The 33rd Kyushu Symposium on Partial Differential Equations

The main aim of the present work is to develop a unified approach for investigating problems related to the uniform G σ Gevrey regularity of solutions to PDE on the whole space R n

One can associate the initial idea of this theory to the earlier results on the solution of certain boundary value problems for linear partial dif- ferential equations such as

The field equation is derived as the Euler‐Lagrange equation for a Lagrangian given in the spacetime which is a solution of the Ein‐ stein equation for non‐Hermitian

now called the Hamilton map, and proved that if the Cauchy problem is $C^{\infty}$ well-posed for any lower order term then the characteristics are at most double.. and at

At the beginning, we shall apply the Malliavin calculus to the solution process $X^{\epsilon}$.. For each

Isobe: Relative Morse indices, compactness and Morse-Floer homology for. superquadratic Dirac

Partitioned Runge-Kutta methods for partial differential equations.. TOSHIYUKI

Following [16], in order to study the singularities of the geometric solution we identify geo- metric solutions with one-parameter Legendrian