The Tower of Hanoi problem is generalized in such a way that the pegs are located at the vertices of a directed graph G, and moves of disks may be made only along edges of G. Leiss obtained a complete characterization of graphs in which arbitrarily many disks can be moved from the source vertex S to the destination vertex D. Here we consider graphs which do not satisfy this characterization; hence, there is a bound on the number of disks which can be handled. Denote by g{sub}n the maximal such number as G varies over all such graphs with n vertices and S, D vary over the vertices. Answering a question of Leiss [Finite Hanoi problems: How many discs can be handled? Congr. Numer. 44 (1984) 221-229], we prove that g{sub}n grows sub-exponentially fast. Moreover, there exists a constant C such that g{sub}n ≤ Cn{sup}(1/2log_2n) for each n. On the other hand, for each ε > 0 there exists a constant C{sub}ε > 0 such that g{sub}n ≥ C{sub}εn{sup}((1/2-ε)log_2n) for each n.
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