Lientz: The empirical Lientz function and the Lientz mode estimator
In paulponcet/modeest: Mode Estimation
Description
Usage
Arguments
Details
Value
Note
References
See Also
Examples
Description
The Lientz mode estimator is nothing but the value minimizing the empirical
Lientz function. A 'plot' and a 'print' methods are provided.
Usage
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Arguments
x
numeric (vector of observations) or an object of class "lientz".
bw
numeric. The smoothing bandwidth to be used.
Should belong to (0, 1). Parameter 'beta' in Lientz (1970) function.
zoom
logical. If TRUE, one can zoom on the graph created.
...
if abc = FALSE, further arguments to be passed to
optim, or further arguments to be passed to
plot.
digits
numeric. Number of digits to be printed.
abc
logical. If FALSE (the default), the Lientz empirical function
is minimised using optim.
par
numeric. The initial value used in optim.
optim.method
character. If abc = FALSE, the method used in
optim.
Details
The Lientz function is the smallest non-negative quantity S(x,b),
where b = bw, such that
F(x+S(x,b)) - F(x-S(x,b)) >= b.
Lientz (1970) provided a way to estimate S(x,b); this estimate
is what we call the empirical Lientz function.
Value
lientz returns an object of class c("lientz", "function");
this is a function with additional attributes:
x the x argument
bw the bw argument
call the call which produced the result
mlv.lientz returns a numeric value, the mode estimate.
If abc = TRUE, the x value minimizing the Lientz empirical
function is returned. Otherwise, the optim method is
used to perform minimization, and the attributes: 'value', 'counts',
'convergence' and 'message', coming from the optim
method, are added to the result.
Note
The user may call mlv.lientz through
mlv(x, method = "lientz", ...).
References
Lientz B.P. (1969).
On estimating points of local maxima and minima of density functions.
Nonparametric Techniques in Statistical Inference (ed. M.L. Puri, Cambridge University Press, p.275-282.
Lientz B.P. (1970).
Results on nonparametric modal intervals.
SIAM J. Appl. Math., 19:356-366.
Lientz B.P. (1972).
Properties of modal intervals.
SIAM J. Appl. Math., 23:1-5.
See Also
mlv for general mode estimation;
shorth for the shorth estimate of the mode
Examples
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# Unimodal distribution
x <- rbeta(1000,23,4)
## True mode
betaMode(23, 4)
## Lientz object
f <- lientz(x, 0.2)
print(f)
plot(f)
## Estimate of the mode
mlv(f) # optim(shorth(x), fn = f)
mlv(f, abc = TRUE) # x[which.min(f(x))]
mlv(x, method = "lientz", bw = 0.2)
# Bimodal distribution
x <- c(rnorm(1000,5,1), rnorm(1500, 22, 3))
f <- lientz(x, 0.1)
plot(f)
paulponcet/modeest documentation built on Nov. 19, 2019, 9:16 p.m.
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Description Usage Arguments Details Value Note References See Also Examples
Description
The Lientz mode estimator is nothing but the value minimizing the empirical Lientz function. A 'plot' and a 'print' methods are provided.
Usage
1 2 3 4 5 6 7 8 9 10 |
Arguments
x |
numeric (vector of observations) or an object of class |
bw |
numeric. The smoothing bandwidth to be used. Should belong to (0, 1). Parameter 'beta' in Lientz (1970) function. |
zoom |
logical. If |
... |
if |
digits |
numeric. Number of digits to be printed. |
abc |
logical. If |
par |
numeric. The initial value used in |
optim.method |
character. If |
Details
The Lientz function is the smallest non-negative quantity S(x,b),
where b = bw, such that
F(x+S(x,b)) - F(x-S(x,b)) >= b.
Lientz (1970) provided a way to estimate S(x,b); this estimate is what we call the empirical Lientz function.
Value
lientz returns an object of class c("lientz", "function");
this is a function with additional attributes:
x the
xargumentbw the
bwargumentcall the call which produced the result
mlv.lientz returns a numeric value, the mode estimate.
If abc = TRUE, the x value minimizing the Lientz empirical
function is returned. Otherwise, the optim method is
used to perform minimization, and the attributes: 'value', 'counts',
'convergence' and 'message', coming from the optim
method, are added to the result.
Note
The user may call mlv.lientz through
mlv(x, method = "lientz", ...).
References
Lientz B.P. (1969). On estimating points of local maxima and minima of density functions. Nonparametric Techniques in Statistical Inference (ed. M.L. Puri, Cambridge University Press, p.275-282.
Lientz B.P. (1970). Results on nonparametric modal intervals. SIAM J. Appl. Math., 19:356-366.
Lientz B.P. (1972). Properties of modal intervals. SIAM J. Appl. Math., 23:1-5.
See Also
mlv for general mode estimation;
shorth for the shorth estimate of the mode
Examples
1 2 3 4 5 6 7 8 9 10 11 12 13 14 15 16 17 18 19 20 | # Unimodal distribution
x <- rbeta(1000,23,4)
## True mode
betaMode(23, 4)
## Lientz object
f <- lientz(x, 0.2)
print(f)
plot(f)
## Estimate of the mode
mlv(f) # optim(shorth(x), fn = f)
mlv(f, abc = TRUE) # x[which.min(f(x))]
mlv(x, method = "lientz", bw = 0.2)
# Bimodal distribution
x <- c(rnorm(1000,5,1), rnorm(1500, 22, 3))
f <- lientz(x, 0.1)
plot(f)
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