Abstract
J.-P. Roudneff conjectured in 1991 that every arrangement of pseudohyperplanes in the real projective space
has at most
complete cells (i.e., cells bounded by each hyperplane). The conjecture is true for d = 2, 3 and for arrangements arising from Lawrence oriented matroids. Our main contribution is to show the validity of Roudneff’s conjecture for d = 4. Moreover, based on computational data we show that for
and
the maximum number of complete cells is only obtained (up to isomorphism) by cyclic arrangements.