Ubiquity of counterexamples to the Smith-Ward problem
Abstract
The Smith-Ward problem about matrix ranges, posed in the 1980s, was recently resolved in the negative by Marcel Scherer (arXiv:2607.04274) by obtaining a three-dimensional operator system S ⊂eq M4(Cr*(F2)) without the lifting property. However, this operator system must be exact. In this paper we show that, for every finitely generated C*-algebra A without the local lifting property (LLP), there exists a three-dimensional operator system S ⊂eq Mn+2(A) without the lifting property (LP), thus generalizing Scherer's result and eliminating the reliance on Ext(A) not being a group. In particular, we prove that whenever T is a finite-dimensional operator system without the LP, then Mn+2(Cu*(T)) contains a 3-dimensional operator system without the LP for some n ≤ 2((T)-1). In this way, we yield a plethora of counterexamples to the Smith-Ward problem. In particular, unlike Scherer's example, these three-dimensional operator systems fail both the LP and exactness. We also prove the existence of a three-dimensional operator system that detects nuclearity for unital C*-algebras, strengthening previous work of Kavruk (J. Funct. Anal., volume 269, 2015).
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