Vector Partition Identities for 2D, 3D and nD Lattices
Abstract
We prove identities generating higher dimensional vector partitions. We derive theorems for integer lattice points in the 2D first quadrant, then generalize the approach to find 3D and n-space lattice point vector region extensions. We also state combinatorial identities for Visible Point Vectors in 2D up to 5D and nD first hyperquadrant and hyperpyramid lattices. 2D and 3D theorems for vector partitions with binary components are also derived.
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