We provide new conditions under which the alternating projection sequence converges in norm for the convex feasibility problem where a linear subspace with finite codimension N>= 2 and a lattice cone in a Hilbert space are considered. The first result holds for any Hilbert lattice, assuming that the orthogonal complement of the linear subspace admits a basis made by disjoint vectors with respect to the lattice structure. The second result is specific for l^2(N) and is proved when only one vector of the basis is not in the cone but the sign of its components is definitively constant and its support has finite intersection with the supports of the remaining vectors.
Battistoni, F., Miglierina, E., A note on the moment problem for codimension greater than 1, <<PROCEEDINGS OF THE AMERICAN MATHEMATICAL SOCIETY>>, 2025; (N/A): N/A-N/A. [doi:https://doi.org/10.1090/proc/17373] [https://hdl.handle.net/10807/324410]
A note on the moment problem for codimension greater than 1
Battistoni, Francesco
Co-primo
;Miglierina, EnricoCo-primo
2025
Abstract
We provide new conditions under which the alternating projection sequence converges in norm for the convex feasibility problem where a linear subspace with finite codimension N>= 2 and a lattice cone in a Hilbert space are considered. The first result holds for any Hilbert lattice, assuming that the orthogonal complement of the linear subspace admits a basis made by disjoint vectors with respect to the lattice structure. The second result is specific for l^2(N) and is proved when only one vector of the basis is not in the cone but the sign of its components is definitively constant and its support has finite intersection with the supports of the remaining vectors.
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