Abstract:
This paper establishes the
uniform well-posedness of the Cauchy problem for generalized
telegraph equations
with variable coefficients,
of which the classical telegraph equation is a particular case.
The well-posedness of a mathematical problem is one of the main
requirements for its numerical solution.
For the classical telegraph equation, Riemann's method
enables us to solve the Cauchy problem in the class of twice
continuously differentiable functions explicitly. The question of
stability of the solution in dependence on the initial data, which
requires us to work in suitable metric spaces,
usually is not discussed;
however, it appears to be one of the most important questions once
the existence and uniqueness of the solution are known. In this
note
we use
the theory of continuous semigroups of linear operators to
establish the uniform well-posedness of the Cauchy problem in the
spaces of integrable functions with exponential weight for several
classes of differential equations with variable coefficients. We
obtain the exact solution to the Cauchy problem and indicate
conditions on the coefficients ensuring that the problem is
uniformly well-posed in certain functional spaces. These results
imply the uniform well-posedness of the Cauchy problem for the
classical telegraph equation with constant coefficients.
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