Exact permutation test based on HL2-estimator
data: x[1:5] and y[1:5]
D = 0.4821, p-value = 0.3333
alternative hypothesis: true location shift is not equal to 0
sample estimates:
HL2 of x and y
0.1932608
Exact permutation test based on HL2-estimator
data: x[1:5] and y[1:5]
D = 0.24926, p-value = 0.4048
alternative hypothesis: true location shift is not equal to 0
sample estimates:
HL2 of x and y
0.1932608
Exact permutation test based on HL2-estimator
data: x[1:5] and y[1:5]
S = -1.6143, p-value = 0.04762
alternative hypothesis: true ratio of squared scale parameters is not equal to 1
sample estimates:
HL2 of log(x^2) and log(y^2)
-4.623997
Exact permutation test based on HL2-estimator
data: x[1:5] and y[1:5]
S = -1.6207, p-value = 0.06349
alternative hypothesis: true ratio of squared scale parameters is not equal to 1
sample estimates:
HL2 of log(x^2) and log(y^2)
-4.623997
Randomization test based on HL2-estimator (10000 random permutations)
data: x[1:10] and y[1:10]
D = 0.90794, p-value = 0.05849
alternative hypothesis: true location shift is not equal to 0
sample estimates:
HL2 of x and y
0.6350023
Randomization test based on HL2-estimator (10000 random permutations)
data: x[1:10] and y[1:10]
D = 0.88651, p-value = 0.07779
alternative hypothesis: true location shift is not equal to 0
sample estimates:
HL2 of x and y
0.6350023
Randomization test based on HL2-estimator (10000 random permutations)
data: x[1:10] and y[1:10]
S = -0.75847, p-value = 0.128
alternative hypothesis: true ratio of squared scale parameters is not equal to 1
sample estimates:
HL2 of log(x^2) and log(y^2)
-2.170979
Randomization test based on HL2-estimator (10000 random permutations)
data: x[1:10] and y[1:10]
S = -0.76733, p-value = 0.1301
alternative hypothesis: true ratio of squared scale parameters is not equal to 1
sample estimates:
HL2 of log(x^2) and log(y^2)
-2.170979
Asymptotic test based on HL2-estimator
data: x and y
D = 1.7672, p-value = 0.07719
alternative hypothesis: true location shift is not equal to 0
sample estimates:
HL2 of x and y
0.3994309
Asymptotic test based on HL2-estimator
data: x and y
S = -1.32, p-value = 0.1868
alternative hypothesis: true ratio of squared scale parameters is not equal to 1
sample estimates:
HL2 of log(x^2) and log(y^2)
-0.7145174
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