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Results from the structural equation modeling and multi-groups analysis
(UNIV GUADALAJARA, 2012)
Results from the structural equation modeling and multi-groups analysis
(UNIV GUADALAJARA, 2012)
PULLBACK ATTRACTORS FOR A SINGULARLY NONAUTONOMOUS PLATE EQUATION
(Texas State Univ, 2011-06-20)
We consider the family of singularly nonautonomous plate equation with structural dampingu(tt) + a(t, x)u(t) - Delta u(t) + (-Delta)(2)(u) + lambda u = f(u),in a bounded domain Omega subset of R(n), with Navier boundary ...
LOWER SEMICONTINUITY of PULLBACK ATTRACTORS FOR A SINGULARLY NONAUTONOMOUS PLATE EQUATION
(Texas State Univ, 2012-10-28)
We show the lower semicontinuity of the family of pullback attractors for the singularly nonautonomous plate equation with structural dampingu(tt) + a(t, x)u(t) + (-Delta)u(t) + (-Delta)(2)u + lambda u = f(u),in the energy ...
LOWER SEMICONTINUITY of PULLBACK ATTRACTORS FOR A SINGULARLY NONAUTONOMOUS PLATE EQUATION
(Texas State Univ, 2012-10-28)
We show the lower semicontinuity of the family of pullback attractors for the singularly nonautonomous plate equation with structural dampingu(tt) + a(t, x)u(t) + (-Delta)u(t) + (-Delta)(2)u + lambda u = f(u),in the energy ...
Pullback attractors for a singularly nonautonomous plate equation
(2011-07-22)
We consider the family of singularly nonautonomous plate equation with structural damping utt + a(t, x)ut - Δut + (-Δ)2u + λu = f(u), in a bounded domain Ω ⊂ Rn, with Navier boundary conditions. When the nonlinearity f is ...
Lower semicontinuity of pullback attractors for a singularly nonautonomous plate equation
(2012-10-28)
We show the lower semicontinuity of the family of pullback attractors for the singularly nonautonomous plate equation with structural damping u tt + a(t, x)u t + (-Δ)u t + (-Δ) 2u + λu = f (u), in the energy space H 2 0(Ω) ...
PULLBACK ATTRACTORS FOR A SINGULARLY NONAUTONOMOUS PLATE EQUATION
(Texas State Univ, 2011-06-20)
We consider the family of singularly nonautonomous plate equation with structural dampingu(tt) + a(t, x)u(t) - Delta u(t) + (-Delta)(2)(u) + lambda u = f(u),in a bounded domain Omega subset of R(n), with Navier boundary ...
WDVV equations, Darboux-egoroff metric and the dressing method
(2002-01-01)
Dressing technique is used to construct commuting Lax operators which provide an integrable (canonical) structure behind Witten–Dijkgraaf–Verlinde–Verlinde equations. The commuting flows are related to the isomonodromic ...