Let $H$ be a real or complex Hilbert space. In the case where $H$ is infinite-dimensional, let us define a half-dimensional subspace as a subspace $W \subset H$ such that both $W$ and $W^\perp$ have infinite dimension.
Fix one half-dimensional subspace $W_0$. The Grassmannian of $H$ is $$\mathrm{Gr}(H, W_0) = \{W \subset H ~|~ W \text{ is half-dimensional}, P_W - P_{W_0} \text{ is Hilbert-Schmidt}\}. $$ Here for $W \subset H$ a subspace, $P_W$ denotes the orthogonal projection onto $W$. $\mathrm{Gr}(H, W_0)$ can be given the structure of a Hilbert manifold in a natural way (see e.g. the book "Loop Groups" of Pressley and Segal).
The space $\mathrm{Gr}(H, W_0)$ has a tautological vector bundle $\tau$ over it, where the fiber is given by $\tau(L) = L$.
Question: Does $\tau$ have a nowhere vanishing section?
I believe that in the case that $H$ is finite-dimensional (say of dimension $2n$), the answer is no, as one can show that the Euler class of $\tau$ is non-zero. But how would one proceed in the infinite-dimensional case?
