On multiplicative decompositions of polynomial sequences, III
Tom 193 / 2020
Acta Arithmetica 193 (2020), 193-216
MSC: 11N25, 11N32, 11D41.
DOI: 10.4064/aa190410-23-7
Opublikowany online: 24 January 2020
Streszczenie
In two earlier papers we studied the multiplicative decomposability of polynomial sequences $\{f(x):x\in \mathbb Z ,f(x) \gt 0\}$. Here we extend this problem by considering also sequences which can be obtained from sequences of this type by changing “not too many” elements of them. In particular, we prove the multiplicative analogue of a theorem of Szemerédi and the second author (related to a problem of Erdős).
