On the Connection Between Gramian-based and Interpolation-based Model Order Reduction

Gramian-based model order reduction methods, like balanced truncation, and interpolation-based methods, such as H2-optimal reduction, are two important types of model reduction algorithms. Although both are known for their accuracy, they are often seen as two different approaches. This paper shows that these two methods are closely related, with Gramian-based reduction being roughly an interpolation problem, and vice versa. For Galerkin projection, we find that when the reduced model has enough order to capture the significant eigenvalues of the controllability or observability Gramian, preserving these eigenvalues becomes an interpolation problem. In this case, both Gramian-based and interpolation-based model reduction methods produce the same transfer function but with different state-space realizations. When the reduced model's order is too small to capture all significant eigenvalues, the methods begin to differ, and the difference depends on the eigenvalues that were left out. In the case of Petrov-Galerkin projection, if the reduced model's order is large enough to capture the significant Hankel singular values, balanced truncation becomes the same as H2-optimal model order reduction. Again, both methods give the same transfer function but with different state-space realizations. When the order is smaller, the methods diverge, with the difference depending on the truncated Hankel singular values. Numerical examples are provided to support these findings, showing that Gramian-based and interpolation-based model reduction methods are more connected than previously thought and can be viewed as approximations of each other.