91Ó°ÊÓ

Let \(v = y'\), then substitute \(y'\) into the given equation, we obtain: \(v' = e^{2y}\). The second-order differential equation \(y'' = e^{2y}\) can be rewritten as a system of first-order differential equations: $$ \begin{cases} y' = v \\ v' = e^{2y} \\ \end{cases} $$

Now represent the above system of equations as a matrix differential equation: $$ \begin{bmatrix} y' \\ v' \end{bmatrix} = \begin{bmatrix} 0 & 1 \\ e^{2y} & 0 \end{bmatrix} \begin{bmatrix} y \\ v \end{bmatrix}. $$

At this point, the differential equation becomes difficult to solve analytically, but can be solved using numerical methods. One common method for solving nonlinear differential equations is the Runge-Kutta method or other numerical integration schemes, which provide approximations for the solutions. However, we can proceed to the next step if we accept an approximate solution for the matrix differential equation.

Now we need to apply the initial conditions given in the problem: $$ y(0) = 0 \\ y'(0) = 1 \\ $$ We plug these initial conditions into the numerical methods for solving the first-order matrix differential equation. This will give us an approximate solution \(y(x)\) and \(v(x)\) computed over a set of points. In summary, solving this problem involves rewriting the given second-order differential equation as a first-order matrix differential equation, applying numerical methods to solve the resulting matrix equation, and incorporating the initial conditions to obtain an approximate solution. Due to the nonlinear nature of this problem, an analytical solution is not possible, and numerical techniques are necessary.