| 摘要 |
The present invention provides a solution using an integral equation method of a nonlinear Klein-Gordon equation. According to the present invention, the solution using an integral equation method of the nonlinear Klein-Gordon equation improves a solution of the Klein-Gordon equation by using a repetition method applying a hyperbolic fundamental solution so that the Klein-Gordon equation having characteristics of a nonlinear partial differential equation can be numerically analyzed by converting the Klein-Gordon equation having characteristics of a nonlinear partial differential equation into a nonlinear integration equation. According to the solution using an integral equation method of the nonlinear Klein-Gordon equation of the present invention, a Klein-Gordon equation, which is represented by [mathematical formula 1] and has the characteristics of the nonlinear partial differential equation, is converted into a nonlinear integration equation, represented by [mathematical formula 2], and is numerically analyzed by the repetition method applying the hyperbolic fundamental solution. |
