求解非线性伪抛物方程的重心Lagrange插值配点法

提出了重心Lagrange插值配点法求解一类非线性伪抛物方程。首先，介绍了重心Lagrange插值并给出了微分矩阵表达式。其次，构造了求解非线性伪抛物方程的直接线性化迭代格式、部分线性化迭代格式、Newton线性化迭代格式。再次，未知函数和初边值条件利用重心Lagrange插值函数来近似，利用配点法得到离散方程，获得了方程的矩阵表达式。最后，数值算例表明，重心Lagrange插值配点法具有高精度和高效率的优点。

Barycentric Lagrange interpolation collocation method for solving nonlinear pseudo-parabolic equations

Barycentric Lagrange interpolation collocation method for solving a class of nonlinear pseudo-parabolic equations is proposed. Firstly, barycentric Lagrange interpolation is introduced and the expression of differential matrix is given. Secondly, direct linearized iterative scheme, partial linearized iterative scheme, Newton linearized iterative scheme for solving nonlinear pseudo-parabolic equation are constructed. Thirdly, unknown functions and initial-boundary value conditions are approximated by barycentric Lagrange interpolation function, discrete equation is obtained by using collocation method, then the matrix equation is obtained. Finally, numerical examples show that the barycentric Lagrange interpolation collocation method has the advantages of high precision and high efficiency.