The Cauchy problem for higher-order linear partial differential equation

Abstract

For the linear partial differential equation P(∂x,∂t)u=f(x,t), where x∈Rn,\;t∈R1, with P(∂x,∂t) is Πmi=1(∂∂t-aiP(∂x)) or Πmi=1(∂2∂t2-ai2P(∂x)), the authors give the analytic solution of the cauchy problem using the abstract operators etP(∂x) and (tP(∂x)1/2)P(∂x)1/2. By representing the operators with integrals, explicit solutions are obtained with an integral form of a given function.