Picturesque convolution-like recurrences and partial sums' generation

Abstract

Let b=\b0,\,b1,\,…\ be the known sequence of numbers such that b0≠0. In this work, we develop methods to find another sequence a=\a0,\,a1,\,…\ that is related to b as follows: an=a0\,bn+m+a1\,bn+m-1+…+an+m\,b0, n∈N\0\, m∈N. We show the connection of n∞an with a0,\,a1,\,…,\,am-1 and provide varied examples of finding the sequence a when b is given. We demonstrate that the sequences a may exhibit pretty patterns in the plane or space. Also, we show that the properly chosen sequence b may define a as some famous sequences, such as the partial sums of the Riemann zeta function, etc.