Conant's Metric Spectra Problem

Abstract

In this paper, we try to minimize the scope of possible unique metric spectra up to equivalence. While it is well known that every spectra S⊂eq R+ is equivalent to a spectra T⊂eq N, it has remained open if T could also maintain a desirable combinatorial form. Conant questioned if T= \t1,...,tn \< could be taken such that 2i-1 ≤ ti ≤ 2n -1. In this paper, we come to two partial answers. The first is that the largest element tn can be chosen such that tn≤ 2n . Approximating a full solution, we also observe T with the combinatorial form 2i ≤ ti ≤ 2n+1. Our methods are rather unique in the field as we utilize linear optimization and polygonal geometry to achieve our results. Our work aims to approach a full characterization of metric spectra, and simplify future computational endeavors in the field.

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