The Einstein–Weyl equations in complex and quaternionic geometry

It is shown that Einstein-Weyl (EW) equations in 2+1 dimensions contain the dispersionless Kadomtsev-Petviashvili (dKP) equation as a special case: if an EW structure admits a constantweighted vector then it is locally given by h = dy 2 -4 dx dt -4u dt 2 , ν = -4u x dt, where u = u(x, y, t) satisfie

## Abstract A nodally exact convection–diffusion–reaction scheme developed in Cartesian grids is applied to solve the flow equations in irregular domains within the framework of immersed boundary (IB) method. The artificial momentum forcing term applied at certain points in the flow and inside the

A fully three-dimensional solution of the magneto-convection equations -the nonlinearly coupled momentum, induction and temperature equations -is presented in spherical geometry. Two very different methods for solving the momentum equation are presented, corresponding to the limits of slow and rapid