Small improvements on the Ball-Rivoal theorem and its p-adic variant
Abstract
We prove that the dimension of the Q-linear span of 1,ζ(3),ζ(5),…,ζ(s-1) is at least (1.119 · s)/(1+ 2) for any sufficiently large even integer s. This slightly refines a well-known result of Rivoal (2000) or Ball-Rivoal (2001). Quite unexpectedly, the proof only involves inserting the arithmetic observation of Zudilin (2001) into the original proof of Ball-Rivoal. Although this result is covered by a recent development of Fischler (2021+), our proof has the advantages of being simple and providing explicit non-vanishing small linear forms in 1 and odd zeta values. Moreover, we establish the p-adic variant: for any prime number p, the dimension of the Q-linear span of 1,ζp(3),ζp(5),…,ζp(s-1) is at least (1.119 · s)/(1+ 2) for any sufficiently large even integer s. This is new, it slightly refines a result of Sprang (2020).
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