We deal with the question of uniqueness, namely to decide when an unknown finite set of points in Z2 is uniquely determined by its X-rays corresponding to a given set S of lattice directions. In Hajdu (2005) [11] proved that for any fixed rectangle A in Z2 there exists a non trivial set S of four lattice directions, depending only on the size of A, such that any two subsets of A can be distinguished by means of their X-rays taken in the directions in S. The proof was given by explicitly constructing a suitable set S in any possible case. We improve this result by showing that in fact whole families of suitable sets of four directions can be found, for which we provide a complete characterization. This permits us to easily solve some related problems and the computational aspects.
Peri, C., Dulio, P., Brunetti, S., Discrete tomography determination of bounded lattice sets from four X-rays, <<DISCRETE APPLIED MATHEMATICS>>, 2013; 2013 (Ottobre): 2281-2292. [doi:10.1016/j.dam.2012.09.010] [http://hdl.handle.net/10807/48373]
Discrete tomography determination of bounded lattice sets from four X-rays
Peri, Carla;Dulio, Paolo;
2013
Abstract
We deal with the question of uniqueness, namely to decide when an unknown finite set of points in Z2 is uniquely determined by its X-rays corresponding to a given set S of lattice directions. In Hajdu (2005) [11] proved that for any fixed rectangle A in Z2 there exists a non trivial set S of four lattice directions, depending only on the size of A, such that any two subsets of A can be distinguished by means of their X-rays taken in the directions in S. The proof was given by explicitly constructing a suitable set S in any possible case. We improve this result by showing that in fact whole families of suitable sets of four directions can be found, for which we provide a complete characterization. This permits us to easily solve some related problems and the computational aspects.I documenti in IRIS sono protetti da copyright e tutti i diritti sono riservati, salvo diversa indicazione.