Towards Graham's rearrangement conjecture via rainbow paths
Abstract
We study an old question in combinatorial group theory which can be traced back to a conjecture of Graham from 1971. Given a group , and some subset S⊂eq , is it possible to permute S as s1, s2, …, sd so that the partial products Π1 ≤ i ≤ t si, t∈ [d] are all distinct? Most of the progress towards this problem has been in the case when is a cyclic group. We show that for any group and any S ⊂eq , there is a permutation of S where all but a vanishing proportion of the partial products are distinct, thereby establishing the first asymptotic version of Graham's conjecture under no restrictions on or S. To do so, we explore a natural connection between Graham's problem and the following very natural question attributed to Schrijver. Given a d-regular graph G properly edge-coloured with d colours, is it always possible to find a rainbow path with d-1 edges? We settle this question asymptotically by showing one can find a rainbow path of length d - o(d). While this has immediate applications to Graham's question for example when = F2k, our general result above requires a more involved result we obtain for the natural directed analogue of Schrijver's question.
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