Conditioning Gaussian measure on Hilbert space

Abstract: For a Gaussian measure on a separable Hilbert space with covariance operator $C$, we show that the family of conditional measures associated with conditioning on a closed subspace $S^{\perp}$ are Gaussian with covariance operator the short $\mathcal{S}(C)$ of the operator $C$ to $S$. We provide two proofs. The first uses the theory of Gaussian Hilbert spaces and a characterization of the shorted operator by Andersen and Trapp. The second uses recent developments by Corach, Maestripieri and Stojanoff on the relationship between the shorted operator and $C$-symmetric oblique projections onto $S^{\perp}$. To obtain the assertion when such projections do not exist, we develop an approximation result for the shorted operator by showing, for any positive operator $A$, how to construct a sequence of approximating operators $A^{n}$ which possess $A^{n}$-symmetric oblique projections onto $S^{\perp}$ such that the sequence of shorted operators $\mathcal{S}(A^{n})$ converges to $\mathcal{S}(A)$ in the weak operator topology. This result combined with the martingale convergence of random variables associated with the corresponding approximations $C^{n}$ establishes the main assertion in general. Moreover, it in turn strengthens the approximation theorem for shorted operator when the operator is trace class; then the sequence of shorted operators $\mathcal{S}(A^{n})$ converges to $\mathcal{S}(A)$ in trace norm.