Final answer:
To solve the initial-value problem using the independent variable (coordinate) transformation method, we can use the transformation ξ = x - 2t to simplify the equation and find the solution for u(x, t).
Step-by-step explanation:
To solve the initial-value problem using the independent variable (coordinate) transformation method, we have the following equation: uₜ = uₓₓ - 2uₓ, with -∞ < x < ∞.
We can use the transformation ξ = x - 2t to simplify the equation. By applying the chain rule, we can rewrite the equation in terms of the new variable ξ and the new dependent variable v(ξ). After solving for v(ξ), we can use the inverse transformation to find u(x, t).
Let's go through these steps in detail:
- Apply the chain rule to express uₓ in terms of v(ξ).
- Substitute the expressions for uₓₓ and uₓ into the given equation.
- Solve the resulting ordinary differential equation for v(ξ).
- Apply the inverse transformation to find u(x, t) from v(ξ).