We introduce a general computational fixed-point method to prove existence of periodic solutions of differential delay equations with multiple time lags. The idea of such a method is to compute numerical approximations of periodic solutions using Newton's method applied on a finite dimensional projection, to derive a set of analytic estimates to bound the truncation error term and finally to use this explicit information to verify computationally the hypotheses of a contraction mapping theorem in a given Banach space. The fixed point so obtained gives us the desired periodic solution. We provide two applications. The first one is a proof of coexistence of three periodic solutions for a given delay equation with two time lags, and the second...
AbstractThis paper is concerned with periodic solutions to one-parameter families of planar differen...
This paper presents a collocation method with an iterative linear system solver to compute periodic ...
We prove the existence of an asymptotically stable periodic solution of a system of delay differenti...
AbstractWe introduce a general computational fixed-point method to prove existence of periodic solut...
We introduce a general computational fixed-point method to prove existence of periodic solutions of ...
We present an application of a recently developed algorithm for rigorous integration forward in time...
In this paper we develop a general computer-assisted proof method for periodic solutions to delay di...
In this paper, sufficient criteria are established for the existence of periodic solutions of some f...
The existence of multiple periodic solutions of the following differential delay equation ()=−((−)) ...
summary:The goal of the present paper is to establish some new results on the existence, uniqueness ...
We study nonlinear autonomous real-valued differential delay equations with several fixed delays x'(...
Several aspects of global dynamics and the existence of periodic solutions are studied for the scala...
By the critical point theory, infinitely many 4σ-periodic solutions are obtained for the system of d...
Based on the fixed-point index theory for a Banach space, positive periodic solutions are found for ...
By the critical point theory, infinitely many 4 sigma-periodic solutions are obtained for the system...
AbstractThis paper is concerned with periodic solutions to one-parameter families of planar differen...
This paper presents a collocation method with an iterative linear system solver to compute periodic ...
We prove the existence of an asymptotically stable periodic solution of a system of delay differenti...
AbstractWe introduce a general computational fixed-point method to prove existence of periodic solut...
We introduce a general computational fixed-point method to prove existence of periodic solutions of ...
We present an application of a recently developed algorithm for rigorous integration forward in time...
In this paper we develop a general computer-assisted proof method for periodic solutions to delay di...
In this paper, sufficient criteria are established for the existence of periodic solutions of some f...
The existence of multiple periodic solutions of the following differential delay equation ()=−((−)) ...
summary:The goal of the present paper is to establish some new results on the existence, uniqueness ...
We study nonlinear autonomous real-valued differential delay equations with several fixed delays x'(...
Several aspects of global dynamics and the existence of periodic solutions are studied for the scala...
By the critical point theory, infinitely many 4σ-periodic solutions are obtained for the system of d...
Based on the fixed-point index theory for a Banach space, positive periodic solutions are found for ...
By the critical point theory, infinitely many 4 sigma-periodic solutions are obtained for the system...
AbstractThis paper is concerned with periodic solutions to one-parameter families of planar differen...
This paper presents a collocation method with an iterative linear system solver to compute periodic ...
We prove the existence of an asymptotically stable periodic solution of a system of delay differenti...