Sequences Derived from The Symmetric Powers of \1,2,…,k\
Abstract
For a fixed integer k, we define a sequence Ak=(ak(n))n≥0 and a corresponding sparse subsequence Sk using the cardinality of the n-th symmetric power of the set \1,2,…, k\. For k∈\2,…,8\, we find recursive formulas for Sk, and show that the values ak(0), ak(1), and ak(3) are sufficient for constructing Ak.
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