A note on Erdős matrices and Marcus$\unicode{x2013}$Ree inequality (2503.09542v2)

Abstract: In 1959, Marcus and Ree proved that any bistochastic matrix $A$ satisfies $\Delta_n(A):= \max_{\sigma\in S_n}\sum_{i=1}^{n}A(i, \sigma(i))-\sum_{i, j=1}^n A(i, j)^2 \geq 0$. Erd\H{o}s asked to characterize the bistochastic matrices satisfying $\Delta_n(A)=0$. It was recently proved that there are only finitely many such matrices for any $n$. However, a complete list of such matrices was obtained in dimension $n=2, 3$ only recently, arXiv:2306.05518. In this paper, we characterize all $4\times 4$ bistochastic matrices satisfying $\Delta_4(A)=0$. Furthermore, we show that for $n\geq 3$, $\Delta_n(A)=\alpha$ has uncountably many solutions when $\alpha\notin {0, (n-1)/4}$. This answers a question raised in arXiv:2410.06612. We extend the Marcus$\unicode{x2013}$Ree inequality to infinite bistochastic arrays and bistochastic kernels. Our investigation into $4\times 4$ Erd\H{o}s matrices also raises several intriguing questions that are of independent interest. We propose several questions and conjectures and present numerical evidence for them.