This paper complements the study of the wave equation with discontinuous coefficients initiated in [DGL22] in the case of time-dependent coefficients.Here we assume that the equation coefficients are depending on space only and we formulate Levi conditions on the lower order terms to guarantee the existence of a very weak solution as defined in [GR14]. As a toy model we study the wave equation in conservative form with discontinuous velocity and we provide a qualitative analysis of the corresponding very weak solution via numerical methods.(a + b 1 ) 2 ≺ a.Note that a is bounded by √ a as a direct consequence of Glaeser's inequality: If a ∈ C 2 (R), a(x) ≥ 0 for all x ∈ R and a L ∞ ≤ M 1 , then |a (x)| 2 ≤ 2M 1 a(x),
This paper is devoted to the study of the inhomogeneous wave equation with singular (less than continuous) time dependent coefficients. Particular attention is given to the role of the lower order terms and suitable Levi conditions are formulated in order to obtain a very weak solution as introduced in [GR14]. Very weak solutions for this kind of equations are also investigated from a numerical point of view in two toy models: the wave equation with a Heaviside function and a delta distribution, respectively, as coefficient in its principal part.
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