Behavior of Totally Positive Differential Systems Near a Periodic Solution

Abstract: A time-varying nonlinear dynamical system is called a totally positive differential system (TPDS) if its Jacobian admits a special sign pattern: it is tri-diagonal with positive entries on the super-and sub-diagonals. If the vector field of a TPDS is T -periodic then every bounded trajectory converges to a T -periodic solution. In particular, when the vector field is time-invariant every bounded trajectory of a TPDS converges to an equlbrium. Here, we use the spectral theory of oscillatory matrices to analyze … Show more