A Determinantal Approach to a Sharp 1-∞-2 Norm Inequality
Abstract
We give a short linear--algebraic proof of the inequality \[ \|x\|1\,\|x\|∞ 1+p2\,\|x\|22, \] valid for every \(x∈Rp\). This inequality relates three fundamental norms on finite-dimensional spaces and has applications in optimization and numerical analysis. Our proof exploits the determinantal structure of a parametrized family of quadratic forms, and we show the constant (1+p)/2 is optimal.
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