In mathematics, Ricci calculus constitutes the rules of index notation and manipulation for tensors and tensor fields on a differentiable manifold, with or without a metric tensor or connection. It is also the modern name for what used to be called the absolute differential calculus (the foundation of tensor calculus), developed by Gregorio Ricci-Curbastro in 1887–1896, and subsequently popularized in a paper written with his pupil Tullio Levi-Civita in 1900. Jan Arnoldus Schouten developed the modern notation and formalism for this mathematical framework, and made contributions to the theory, during its applications to general relativity and differential geometry in the early twentieth century.
A component of a tensor is a real number that is used as a coefficient of a basis element for the tensor space. The tensor is the sum of its components multiplied by their corresponding basis elements. Tensors and tensor fields can be expressed in terms of their components, and operations on tensors and tensor fields can be expressed in terms of operations on their components. The description of tensor fields and operations on them in terms of their components is the focus of the Ricci calculus. This notation allows an efficient expression of such tensor fields and operations. While much of the notation may be applied with any tensors, operations relating to a differential structure are only applicable to tensor fields. Where needed, the notation extends to components of non-tensors, particularly multidimensional arrays.
A tensor may be expressed as a linear sum of the tensor product of vector and covector basis elements. The resulting tensor components are labelled by indices of the basis. Each index has one possible value per dimension of the underlying vector space. The number of indices equals the degree (or order) of the tensor.
For compactness and convenience, the Ricci calculus incorporates Einstein notation, which implies summation over indices repeated within a term and universal quantification over free indices.
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In mathematics and mathematical physics, raising and lowering indices are operations on tensors which change their type. Raising and lowering indices are a form of index manipulation in tensor expressions. Mathematically vectors are elements of a vector space over a field , and for use in physics is usually defined with or . Concretely, if the dimension of is finite, then, after making a choice of basis, we can view such vector spaces as or . The dual space is the space of linear functionals mapping .
En mathématiques et en physique, les symboles de Christoffel (ou coefficients de Christoffel, ou coefficients de connexion) sont une expression de la connexion de Levi-Civita dérivée du tenseur métrique. Les symboles de Christoffel sont utilisés dans les calculs pratiques de la géométrie de l'espace : ce sont des outils de calculs concrets, par exemple pour déterminer les géodésiques des variétés riemanniennes, mais en contrepartie leur manipulation est relativement longue, notamment du fait du nombre de termes impliqués.
La notation en indice abstrait est un système de notation présentant des similarités avec la convention de sommation d'Einstein et destinée comme cette dernière à l'écriture du calcul tensoriel. Cette notation, due au mathématicien Roger Penrose, a pour but l'écriture pratique d'équations dans lesquelles interviennent des tenseurs ou des champs tensoriels. Il s'agit à la fois : de bénéficier de la simplicité d'écriture permise par la convention de sommation d'Einstein ; de ne pas dépendre contrairement à la convention d'Einstein d'un choix de base particulier (et donc arbitraire).
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