Growth of recurrences with mixed multifold convolutions

Abstract

Generalizing some popular sequences like Catalan's number, Schr\"oder's number, etc, we consider the sequence sn with s0=1 and for n 1, multline* sn=Σx1+…+x_1=n-1 1 sx1… sx_1 + … +Σx1+…+x_t'=n-1 t' sx1… sx_t'+\\ x1+…+x_t'+1=n-1 t'+1 sx1… sx_t'+1 + … + x1+…+x_t=n-1 t sx1… sx_t, multline* where xi are nonnegative integers, 1,…,t are positive integers, and 1,…,t are positive reals. We show that it is possible to compute the growth rate λ of sn to any precision. In particular, for every n 2, \[ [n]* L(n-1) s1 sn λ [n]318 3 + 2s1 L2* n3 n + 12 3 + s1 L2* sn, \]where L=i i and *=i for some i with i 2, and the logarithm has the base L+1 L. The constants in the inequalities are not very well optimized and serve mostly as a proof of concept with the ratio of the upper bound and the lower bound converging to 1 as n goes to infinity.

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