J1: J1
In GerritEichner/kader: Kernel Adaptive Density Estimation and Regression
Description
Usage
Arguments
Details
Value
Note
See Also
Examples
Description
Eq. (15.16) in Eichner (2017) as a result of Cardano's formula.
Usage
1
Arguments
u
Numeric vector.
cc
Numeric constant, defaults to √(5/3).
Details
Using, for brevity's sake, J_{1a}(u, c) := -q_c(u) and
J_{1b}(u, c) := J_{1a}(u, c)^2 + p_c^3, the definition of
J_1 reads:
J_1(u, c) := [J_{1a}(u, c) + √(J_{1b}(u, c))]^{1/3}
+ [J_{1a}(u, c) - √(J_{1b}(u, c))]^{1/3}.
For implementation details of q_c(u) and p_c see
qc and pc, respectively.
For further mathematical details see Eichner (2017) and/or Eichner
& Stute (2013).
Value
Vector of same length and mode as u.
Note
Eq. (15.16) in Eichner (2017), and hence J_1(u, c), requires
c to be in [√(5/3), 3). If cc does
not satisfy this requirement a warning (only) is issued.
See Also
Examples
1
2
3
4
5
6
7
8
9
10
11
12
13
u <- seq(0, 1, by = 0.01)
c0 <- expression(sqrt(5/3))
c1 <- expression(sqrt(3) - 0.01)
cgrid <- c(1.35, seq(1.4, 1.7, by = 0.1))
cvals <- c(eval(c0), cgrid, eval(c1))
Y <- sapply(cvals, function(cc, u) J1(u, cc = cc), u = u)
cols <- rainbow(ncol(Y), end = 9/12)
matplot(u, Y, type = "l", lty = "solid", col = cols,
ylab = expression(J[1](u, c)))
abline(h = 0)
legend("topleft", title = "c", legend = c(c0, cgrid, c1),
lty = 1, col = cols, cex = 0.8)
GerritEichner/kader documentation built on May 10, 2019, 1:14 p.m.
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Description Usage Arguments Details Value Note See Also Examples
Description
Eq. (15.16) in Eichner (2017) as a result of Cardano's formula.
Usage
1 |
Arguments
u |
Numeric vector. |
cc |
Numeric constant, defaults to √(5/3). |
Details
Using, for brevity's sake, J_{1a}(u, c) := -q_c(u) and J_{1b}(u, c) := J_{1a}(u, c)^2 + p_c^3, the definition of J_1 reads:
J_1(u, c) := [J_{1a}(u, c) + √(J_{1b}(u, c))]^{1/3} + [J_{1a}(u, c) - √(J_{1b}(u, c))]^{1/3}.
For implementation details of q_c(u) and p_c see
qc and pc, respectively.
For further mathematical details see Eichner (2017) and/or Eichner & Stute (2013).
Value
Vector of same length and mode as u.
Note
Eq. (15.16) in Eichner (2017), and hence J_1(u, c), requires
c to be in [√(5/3), 3). If cc does
not satisfy this requirement a warning (only) is issued.
See Also
Examples
1 2 3 4 5 6 7 8 9 10 11 12 13 | u <- seq(0, 1, by = 0.01)
c0 <- expression(sqrt(5/3))
c1 <- expression(sqrt(3) - 0.01)
cgrid <- c(1.35, seq(1.4, 1.7, by = 0.1))
cvals <- c(eval(c0), cgrid, eval(c1))
Y <- sapply(cvals, function(cc, u) J1(u, cc = cc), u = u)
cols <- rainbow(ncol(Y), end = 9/12)
matplot(u, Y, type = "l", lty = "solid", col = cols,
ylab = expression(J[1](u, c)))
abline(h = 0)
legend("topleft", title = "c", legend = c(c0, cgrid, c1),
lty = 1, col = cols, cex = 0.8)
|
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