Publications [#384409] of Danielle Y Wang

Papers Published

1. Berger, A; Wang, D, Modified Erdös–Ginzburg–Ziv constants for Z∕nZ and (Z∕nZ)2, Discrete Mathematics, vol. 342 no. 4 (April, 2019), pp. 1113-1116 [doi]
   (last updated on 2026/01/13)

   Abstract:
   For an abelian group G and an integer t>0, the modified Erdös–Ginzburg–Ziv constant st ^′(G) is the smallest integer ℓ such that any zero-sum sequence of length at least ℓ with elements in G contains a zero-sum subsequence (not necessarily consecutive) of length t. We compute st ^′(G) for G=Z∕nZ and for G=(Z∕nZ)² when t=n.