Effect of different additional Lm regularity on semi-linear damped σ-evolution models
Abstract
The motivation of the present study is to discuss the global (in time) existence of small data solutions to the following semi-linear structurally damped σ-evolution models: equation* ∂ttu+(-)σu+(-)σ/2∂tu=|u| p, \ σ≥ 1, \ \ p>1, equation* where the Cauchy data (u(0,x), ∂tu(0,x)) will be chosen from energy space on the base of Lq with different additional Lm regularity, namely equation* u(0,x)∈ Hσ,q(Rn) Lm1(Rn) , \ \ ∂tu(0,x)∈ Lq(Rn) Lm2(Rn), \ \ q∈(1,∞),\ \ m1, m2∈ [1,q). equation* Our new results will show that the critical exponent which guarantees the global (in time) existence is really affected by these different additional regularities and will take two different values under some restrictions on m1, m2, q, σ and the space dimension n≥1. Moreover, in each case, we have no loss of decay estimates of the unique solution with respect to the corresponding linear models.
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