Special values of symmetric hypergeometric functions.

We discuss the p-adic formula (0.3) of P. Th. Young, in the framework of Dwork's theory of the hypergeometric equation. We show that it gives the value at 0 of the Frobenius automorphism of the unit root subcrystal of the hypergeometric crystal. The unit disk at 0 is in fact singular for the differential equation under consideration, so that it's not a priori clear that the Frobenius structure should extend to that disk. But the singularity is logarithmic, and it extends to a divisor with normal crossings relative to Z(p) in P-Zp(1). We show that whenever the unit root subcrystal of the hypergeometric system has generically rank 1, it actually extends as a logarithmic F-subcrystal to the unit disk at 0. So, in these optics, ''singular classes are not supersingular''. if, in particular, the holomorphic solution at 0 is bounded, the extended logarithmic F-crystal has no singualrity in the residue class of 0, so that it is an F-crystal in the usual sense and the Frobenius operation is holomorphic. We examine in detail its analytic form.