Enumeration of linear threshold functions from the lattice of hyperplane intersections

We present a method for enumerating linear threshold functions of n-dimensional binary inputs. Our starting point is the geometric lattice L-n of hyperplane intersections in the dual (weight) space. We show how the hyperoctahedral group On+1, the symmetry group of the (n+1)-dimensional hypercube, can be used to construct a symmetry-adapted poset of hyperplane intersections n, which is much more compact and tractable than L-n. A generalized Zeta function and its inverse, the generalized Mobius function, are defined on Lambda(n). Symmetry-adapted posets of hyperplane intersections for three-, four-, and five-dimensional inputs are constructed and the number of linear threshold functions is computed from the generalized Mobius function. Finally, we show how equivalence classes of linear threshold functions are enumerated by unfolding the symmetry-adapted poset of hyperplane intersections into a symmetry-adapted face poset, It is hoped that our construction will lead to ways of placing asymptotic bounds on the number of equivalence classes of linear threshold functions.