Comments on ‘on absolute stability and the aizerman conjecture’

Fix n. Let r(n) denote the largest number r for which there is an r\_n (1, &1)matrix H satisfying the matrix equation HH =nI r . The Hadamard conjecture states that for n divisible by 4 we have r(n)=n. Let =>0. In this paper, we show that the Extended Riemann Hypothesis and recent results on the asy

The present comments address the fundamental dynamic behavior of the ONERA aerodynamic model and consider the interacting dynamics of that flow model with a simple structural model , the typical section . A classical linear flutter analysis clarifies and deepens our understanding of the change in th

## Abstract C. Thomassen proposed a conjecture: Let __G__ be a __k__‐connected graph with the stability number α ≥ __k__, then __G__ has a cycle __C__ containing __k__ independent vertices and all their neighbors. In this paper, we will obtain the following result: Let __G__ be a __k__‐connected gr