GLOBAL REPRESENTATIONS OF THE HEAT AND SCHRODINGER EQUATION WITH SINGULAR POTENTIAL

The n-dimensional Schrodinger equation with a singular potential V-lambda(x) = lambda parallel to x parallel to(-2) is studied. Its solution space is studied as a global representation of S<(L(2,R))over tilde> x O(n). A special subspace of solutions for which the action globalizes is constructed via nonstandard induction outside the semisimple category. The space of K-finite vectors is calculated, obtaining conditions for lambda so that this space is non-empty. The direct sum of solution spaces over such admissible values of lambda is studied as a representation of the 2n + 1-dimensional Heisenberg group.