Home – Home – Jornals – Numerical Analysis and Applications 2019 number 3

The presence of the nonlocal term in the nonlocal problems destroys the sparsity of the Jacobian matrices when solving the problem numerically using finite element method and Newton-Raphson method. As a consequence, computations consume more time and space in contrast to local problems. To overcome this difficulty, this paper is devoted to the analysis of a linearized Theta-Galerkin finite element method for the time-dependent nonlocal problem with nonlinearity of Kirchhoff type. Hereby, we focus on time discretization based on θ -time stepping scheme with θ ∈ [1/2,1). Some a error estimates are derived for the standard Crank-Nicolson ( θ =1/2), the shifted Crank-Nicolson ( θ = 1/2 + δ, δ is the time-step) and the general case ( θ ≠ 1/2 + kδ, k = 0,1). Finally, numerical simulations that validate the theoretical findings are exhibited.