Schouten–Nijenhuis bracket differential geometry , the Schouten–Nijenhuis bracket , also known as the Schouten bracket , is a type of graded Lie bracket defined on multivector fields on a smooth manifold extending the Lie bracket of vector fields . There are two different versions, both rather confusingly called by the same name. The most common version is defined on alternating multivector fields and makes them into a Gerstenhaber algebra , but there is also another version defined on symmetric multivector fields, which is more or less the same as the Poisson bracket on the cotangent bundle . It was discovered by Jan Arnoldus Schouten and its properties were investigated by his student Albert Nijenhuis . It is related to but not the same as the Nijenhuis–Richardson bracket and the Frölicher–Nijenhuis bracket .An alternating multivector field is a section of the exterior algebra ∧∗ TM over the tangent bundle of a manifold M . The alternating multivector fields form a graded supercommutative ring with the product of a and b written as ab . This is dual to the usual algebra of differential forms Ω∗ M by the pairing on homogeneous elements:degree of a multivector A in is defined to be |A | = p .skew symmetric Schouten–Nijenhuis bracket is the unique extension of the Lie bracket of vector fields to a graded bracket on the space of alternating multivector fields that makes the alternating multivector fields into a Gerstenhaber algebra.a i b j smooth function , where is the common interior product operator. |ab | = |a | + |b | || = |a | + |b | − 1 c = a , ab = |a ||b | ba = c + |b | b = − a ,b ],c ] = = 0. If a is a vector field , then = L a b is the usual Lie derivative of the multivector field b along a , and in particular if a and b are vector fields then the Schouten–Nijenhuis bracket is the usual Lie bracket of vector fields. Lie superalgebra if the grading changed to the one of opposite parity , thoughJacobi identity may also be expressed in the symmetrical formGeneralizations There is a common generalization of the Schouten–Nijenhuis bracket for alternating multivector fields and the Frölicher–Nijenhuis bracket due to Vinogradov .functions on the cotangent space T * of M that are polynomial in the fiber , and under this identification the symmetric Schouten–Nijenhuis bracket corresponds to the Poisson bracket of functions on the symplectic manifold T * .
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