New (3,6,8) distribution model with G2 symmetries that is maximally symmetric in the 6D-square family and counters the maximal-class conjecture.
Generalized pseudo-product structures and finite type distributions via abnormal extremals
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abstract
We generalize the classical Tanaka result on the finiteness of symmetry algebra for non-degenerate pseudo-product structures to the case when the completely-integrable distributions defining the pseudo-product structure are no longer concentrated in the degree $-1$. In order to do this, we modify the notion of universal prolongation of graded nilpotent Lie algebras and generalize the original finiteness criterion of Tanaka. Using this result, we demonstrate that in real analytic category, distributions that are controllable by regular abnormal extremal trajectories, also known as singularly transitive, have finite-dimensional symmetries. This result settles Problem V in the affirmative from the 2013 list of open problems by Andrei Agrachev. Additionally, we discuss applications to symmetries and natural equivalence problems for systems of ODEs of mixed order.
fields
math.DG 1years
2026 1verdicts
UNVERDICTED 1representative citing papers
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$G_2$ and the Maximally Symmetric (3, 8) Distribution with 6-Dimensional Square
New (3,6,8) distribution model with G2 symmetries that is maximally symmetric in the 6D-square family and counters the maximal-class conjecture.