous - categorizes or
    postulates concepts without a teacher
  • Conceptual clustering forms a classification tree
    - all initial observations in root - create new
    children using single attribute (not good),
    attribute combinations (all), information
    metrics, etc. - Each node is a class
  • Should decide quality of class partition and
    significance (noise)
  • Many models use search to discover hierarchies
    which fulfill some heuristic within and/or
    between clusters - similarity, cohesiveness, etc.

2
Cobweb
  • Cobweb is an incremental hill-climbing strategy
    with bidirectional operators - not backtrack, but
    could return in theory
  • Starts empty. Creates a full concept hierarchy
    (classification tree) with each leaf representing
    a single instance/object. You can choose how
    deep in the tree hierarchy you want to go for the
    specific application at hand
  • Objects described as nominal attribute-value
    pairs
  • Each created node is a probabilistic concept (a
    class) which stores probability of being matched
    (count/total), and for each attribute,
    probability of being on, P(avC), only counts
    need be stored.
  • Arcs in tree are just connections - nodes store
    info across all attributes (unlike ID3, etc.)

3
Category Utility Heuristic Measure
  • Tradeoff between intra-class similarity and
    inter-class dissimilarity - sums measures from
    each individual attribute
  • Intra-class similarity a function of P(Ai
    VijCk), Predictability of C given V - Larger P
    means if class is C, A likely to be V. Objects
    within a class should have similar attributes.
  • Inter-class dissimilarity a function of P(CkAi
    Vij), Predictiveness of C given V - Larger P
    means AV suggests instance is member of class C
    rather than some other class. A is a stronger
    predictor of class C.

4
Category Utility Intuition
  • Both should be high over all (most) attributes
    for a good class breakdown
  • Predictability P(VC) could be high for multiple
    classes, giving a relatively low P(CV), thus not
    good for discrimination
  • Predictiveness P(CV) could be high for a class,
    while P(VC) is relatively low, due to V
    occurring rarely, thus good for discrimination,
    but not intra-class similarity
  • When both are high, get best categorization
    balance between discrimination and intra-class
    similarity

5
Category Utility
  • For each category sum predictability times
    predictiveness for each attribute weighted by
    P(Ai Vij), with k proposed categories, i
    attributes, j values/attribute
  • The expected number of attribute
  • values one could guess given C

6
Category Utility
  • Category Utility is the increase in expected
    attributes that could be guessed, given a
    partitioning of categories - leaf nodes.
  • CU(C1, C2, ... Ck)
  • K normalizes CU for different numbers of
    categories in the candidate partition
  • Since incremental, there is a limited number of
    possible categorization partitions
  • If Ai Vij is independent (irrelevant) of class
    membership, CU 0

7
Cobweb Learning Algorithm
  • 1. Incrementally add a new training example
  • 2. Recurse down the at root until new node with
    just this example is added. Update appropriate
    probabilities at each level.
  • 3. At each level of the tree calculate the
    scores for all valid modifications using category
    utility (CU)
  • 4. Depending on which of the following gives the
    best score
  • Classify into an existing class - then recurse
  • Create a new class node done, can get next
    example
  • Combine two classes into a single class (Merging)
    - then recurse
  • Divide a class into multiple classes (Splitting)
    - then recurse

8
Cobweb Learning Mechanisms
  • Classifying (Matching) - calculate overall CU for
    each case of putting the example in a node at
    current level
  • New Class - calculate overall CU for putting
    example into a single new class- Note gradient
    descent (greedy) nature. Does not go back and
    try all possible new partitions.
  • If created from internal node, simply add
  • If created from leaf node, split into two, one
    for new and old
  • These alone are quite order dependent - splitting
    and merging allow bi-directionality - ability to
    undo

9
Cobweb Learning Mechanisms
  • Merging - For best matching node (the one that
    would be chosen for classification) and the
    second best matching node at that level,
    calculate CU when both are merged into one node,
    with two children
  • Splitting - For best matching node, calculate CU
    if that node were deleted and its children added
    to the current level.
  • Both schemes could be extended to test other
    nodes, at the cost of increased computational
    complexity
  • Can overcome initial misconceptions

10
Cobweb Comments
  • Generalization done by just executing recursive
    classification step
  • Could use different variations on CU and search
    strategy
  • Complexity O(AVB2logK) for each example, where B
    is branching factor, A (attributes), V (average
    number of values), K (classes)
  • Empirically, B usually between 2 and 5
  • Does not directly handle noise - no defined
    significance mechanism
  • Tends to make bushy trees, however high levels
    should be most important class categories
    (because of merge/split causing best breaks to
    float up, though no optimal guarantee), and one
    could just use nodes highest in the tree for
    classification
  • Does not support continuous values

11
Extensions - Classit
  • Cannot store probability counts for continuous
    data
  • Classit uses a scheme similar to Cobweb, but
    assumes normal distribution around an attribute
    and thus can just store a mean and variance - not
    always a reasonable assumption
  • Also uses a formal cut-off (significance)
    mechanism to better support generalization and
    noise handling (a class node can then include
    outliers)
  • More work needed
Write a Comment
User Comments (0)
About PowerShow.com