On the Spectral Problem for the Periodic Camassa–Holm Equation

A key basis for seeking periodic solutions of the Camassa Holm equation is to understand the associated spectral problem y$= 1 4 y+\*my. The periodic spectrum can be recovered from the norming constants and the elements of the auxiliary spectrum. The potential can then be reconstructed from the peri

We study a diffraction of a plane wave incident to a periodic surface separating two dielectric materials with different real dielectric coefficients. Existence and uniqueness of solution to a periodic knitting problem for the Helmholtz equation is proved. Moreover we prove that the solution can be

We employ elliptic regularization and monotone method. We consider X⊂R n (n 1) an open bounded set that has regular boundary C and Q = X×(0,T), T>0, a cylinder of R n+1 with lateral boundary R = C×(0,T).