Title :
Separating the vertices of N-cubes by hyperplanes and its application to artificial neural networks
Author_Institution :
Sch. of Math., Georgia Inst. of Technol., Atlanta, GA, USA
fDate :
3/1/1993 12:00:00 AM
Abstract :
A new sufficient condition that a region be classifiable by a two-layer feedforward network using threshold activation functions is found. Briefly, it is either a convex polytope, or that minus the removal of convex polytope from its interior, or. . .recursively. The author refers to these sets as convex recursive deletion regions. The proof of implementability exploits the equivalence of this problem with that of characterizing two set partitions of the vertices of a hypercube which are separable by a hyperplane, for which a new result is obtained
Keywords :
computational geometry; feedforward neural nets; hypercube networks; convex polytope; hypercube; hyperplane; hyperplanes; sufficient condition; threshold activation functions; two layer feedforward neural net; vertices separation; Artificial neural networks; Atomic layer deposition; Feedforward systems; Hypercubes; Joining processes; Mathematics; Neurons; Sufficient conditions;
Journal_Title :
Neural Networks, IEEE Transactions on
