On the L_p analytic semigroup associated with the linear thermoelastic plate equations in the half-space

抄録

The paper is concerned with linear thermoelastic plate equations in the half-space Rⁿ₊={x=(x₁,…,x_n)|x_n>0}:
u_tt+Δ²u+Δθ=0 and θ_t−Δθ−Δu_t=0 in Rⁿ₊×(0,∞),
subject to the boundary condition: u|_xn=0=D_nu|_xn=0=θ|_xn=0=0 and initial condition: (u,D_tu,θ)|_t=0=(u₀,v₀,θ₀)∈H_p=W²_p,D×L_p×L_p, where W²_p,D={u∈W²_p|u|_xn=0=D_nu|_xn=0=0}. We show that for any p∈(1,∞), the associated semigroup {T(t)}_t≥0 is analytic in the underlying space H_p. Moreover, a solution (u,θ) satisfies the estimates:
||∇^j(∇²u(·,t),u_t(·,t),θ(·,t))||_Lq(Rⁿ+)≤C_p,qt^{−\\fracj2−\\fracn2(\\frac1p−\\frac1q)}||(∇²u₀,v₀,θ₀)||_Lp(Rⁿ+) (t>0)
for j=0,1,2 provided that 1<p≤q≤∞ when j=0, 1 and that 1<p≤q<∞ when j=2, where ∇^j stands for space gradient of order j.