A finite element method for non-self-adjoint problems

In this paper, the existence, uniqueness and uniform convergence of the solution of the Carey nonconforming element with non-quasi-uniform partitions is proved for non-self-adjoint and inde"nite secondorder elliptic problems under a minimal regularity assumption. Furthermore, the optimal error estim

A least-squares mixed ®nite element method for the second-order non-self-adjoint two-point boundary value problems is formulated and analysed. Superconvergence estimates are developed in the maximum norm at Gaussian points and at Lobatto points.

## Abstract Finite element formulations based on the Galerkin and variational principles have been developed for the self‐adjoint and non‐self‐adjoint problems represented respectively by the flow and convective‐dispersion equations in the cylindrical polar system of co‐ordinates. The formulation b

## Abstract A non‐iterative, finite element‐based inverse method for estimating surface heat flux histories on thermally conducting bodies is developed. The technique, which accommodates both linear and non‐linear problems, and which sequentially minimizes the least squares error norm between corre

## Abstract We prove using the Faedo‐Galerkin method the existence of a generalized solution of an initial‐boundary value problem for the non‐linear evolution equationmagnified image0 ⩽ Q ⩽ 2, in a cylinder Q~T~ = Ω × (0, T), where 𝒯 u = yu~xx~ + u~yy~ is the Tricomi operator and l(u) a special dif