Logical queries

R.W. Oldford

September 5, 2021

One of the principal strengths of linked plots is the ease with which one can form complex logical queries on the data.

library(loon)

Some interactive plots

To explore the data, several interactive plots will likely have been constructed. Typically, these will have been constructed one at a time and assigned to the same linking group (perhaps via the inspector).

Below, histograms/barplots are constructed for each categorical variable and assigned to that variable name now prefixed by h_ for “histogram”.

for (varName in varTypes$categorical) {
    assign(paste0("h_", varName),
           l_hist(mtcars[ , varName], showFactors = TRUE,  
                  xlabel = varName, title = varName, 
                  linkingGroup = "Motor Trend"))
}

These are not evaluated in this vignette. Note that all are in the same linkingGroup.

Other linked plots might exist as well – for example, a scatterplot of gear (the number of forward gears) versus disp (the engine displacement in cubic inches).

p <- with(mtcars, l_plot(disp, cyl, 
                         xlabel = "engine displacement", ylabel = "number of cylinders",
                         title = "1974 Motor Trend cars", 
                         linkingGroup = "Motor Trend",
                         size = 10, showScales = TRUE,
                         itemLabel = rownames(mtcars), showItemLabels = TRUE
                         ))

Note that - each car’s name appears as the itemLabel for that point in the plot (to be revealed as a “tooltip” style pop up), and that - the plot p is in the same linking group as the histograms.

Through a combination of selection, inversion, deactivation, and reactivation, logical queries may be made interactively on the data.

For simplicity, the basic logical operators are illustrated below using only the histograms. More generally, these apply to any interactive loon graphic.

Interactive logical operations

Five logical conditions/operations illustrated here are the basic ones:

  1. A is TRUE
  2. Negation: (NOT A) is TRUE
  3. Inclusive OR: (A OR B) is TRUE (one or the other or both),
  4. Conjunction: (A AND B) are both TRUE
  5. Exclusive OR: (A XOR B) meaning (A is TRUE) or (B is TRUE) but (A AND B) is FALSE

Each of these corresponds to a sequence of actions on the plots and/or inspector. Whatever is highlighted in the end corresponds to the result.

Again, for simplicity all operations are illustrated by interacting with values of categorical variates in the various histograms. Any of the logical elements could also have been that satisfying numerical constraints by undertaking the corresponding actions on a scatterplot (or histogram of continuous values).

Each logical operator is illustrated in turn:

  1. A (\(= A\))

    on the plot select A,

    • e.g., click on "manual" bar from the Transmission histogram

    • highlighted \(\iff\) Transmission == "manual" is TRUE

  2. NOT A (\(= \overline{A}~~\) or \(~~\neg A\))

    on a plot select A,

    from the inspector click invert

    • e.g., click on "North America" bar from the continent histogram,

      then invert

    • highlighted \(\iff\) continent == "North America" is FALSE

    • all that is highlighted is not "North America", namely "Asia" or "Europe"

  3. A OR B (\(= A \cup B~~\) or \(~~A \lor B\)),

    on a plot select A,

    on the same (or a different but linked) plot <SHIFT>- select B

    • e.g., click on "manual" bar from Transmission histogram,

      then while holding down the <SHIFT> key,

      click on the Mercedes bar in the company histogram

    • highlighted \(\iff\) Transmission == "manual" is TRUE OR company = "Mercedes" is TRUE (or both)

  4. A AND B (\(= A \cap B\) or \(A \land B\))

    lots of solutions, here is one that always works

    on a plot select A,

    from the inspector, invert then deactivate (only A remains),

    from a plot of the remaining select B,

    from the inspector reactivate all

    • elements are highlighted \(\iff A \cap B\)

    • e.g. try highlighting all European cars with manual transmissions.

  5. A XOR B (\(= (A \cup B) \cap (\overline{A \cap B})\) or \((A \lor B) \land \neg({A \land B})\))

    following steps in 4, select A AND B,

    from the inspector invert then deactivate (only \(\neg({A \land B})\) remains)

    following steps in 3, select A OR B,

    from the inspector reactivate (only A XOR B is highlighted)

Other logical conditions (including numerical ones such as disp > 300 on the scatterplot p) are constructed as a combination of the above (as in exclusive or).

These can be quite complex and it may help, after some number of steps, to mark intermediary results by colour (or also glyph in scatterplots).

Note that because of possibly missing data, not all linked plots may share the same set of observations.

Missing data and linking keys

The mtcars data is an example of a complete data set. Had there been missing values, then these would not appear in loon plots that require them.

For example, suppose data has four variables A, B, C, and D, and

data <- data.frame(A = sample(c(rnorm(10), NA), 10, replace = FALSE),
                   B = sample(c(rnorm(10), NA), 10, replace = FALSE),
                   C = sample(c("firebrick", "steelblue", NA), 10, replace = TRUE),
                   D = sample(c(1:10, NA), 10, replace = FALSE))
p_test <- l_plot(x = data$A, y = data$B, color = data$C, linkingGroup = "test missing")
h_test <- l_hist(x = data$D, color = data$C, linkingGroup = "test missing")

Then

Using logical operations on the original data to change plot properties (e.g. select values) can be challenging when data values are missing in the plot (since what is missing depends on what was missing at the time of its construction).

For example,

p_test["selected"] <- (data$A > 0)

may not work!

There are two general approaches to logical queries when data contains NAs.

  1. Using complete data

    If, like mtcars, the data being used contains no NAs then conducting logical queries on the plot will be identical to conducting them on the data.

    If the data is not complete (contains one or more NA), it can be made complete by removing all observations (rows) that contain an NA. E.g. replacing data by c_data <- na.omit(data).

    • any logic on c_data will match that on plots made from c_data.

    • depending on the amount and pattern of missing data, this could critically reduce the amount of data in the analysis.

  2. Using the information in the loon plots. Of course, this is the recommended approach when data is missing.

    Logical queries can then be made

    1. directly on the plots, either

      • interactively as described in the previous sections, or,
      • programmatically as in p_test["x"] > 0 in place of data$A > 0.

      or

    2. directly on the data and applied to the plots

      To help manage this, the linkingKey of each plot can be used.

      • the default value for each plot is a character vector with entries

        from "0" to "n-1" where n =nrow(data)`.

        These are easily turned into the row numbers for the original data.

        E.g. in p_test the row numbers of data that correspond to the points is

        1 + as.numeric(p_test["linkingKey"])

        Logical values for the rows of data can then select points in p as follows

        LogVal <- data$A > data$B
        p["selected"] <- logVal[1 + as.numeric(p_test["linkingKey"])]

        Similarly for h_test. E.g., compare p_test["linkingKey"] and h_test["linkingKey]".

    • Note: the user can always provide their own character vector linkingKey for their plots.

      • E.g., linkingKey = rownames(data)

      If so, then more care may be needed to use these to identify rows in a logical vector.

loon’s linking model

Loon’s linking model has the following three parts

Observations in different plots (in the same linking group) are linked (in that their linked states change together) if and only if they have the same linking key.

Points appearing in different plots (in the same linkingGroup) which matched on the value of their linkingKey will share the same value for their linked states.