On the Study of the Klein-Gordon Equation in the Dunkl Setting

Abstract

In Dunkl theory on Rn which generalizes classical Fourier analysis, we study the solution of the Klein-Gordon-equation defined by: eqnarray ∂t2u-ku=-m2u \ , \ \ \ u (x,0)=g(x) \ , \ \ \ ∂tu(x,0)=f(x) eqnarray with \ m > 0 \ and \ ∂t2u \ is the second derivative of the solution u with respect to t and ku is the Dunkl Laplacian with respect to x where f and g the two functions in S(Rn) which surround the initial conditions. We obtain an integral representation for its solution which we gives some properties. As a specific result, we studied the associated energies to the Dunkl-Klein-Gordon equation.