Transversal unfoldings of derived foliations

Abstract

We establish a homotopy-invariant theory of transversal unfoldings of relative derived foliations. A transversal unfolding is an integrable lift of the parameter directions to infinitesimal transverse symmetries of the relative foliation. We construct a canonical transverse controller and prove that the groupoid of strict transversal unfoldings is the one-truncation of its derived space of flat splittings. For affine Chevalley--Eilenberg presentations, the controller is described by first-order Lie derivations modulo inner derivations. When the inner action has a kernel, the ordinary quotient is replaced by a crossed controller whose derived mapping space retains the transported central isotropy and the ensuing higher homotopies. We then construct the controller intrinsically from the graded-mixed de Rham algebra, prove its independence of the chosen presentation, and obtain a global classification under explicit descent hypotheses. The theory encompasses the classical, logarithmic, shifted-Poisson, and representable leaf-space cases.