Abstract
Let k be a positive integer and let F be a finite unramified extension of Q2 with ring of integers OF. An integral (resp. classic) quadratic form over OF is called k-universal (resp. classic k-universal) if it represents all integral (resp. classic) quadratic forms of dimension k. In this paper, we provide a complete classification of k-universal and classic k-universal quadratic forms over OF. The results are stated in terms of the fundamental invariants associated to Jordan splittings of quadratic lattices.
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