What R0 Deletes: Eigenvectors, Non-Normality, and the Social Content of the Basic Reproduction Number
Abstract
The basic reproduction number is the spectral radius of a matrix, R0=ρ(K). Taking that definition literally, we ask what Kρ(K) discards. A matrix carries three kinds of information: its dominant eigenvalue, its dominant eigenvectors, and its departure from normality. R0 keeps only the first; the other two are where the epidemic's social structure lives. The right eigenvector is the burden distribution, the left the source distribution; they coincide when the system is normal and diverge under heterogeneity. Across the 177 national contact matrices of Prem et al., the operator is never normal, and once age-specific susceptibility is included, its source and burden eigenvectors are misaligned by a median of 26, exceeding 40 in some countries: the groups that drive transmission are systematically not those that bear it. We prove that under reciprocal contact this misalignment obeys a Kantorovich bound set by the susceptibility contrast q/q alone, and zero when susceptibility is uniform, with the excess in real, non-reciprocal matrices contributed by contact asymmetry. Transient amplification, by contrast, stays small, so the operative social content is the misalignment, not transient blow-up. The omission also has teeth: because minimizing R0 protects those who spread infection, while minimizing deaths protects those who die from it, the two target different age groups; the former sometimes raises average infection fatality even as it lowers the scalar. When contact is strongly structured and susceptibility is heterogeneous, we suggest reporting R0 along with its eigenvectors rather than reporting it alone.
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