stats (version 3.1.1)

stepfun: Step Function Class

Description

Given the vectors $(x[1], \dots, x[n])$ and $(y[0], y[1], \dots, y[n])$ (one value more!), stepfun(x, y, ...) returns an interpolating ‘step’ function, say fn. I.e., $fn(t) = c$$[i]$ (constant) for $t in ( x[i], x[i+1])$ and at the abscissa values, if (by default) right = FALSE, $fn(x[i]) = y[i]$ and for right = TRUE, $fn(x[i]) = y[i-1]$, for $i=1, \dots, n$.

The value of the constant $c[i]$ above depends on the ‘continuity’ parameter f. For the default, right = FALSE, f = 0, fn is a cadlag function, i.e., continuous at right, limit (‘the point’) at left. In general, $c[i]$ is interpolated in between the neighbouring $y$ values, $c[i] = (1-f)*y[i] + f*y[i+1]$. Therefore, for non-0 values of f, fn may no longer be a proper step function, since it can be discontinuous from both sides, unless right = TRUE, f = 1 which is right-continuous.

Usage

stepfun(x, y, f = as.numeric(right), ties = "ordered", right = FALSE)
is.stepfun(x) knots(Fn, ...) as.stepfun(x, ...)
"print"(x, digits = getOption("digits") - 2, ...)
"summary"(object, ...)

Arguments

x
numeric vector giving the knots or jump locations of the step function for stepfun(). For the other functions, x is as object below.
y
numeric vector one longer than x, giving the heights of the function values between the x values.
f
a number between 0 and 1, indicating how interpolation outside the given x values should happen. See approxfun.
ties
Handling of tied x values. Either a function or the string "ordered". See approxfun.
right
logical, indicating if the intervals should be closed on the right (and open on the left) or vice versa.
Fn, object
an R object inheriting from "stepfun".
digits
number of significant digits to use, see print.
...
potentially further arguments (required by the generic).

Value

A function of class "stepfun", say fn.There are methods available for summarizing ("summary(.)"), representing ("print(.)") and plotting ("plot(.)", see plot.stepfun) "stepfun" objects.The environment of fn contains all the information needed;
"x","y"
the original arguments
"n"
number of knots (x values)
"f"
continuity parameter
"yleft", "yright"
the function values outside the knots
"method"
(always == "constant", from approxfun(.)).
The knots are also available via knots(fn).

See Also

ecdf for empirical distribution functions as special step functions and plot.stepfun for plotting step functions.

approxfun and splinefun.

Examples

Run this code
y0 <- c(1., 2., 4., 3.)
sfun0  <- stepfun(1:3, y0, f = 0)
sfun.2 <- stepfun(1:3, y0, f = 0.2)
sfun1  <- stepfun(1:3, y0, f = 1)
sfun1c <- stepfun(1:3, y0, right = TRUE) # hence f=1
sfun0
summary(sfun0)
summary(sfun.2)

## look at the internal structure:
unclass(sfun0)
ls(envir = environment(sfun0))

x0 <- seq(0.5, 3.5, by = 0.25)
rbind(x = x0, f.f0 = sfun0(x0), f.f02 = sfun.2(x0),
      f.f1 = sfun1(x0), f.f1c = sfun1c(x0))
## Identities :
stopifnot(identical(y0[-1], sfun0 (1:3)), # right = FALSE
          identical(y0[-4], sfun1c(1:3))) # right = TRUE

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