A sum-product theorem in function fields
Abstract
Let A be a finite subset of , the field of Laurent series in 1/t over a finite field Fq. We show that for any ε>0 there exists a constant C dependent only on ε and q such that \|A+A|,|AA|\≥ C |A|6/5-ε. In particular such a result is obtained for the rational function field Fq(t). Identical results are also obtained for finite subsets of the p-adic field Qp for any prime p.
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