In this note we study the problem of sampling and reconstructing signals which are assumed to lie on or close to one ofseveral subspaces of a Hilbert space. Importantly, we here consider a very general setting in which we allow infinitely manysubspaces in infinite dimensional Hilbert spaces. This general approach allows us to unify many results derived recently in areassuch as compressed sensing, affine rank minimisation and analog compressed sensing.Our main contribution is to show that a conceptually simple iterative projection algorithms is able to recover signals froma union of subspaces whenever the sampling operator satisfies a bi-Lipschitz embedding condition. Importantly, this result holdsfor all Hilbert spaces and unions of subspaces, as long as the sampling procedure satisfies the condition for the set of subspacesconsidered. In addition to recent results for finite unions of finite dimensional subspaces and infinite unions of subspaces in finitedimensional spaces, we also show that this bi-Lipschitz property can hold in an analog compressed sensing setting in which wehave an infinite union of infinite dimensional subspaces living in infinite dimensional space
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