Jacobi identities for Wronskian determinants over multidimension

Abstract

The generalised Wronskian of differential order k≥slant 1 for N functions f1, …, fN in d≥slant 1 independent variables x1, …, xd is the determinant of the matrix with these functions' derivatives ∂|σi| fj / ∂ (x1)σi1·s ∂ (xd)σid (of orders 0 ≤slant |σi| ≤slant k), where the multi-indices σi mark (all or part of) fibre variables uσi in the kth jet space Jk(Rd). We prove that these (in)complete Wronskians -- provided that their lowest-order parts are complete at differential orders ≤slant 1 -- over the d-dimensional base satisfy the table of bi-linear, Jacobi-type identities for Schlessinger--Stasheff's strongly homotopy Lie algebras.

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