Adjoint systems are widely used to inform control, optimization, and design in systems described by ordinary differential equations or differential-algebraic equations. In this paper, we explore the geometric properties and develop methods for such adjoint systems. In particular, we utilize symplectic and presymplectic geometry to investigate the properties of adjoint systems associated with ordinary differential equations and differential-algebraic equations, respectively. We show that the adjoint variational quadratic conservation laws, which are key to adjoint sensitivity analysis, arise from (pre)symplecticity of such adjoint systems. We discuss various additional geometric properties of adjoint systems, such as symmetries and variation...
In this paper, we propose a modified formal Lagrangian formulation by introducing dummy dependent va...
This work extends the Ibragimov's conservation theorem for partial differential equations [J. Math. ...
The adjoint method provides a computationally efficient means of calculating the gradient for applic...
The study of the sensitivity of the solution of a system of differential equations with respect to c...
The study of the sensitivity of the solution of a system of differential equations with respect to c...
Infinitesimal symmetries of a partial differential equation (PDE) can be defined as the solutions of...
Based on developments in the theory of variational and Hamiltonian control systems by Crouch and van...
This work extends an earlier result which characterized Hamiltonian systems described by second orde...
Based on recent developments in the theory of variational and Hamiltonian control systems, this pape...
In the context of adjoint-based optimization, nonlinear conservation laws pose significant problems ...
Motivated from linear-quadratic optimal control problems for differential-algebraic equations (DAEs)...
This paper presents a rigorous framework for the continuation of solutions to nonlinear constraints ...
This paper outlines results recently obtained in the problem of determining when an input-output map...
In this paper, we propose a modified formal Lagrangian formulation by introducing dummy dependent va...
This work extends the Ibragimov's conservation theorem for partial differential equations [J. Math. ...
The adjoint method provides a computationally efficient means of calculating the gradient for applic...
The study of the sensitivity of the solution of a system of differential equations with respect to c...
The study of the sensitivity of the solution of a system of differential equations with respect to c...
Infinitesimal symmetries of a partial differential equation (PDE) can be defined as the solutions of...
Based on developments in the theory of variational and Hamiltonian control systems by Crouch and van...
This work extends an earlier result which characterized Hamiltonian systems described by second orde...
Based on recent developments in the theory of variational and Hamiltonian control systems, this pape...
In the context of adjoint-based optimization, nonlinear conservation laws pose significant problems ...
Motivated from linear-quadratic optimal control problems for differential-algebraic equations (DAEs)...
This paper presents a rigorous framework for the continuation of solutions to nonlinear constraints ...
This paper outlines results recently obtained in the problem of determining when an input-output map...
In this paper, we propose a modified formal Lagrangian formulation by introducing dummy dependent va...
This work extends the Ibragimov's conservation theorem for partial differential equations [J. Math. ...
The adjoint method provides a computationally efficient means of calculating the gradient for applic...