I4DVAR ANA SENSITIVITY

Technical Description

The mathematical development presented here closely parallels that of Zhu and Gelaro (2008). The sensitivity of any functional, ${\displaystyle \,\!\jmath }$, of the analysis ${\displaystyle \,\!\psi _{a}}$ or forecast ${\displaystyle \,\!\psi _{f}}$ can be efficiently computed using the adjoint model which yields information about the gradients of ${\displaystyle \,\!\jmath (\psi _{a})}$ and ${\displaystyle \,\!\jmath (\psi _{f})}$. We can extent the concept of the adjoint sensitivity to compute the sensitivity of the IS4DVAR cost function, ${\displaystyle \,\!J}$,

${\displaystyle J(\psi )={\frac {1}{2}}\,\psi ^{T}B^{-1}\psi +{\frac {1}{2}}\,(G\psi -d)^{T}O^{-1}(G\psi -d)}$

and any other function ${\displaystyle \,\!\jmath }$ of the forecast ${\displaystyle \,\!\psi _{f}}$ to the observations, ${\displaystyle \,\!y}$. Here, ${\displaystyle \,\!\psi }$ is the ocean state vector, ${\displaystyle \,\!O}$ is the observation error and error of representativeness matrix, ${\displaystyle \,\!B}$ represents the background error covariance, ${\displaystyle \,\!d}$ is the innovation vector that represents the difference between the nonlinear background solution and the observations, ${\displaystyle \,\!d_{i}=y_{i}-H_{i}(\psi _{b}(t))}$, ${\displaystyle \,\!H_{i}}$ is an operator that samples the nonlinear model at the observation location, and ${\displaystyle \,\!G=H_{i}^{'}R(t_{0},t_{i})}$.

In the current IS4DVAR/LANCZOS data assimilation algorithm, the above cost function is identified using the Lanczos method (Golub and Van Loan, 1989), in which case:

${\displaystyle \psi _{a}=\psi _{b}-Q_{k}T_{k}^{-1}Q_{k}^{T}G^{T}O^{-1}d}$

where ${\displaystyle \,\!Q_{k}=(q_{i})}$ is the matrix of k orthogonal Lanczos vectors, and ${\displaystyle \,\!T_{k}}$ is a known tridiagonal matrix. Each of the k-iterations of IS4DVAR employed in finding the minimum of ${\displaystyle \,\!J}$ yields one column ${\displaystyle \,\!q_{i}}$ of ${\displaystyle \,\!Q_{k}}$.