Testing of sequences by simulation

Abstract: Let $\xi$ be a random integer vector, having uniform distribution [\mathbf{P} {\xi = (i_1,i_2,...,i_n) = 1/n^n } \ \hbox{for} \ 1 \leq i_1,i_2,...,i_n\leq n.] A realization $(i_1,i_2,...,i_n)$ of $\xi$ is called \textit{good}, if its elements are different. We present algorithms \textsc{Linear}, \textsc{Backward}, \textsc{Forward}, \textsc{Tree}, \textsc{Garbage}, \textsc{Bucket} which decide whether a given realization is good. We analyse the number of comparisons and running time of these algorithms using simulation gathering data on all possible inputs for small values of $n$ and generating random inputs for large values of $n$.