Gronwall's Inequality in n Independent Variables
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The paper presents an extension of Gronwall's inequality to n independent variables. The inequality is established by solving a characteristic initial value problem by the Riemann method. Thus a Riemann function associated with a hyperbolic partial differential equation appears in the inequality. By using a representation of the Riemann function, the result is shown to coincide with an earlier result obtained by Walter using an entirely different approach.
Linear integral equations, Volterra integral equations, Initial-boundary value problems for higher-order hyperbolic equations, Solutions to PDEs in closed form
Linear integral equations, Volterra integral equations, Initial-boundary value problems for higher-order hyperbolic equations, Solutions to PDEs in closed form
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