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Effective formulas for linear recurrence sequences of integers

We propose a new definition of effective formulas for problems in enumerative combinatorics. We outline the proof of the fact that every linear recurrence sequence of integers has such a formula. It follows from a lower bound that can be deduced from the Skolem-Mahler-Lech theorem and the Subspace Theorem. We will give details of this deduction that is due to P. Corvaja in the full version of this extended abstract.

preprint2020arXivOpen access

Martin Klazar

math.CO math.NT

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Martin Klazar

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Effective formulas for linear recurrence sequences of integers

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