English

Positive solutions for large random linear systems

Probability 2019-04-10 v1

Abstract

Consider a large linear system where AnA_n is a n×nn\times n matrix with independent real standard Gaussian entries, 1n\boldsymbol{1}_n is a n×1n\times 1 vector of ones and with unknown the n×1n\times 1 vector xn\boldsymbol{x}_n satisfyingxn=1n+1αnnAnxn.\boldsymbol{x}_n = \boldsymbol{1}_n +\frac 1{\alpha_n\sqrt{n}} A_n \boldsymbol{x}_n\, .We investigate the (componentwise) positivity of the solution xn\boldsymbol{x}_n depending on the scaling factor αn\alpha_n as the dimension nn goes to \infty. We prove that there is a sharp phase transition at the threshold αn=2logn\alpha^*_n =\sqrt{2\log n}: below the threshold (αn2logn\alpha_n\ll \sqrt{2\log n}), xn\boldsymbol{x}_n has negative components with probability tending to 1 while above (αn2logn\alpha_n\gg \sqrt{2\log n}), all the vector's components are eventually positive with probability tending to 1. At the critical scaling αn\alpha^*_n, we provide a heuristics to evaluate the probability that xn\boldsymbol{x}_n is positive.Such linear systems arise as solutions at equilibrium of large Lotka-Volterra systems of differential equations, widely used to describe large biological communities with interactions such as foodwebs for instance. In the domaine of positivity of the solution xn\boldsymbol{x}_n, that is when αn2logn\alpha_n\gg \sqrt{2\log n}, we establish that the Lotka-Volterra system of differential equations whose solution at equilibrium is precisely xn\boldsymbol{x}_n is stable in the sense that its jacobian J(xn)=diag(xn)(In+Anαnn){\mathcal J}(\boldsymbol{x}_n) = \mathrm{diag}(\boldsymbol{x}_n)\left(-I_n + \frac {A_n}{\alpha_n\sqrt{n}}\right) has all its eigenvalues with negative real part with probability tending to one. Our results shed a new light and complement the understanding of feasibility and stability issues for large biological communities with interaction.

Cite

@article{arxiv.1904.04559,
  title  = {Positive solutions for large random linear systems},
  author = {Pierre Bizeul and Jamal Najim},
  journal= {arXiv preprint arXiv:1904.04559},
  year   = {2019}
}
R2 v1 2026-06-23T08:33:59.173Z