Geometry of superspace with even and odd brackets

On the geometry of supermanifolds with even and odd Kählerian structures, Divergence operators and odd Poisson brackets, Batalin–Vilkovisky formalism and integration theory on manifolds, On a Batalin-Vilkovisky operator generating higher Koszul brackets on differential forms, Canonical Poisson brackets of different gradings and strange superalgebras, INTEGRATION MEASURE AND EXTENDED BRST-COVARIANT QUANTIZATION, Even and odd symplectic and Kählerian structures on projective superspaces, Odd Laplacians: geometrical meaning of potential and modular class, Characteristic classes of gauge systems, Minimal models of quantum homotopy Lie algebras via the BV-formalism, Equivariant Batalin-Vilkovisky formalism, Graded Geometry, Q‐Manifolds, and Microformal Geometry, COHOMOLOGY OF THE VARIATIONAL COMPLEX IN FIELD–ANTIFIELD BRST THEORY, Towards equivariant Yang-Mills theory, The canonical BV Laplacian on half-densities, The existence of a canonical lifting of even Poisson structures to the algebra of densities, Odd Hamiltonian structure for supersymmetric Sawada-Kotera equation, Differential operators on the algebra of densities and factorization of the generalized Sturm-Liouville operator, Conformal geometry of the supercotangent and spinor bundles, Linear odd Poisson bracket on Grassmann variables, SYMPLECTIC GEOMETRIES ON SUPERMANIFOLDS, DUALITIES BETWEEN POISSON BRACKETS AND ANTIBRACKETS, Functionals and the quantum master equation, Gauge symmetries of the master action in the Batalin–Vilkovisky formalism, Fedosov and Riemannian supermanifolds, Triplectic quantization: A geometrically covariant description of the \(\text{Sp}(2)\)-symmetric Lagrangian formalism, Recursion operators and constants of motion in supermechanics, Higher derived brackets and homotopy algebras, Odd connections on supermanifolds: existence and relation with affine connections

• Integral invariants for supercanonical transformations