Minimal rank of primitively n-universal integral quadratic forms over local rings

Abstract

Let F be a local field and let R be its ring of integers. For a positive integer n, an integral quadratic form defined over R is called primitively n-universal if it primitively represents all quadratic forms of rank n. It was proved in arXiv:2005.11268 that the minimal rank of primitively 1-universal quadratic forms over the p-adic integer ring Zp is 2 if p is odd, and 3 otherwise. In this article, we completely determine the minimal rank of primitively n-universal quadratic forms over R for any positive integer n and any local ring R such that 2 is a unit or a prime.

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