Orthogonal Hypergeometric Groups with a Maximally Unipotent Monodromy

Abstract

Similar to the symplectic cases, there is a family of fourteen orthogonal hypergeometric groups with a maximally unipotent monodromy (cf. Table 1.1). We show that two of the fourteen orthogonal hypergeometric groups associated to the pairs of parameters (0, 0, 0, 0, 0), (16, 16, 56, 56, 12); and (0, 0, 0, 0, 0), (14, 14, 34, 34, 12) are arithmetic. We also give a table (cf. Table 2.1) which lists the quadratic forms Q preserved by these fourteen hypergeometric groups, and their two linearly independent Q- orthogonal isotropic vectors in Q5; it shows in particular that the orthogonal groups of these quadratic forms have Q- rank two.