Adjoint equation

An adjoint equation is a linear differential equation, usually derived from its primal equation using integration by parts. Gradient values with respect to a particular quantity of interest can be efficiently calculated by solving the adjoint equation. Methods based on solution of adjoint equations are used in wing shape optimization, fluid flow control and uncertainty quantification. For example ${\displaystyle dX_{t}=a(X_{t})dt+b(X_{t})dW}$ this is an Itō stochastic differential equation. Now by using Euler scheme, we integrate the parts of this equation and get another equation, ${\displaystyle X_{n+1}=X_{n}+a\Delta t+\zeta b{\sqrt {\Delta t}}}$, here ${\displaystyle \zeta }$ is a random variable, later one is an adjoint equation.

See also

• Adjoint state method
• Costate equations

References

• Jameson, Antony (1988). "Aerodynamic Design via Control Theory". Journal of Scientific Computing. 3 (3).