Cumulative lift chart for CART® Classification

The procedure for the calculation of cumulative lift depends on the validation method. For a multinomial response variable, Minitab displays multiple charts that treat each class as the event in turn.

Training data set or no validation

For the chart for a training data set, each point on the chart represents a terminal node from the tree. The terminal node with the highest event probability is the first point on the chart and appears leftmost. The other terminal nodes are in order of decreasing event probability.

Use the following process to find the x- and y-coordinates for the points.

  1. Calculate the event probability of each terminal node:
    where
    • n1,k is the number of cases in the event class in the kth node
    • Nk is the number of cases in the kth node
  2. Rank the terminal nodes from highest to lowest event probability.
  3. Use every event probability as a threshold. For a specific threshold, cases with estimated event probability greater than or equal to the threshold get 1 as the predicted class, 0 otherwise. Then, you can form a 2x2 table for all cases with observed classes as rows and predicted classes as columns to calculate the true positive rate for each terminal node.

    For example, suppose the following table summarizes a tree with 4 terminal nodes:

    A: Terminal node B: Number of events C: Number of cases D: Threshold (B/C)
    4 18 30 0.60
    1 25 67 0.37
    3 12 56 0.21
    2 4 36 0.11
    Totals 59 189

    Then the following are the corresponding four tables with their respective true positive rates to 2 decimal places:

    Table 1. Threshold = 0.60. True positive rate = 18 / 59 = 0.31
    Predicted
    event nonevent
    Observed event 18 41
    nonevent 12 118
    Table 2. Threshold = 0.37. True positive rate = (18 + 25) / 59 = 0.73
    Predicted
    event nonevent
    Observed event 43 16
    nonevent 54 76
    Table 3. Threshold = 0.21. True positive rate = (18 + 25 + 12) / 59 = 0.93
    Predicted
    event nonevent
    Observed event 55 4
    nonevent 98 32
    Table 4. Threshold = 0.11. True positive rate = (18 + 25 + 12 + 4) / 59 = 1
    Predicted
    event nonevent
    Observed event 59 0
    nonevent 130 0

  4. From the sorted terminal nodes, find the percentage of the population in the terminal nodes:
    where
    • Nk is the number of cases in the kth node
    • N is the number of cases in the training data set
  5. From the sorted list, calculate the cumulative percentage of the data in each terminal node. These cumulative values are the x-coordinates on the chart.

    For example, if the terminal node with the highest predicted probability contains 0.16 of the data and the terminal node with the second-highest event probability has 0.35 of the population, then the cumulative percentage of the data for the first terminal node is 0.16 and the cumulative percentage of the population for the second terminal node is 0.16 + 0.35 = 0.51.

  6. To find the cumulative lift for the y-coordinate, divide the true positive rate and the cumulative percentage of the population:

The following table shows an example of the computations for a small tree. The values are to 2 decimal places.

A: Terminal node B: Number of events C: Number of cases D: Event probability for sorting (B/C) E: True positive rate F: Percent in data (C/ sum of C) G: Cumulative percent in data, x-coordinate H: Cumulative lift (E/G), y-coordinate
4 18 30 0.60 0.31 0.16 0.16 1.92
1 25 67 0.37 0.73 0.35 0.51 1.42
3 12 56 0.21 0.93 0.30 0.81 1.15
2 4 36 0.11 1 0.19 1.00 1

Separate test data set

Use the same steps as the training data set case but calculate the event probability from the cases for the test data set.

Test with k-fold cross-validation

The procedure to define the x- and y-coordinates on the cumulative lift chart with k-fold cross-validation has an additional step. This step creates many distinct event probabilities. For example, suppose the tree diagram contains 4 terminal nodes. We have 10-fold cross-validation. Then, for the ith fold, you use 9/10 portion of the data to estimate the event probabilities for cases in fold i. When this process repeats for each fold, the maximum number of distinct event probabilities is 4 *10 = 40. After that, sort all the distinct event probabilities in decreasing order. Use the event probabilities as each of the threshold values to assign predicted classes for cases in the entire data set. After this step, steps from 3 to the end for the training data set procedure apply to find the x- and y-coordinates.

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