The Bernstein Problem in Dimension 5

The solution of the Bernstein problem in the regular and exceptional cases, in all dimensions n, was made by Yu. Lyubich. A. Grishkov proved that there are no Ž . nonregular nonexceptional nuclear Bernstein algebras of type 4, 2 with stochastic Ž . realization and therefore the Bernstein problem of

A partial solution to the affine Bernstein problem is given. The elliptic paraboloid is characterized as a locally strongly convex, affine complete, affine-maximal surface in A 3, satisfying a certain growth condition, about its afline Gauss-Kronecker curvature.

The kernel of a certain triangular derivation of the polynomial ring k x 1 x 2 x 3 x 4 x 5 is shown to be non-finitely generated over k (a field of characteristic zero), thus giving a new counterexample to Hilbert's Fourteenth Problem, in the lowest dimension to date.

A real space RG treatment of the directed polymer problem is presented. In the zero temperature regime (strong coupling) no upper critical dimension is found. The method that is based on the exact results in 1 + 1 dimensions yields in 2 + 1 and 3 + 1 dimensions excellent agreement with published num

This paper describes explicitly all non-regular non-degenerate simplicial stochas-Ž tic Bernstein algebras. Consequently, the Bernstein problem S. N. Bernstein, Ž . . Science Ukraine 1 1992 , 14᎐19 in the non-degenerate case is settled, since the regular and exceptional cases have already been exami