Abstract
We consider the Toda lattice associated to the twisted affine Lie algebra 𝐶𝐶2(1). It is well known that this system is a two-dimensional algebraic completely integrable system. By using algebraic geometric methods, we give a linearisation of the system by determining the linearizing variables. This allows us to explain a morphism between this system and the Mumford system.Finally, a Lax representation in terms of 2 x 2 matrices is constructed for this system.
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