On the category of Lie \(n\)-algebroids

The holonomy of a singular leaf ⋮ A tale of three homotopies ⋮ The category of Z2n-supermanifolds ⋮ Splitting theorem for \(\mathbb{Z}_2^n\)-supermanifolds ⋮ Polarisation of graded bundles ⋮ Homotopy equivalence of shifted cotangent bundles ⋮ L∞-actions of Lie algebroids ⋮ Modular class of Lie \(\infty\)-algebroids and adjoint representations ⋮ Strong homotopy Lie algebras, homotopy Poisson manifolds and Courant algebroids ⋮ The first Pontryagin class of a quadratic Lie 2-algebroid ⋮ On the strong homotopy Lie–Rinehart algebra of a foliation ⋮ Homological sections of Lie algebroids ⋮ Introduction to graded geometry ⋮ Shifted derived Poisson manifolds associated with Lie pairs ⋮ Differential graded Lie groups and their differential graded Lie algebras ⋮ Extended Riemannian geometry. I: Local double field theory ⋮ ‐Algebras, the BV Formalism, and Classical Fields ⋮ Pre-Courant algebroids ⋮ Normal forms of \(\mathbb{Z}\)-graded \(Q\)-manifolds ⋮ A geometrisation of \(\mathbb{N}\)-manifolds ⋮ The modular class of a singular foliation ⋮ On symmetries of singular foliations ⋮ Categorification of \(\mathsf{VB}\)-Lie algebroids and \(\mathsf{VB}\)-Courant algebroids ⋮ Representations of Homotopy Lie–Rinehart Algebras ⋮ Modules and representations up to homotopy of Lie \(n\)-algebroids ⋮ The universal Lie \(\infty\)-algebroid of a singular foliation ⋮ Higher extensions of Lie algebroids ⋮ Connections adapted to non-negatively graded structures ⋮ The geometry of graded cotangent bundles ⋮ Higher algebra over the Leibniz operad ⋮ Duality for graded manifolds ⋮ Linear \(\mathbb{Z}_2^n\)-manifolds and linear actions ⋮ The geometrization of \(\mathbb{N}\)-manifolds of degree 2 ⋮ Linear duals of graded bundles and higher analogues of (Lie) algebroids ⋮ Homotopy Poisson algebras, Maurer-Cartan elements and Dirac structures of CLWX 2-algebroids ⋮ Deformation spaces and normal forms around transversals ⋮ LIE ALGEBROIDS AS SPACES ⋮ Lie 2-algebroids and matched pairs of 2-representations: a geometric approach ⋮ Lie-Rinehart algebras \(\simeq\) acyclic Lie \(\infty \)-algebroids ⋮ Atiyah classes and Kontsevich–Duflo type theorem for dg manifolds ⋮ On the strong homotopy associative algebra of a foliation ⋮ Homotopical algebra for Lie algebroids ⋮ Global theory of graded manifolds ⋮ Free Courant and derived Leibniz pseudoalgebras ⋮ Dg manifolds, formal exponential maps and homotopy Lie algebras

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• Lie algebroid morphisms, Poisson sigma models, and off-shell closed gauge symmetries
• Algebraic constructions in the category of Lie algebroids
• Deformations of Lie brackets: Cohomological aspects
• Coalgebraic approach to the Loday infinity category, stem differential for \(2n\)-ary graded and homotopy algebras
• Introduction to sh Lie algebras for physicists
• The Geometry of the Master Equation and Topological Quantum Field Theory
• On the strong homotopy Lie–Rinehart algebra of a foliation
• Representations up to homotopy of Lie algebroids
• L-infinity algebra connections and applications to String- and Chern-Simons n-transport
• Two Approaches to Supermanifolds
• $Q$-manifolds and Higher Analogs of Lie Algebroids
• Smooth Manifolds and Observables
• Higher categorified algebras versus bounded homotopy algebras
• Noether's second theorem in a general setting: reducible gauge theories