Parameterized Stationary Solution for first order PDE
Abstract
We analyze the existence of a parameterized stationary solution z(λ,z0)=(x(λ,z0), p(λ,z0),\,u(λ,z0))∈ D⊂eqR2n+1,\,λ∈ B(0,a)⊂eqΠi=1m[-ai,ai], associated with a nonlinear first order PDE, H0(x,p(x),u(x))=constant\,\,(p(x)=∂x u(x)) relying on (a) first integral H∈C∞(B(z0,2)⊂eqR2n+1) and the corresponding Lie algebra of characteristic fields is of the finite type; (b) gradient system in a Lie algebra finitely generated over orbits (f.g.o;z0) starting from z0∈ D and their nonsingular algebraic representation.
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