Hypergraphs and Lotka-Volterra systems with linear Darboux polynomials
Abstract
We associate parametric classes of n-component Lotka-Volterra systems which admit k additional linear Darboux polynomials, with admissible loopless hypergraphs of order n and size k. We study the equivalence relation on admissible hypergraphs induced by linear transformations of the associated LV-systems, for n≤ 5. We present a new 13-parameter 5-component superintegrable Lotka-Volterra system, i.e. one that is not equivalent to a so-called tree-system. We conjecture that tree-systems associated with nonisomorphic trees are not equivalent, which we verified for n<9.
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