A rational spectral method for the KdV equation on the half line

Some Legendre spectral element/Laguerre spectral coupled methods are proposed to numerically solve second-and fourth-order equations on the half line. The proposed methods are based on splitting the infinite domain into two parts, then using the Legendre spectral element method in the finite subdoma

Boundary value problems for second-order differential equations on the half-line having an arbitrary number of turning points are investigated. We establish properties of the spectra, prove an expansion theorem, and study inverse problems of recovering the boundary value problem from given spectral

We discuss a nonlinear Abel equation on the half-line (-∞, c), c > 0. The basic results provide criteria for the existence of nontrivial everywhere positive solutions. They are expressed in terms of the generalized Osgood condition.

In this paper we develop a direct quadrature method for solving Volterra-Fredholm integral equations on an unbounded spatial domain. These problems, when related to some important physical and biological phenomena, are characterized by kernels that present variable peaks along space. The method we p

We have obtained a new kind of x-t interchanged modified KdV system via a different type of Miura transformation obtained by using the zero curvature formulation in conjunction with Birkhoff factorization and loop algebra decomposition. The Lax pair for this new system is also deduced. The usual x-c