Main Article Content
In this work, we study the following wave equation with a constant weak delay
utt(x,t)- Δu(x,t) - Δutt(x,t) + μ1(t)μt (x,t) + u2(t)μt (x,t - τ)=0
in a bounded domain and under some assumptions. First, we prove the global existence by using Faedo-Galerkin procedure and uniqueness. Secondly, the multiplier method is used to establish the stability of solution.
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