n x d-matrix of values in [0,1], supposedly independent uniform observations in the hypercube, that is, U_i ~ U[0,1]^d, i.i.d., for i in 1..n.

n x d-matrices of copula samples to be compare against. The two matrices must have an equal number of columns d but can differ in n (number of rows).

a character string specifying the goodness-of-fit test statistic to be used, which has to be one (or a unique abbreviation) of

"Sn"

for computing the test statistic S_n from Genest, Rémillard, Beaudoin (2009).

"SnB"

for computing the test statistic S_n^(B) from Genest, Rémillard, Beaudoin (2009).

"SnC"

for computing the test statistic S_n^(C) from Genest et al. (2009).

"AnChisq"

Anderson-Darling test statistic for computing (supposedly) U[0,1]-distributed (under H_0) random variates via the distribution function of the chi-square distribution with d degrees of freedom. To be more precise, the Anderson-Darling test statistc of the variates

pchisq((Phi^{-1}(u_{i1}))^2+...+(Phi^{-1}(u_{id}))^2, df=d)

is computed (via ADGofTest::ad.test), where Phi^{-1} denotes the quantile function of the standard normal distribution function, pchisq(.,df=d) denotes the distribution function of the chi-square distribution with d degrees of freedom, and u_{ij} is the jth component in the ith row of u.

"AnGamma"

similar to method="AnChisq" but based on the variates

pgamma(-log(u_{i1})-...-log(u_{id}), shape=d),

where pgamma(.,shape=d) denotes the distribution function of the gamma distribution with shape parameter d and shape parameter one (being equal to an Erlang(d) distribution function).

logical indicating whether an R or C implementation is used.

additional arguments passed for computing the different test statistics.