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arxiv: math/0604245 · v2 · submitted 2006-04-11 · 🧮 math.DG · math.DS

k-symmetric AKS systems and flat immersions in spheres

classification 🧮 math.DG math.DS
keywords algebraicassociateddimensionalsolutionssymmetricsystemsaddressedalgebras
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We define a large class of integrable nonlinear PDE's, \emph{$k$-symmetric AKS systems}, whose solutions evolve on finite dimensional subalgebras of loop algebras, and linearize on an associated algebraic curve. We prove that periodicity of the associated algebraic data implies a type of quasiperiodicity for the solution, and show that the problem of isometrically immersing $n$-dimensional Euclidean space into a sphere of dimension $2n-1$ can be addressed via this scheme, producing infinitely many real analytic solutions.

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