DiffAlg : Index
- - DiffAlgElement -- negation of a differential form or vector field
- degree(DiffAlgElement) -- degree of a differential form or a vector field
- diff(DiffAlgForm) -- exterior differential
- DiffAlg -- a differential algebra package
- DiffAlgDistribution -- the class of distributions of vector fields
- DiffAlgElement -- the class of all differential forms and vector fields
- DiffAlgElement * QQ -- scalar multiplication
- DiffAlgElement * RingElement -- scalar multiplication
- DiffAlgElement * ZZ -- scalar multiplication
- DiffAlgElement + DiffAlgElement -- addition
- DiffAlgElement - DiffAlgElement -- subtraction
- DiffAlgElement / QQ -- scalar division
- DiffAlgElement / RingElement -- scalar division
- DiffAlgElement / ZZ -- scalar division
- DiffAlgElement | String -- concatenate a string with a differential form or vector field
- DiffAlgField -- the class of all vector fields
- DiffAlgField _ DiffAlgForm -- contraction of a differential form with respect to a vector field
- DiffAlgField | DiffAlgField -- Lie bracket
- DiffAlgForm -- the class of all differential forms
- DiffAlgForm * DiffAlgForm -- exterior product
- DiffAlgForm ^ DiffAlgForm -- exterior product
- DiffAlgForm _ DiffAlgField -- contraction of a differential form with respect to a vector field
- dist -- produces a DiffAlgDistribution from a list
- dist(List) -- produces a DiffAlgDistribution from a list
- genIm -- basis of the image of a linear application
- genIm(DiffAlgElement,DiffAlgElement) -- basis of the image of a linear application
- genKer -- basis of the kernel of a linear application
- genKer(DiffAlgElement,DiffAlgElement) -- basis of the kernel of a linear application
- homogenize(DiffAlgElement) -- homogenize a differential form or vector field
- isInvolutive -- tests if a distribution is involutive
- isInvolutive(DiffAlgDistribution) -- tests if a distribution is involutive
- linearComb -- generic linear combination of elements
- linearComb(List,String) -- generic linear combination of elements
- List * DiffAlgForm -- pull-back of a differential form by a list of polynomials
- logarithmicForm -- creates a logarithmic form
- logarithmicForm(..., Projective => ...) -- a boolean option to produce a projective logarithmic form
- logarithmicForm(ZZ,List,String) -- creates a logarithmic form
- moduliIdeal -- ideal generated by the coefficients of a differential form or vector field
- moduliIdeal(DiffAlgElement) -- ideal generated by the coefficients of a differential form or vector field
- net(DiffAlgElement) -- prints a differential form or vector field using the pretty command
- newField -- constructor of a vector field
- newField(String) -- constructor of a vector field
- newField(ZZ,ZZ,String) -- constructor of a vector field
- newForm -- constructor of a differential form
- newForm(String) -- constructor of a differential form
- newForm(ZZ,ZZ,ZZ,String) -- constructor of a differential form
- QQ * DiffAlgElement -- scalar multiplication
- radial -- defines the radial vector field
- radial(ZZ) -- defines the radial vector field
- random(DiffAlgElement) -- replaces the coefficients of a differential form or a vector field with random values
- random(DiffAlgElement,Ring) -- replaces the coefficients of a differential form or a vector field with random values
- rank(DiffAlgDistribution) -- rank of the given distribution
- ring(DiffAlgElement) -- ring of the differential form or vector field
- RingElement * DiffAlgElement -- scalar multiplication
- singularIdeal -- ideal generated by the polynomial coefficients of a differential form or vector field
- singularIdeal(DiffAlgElement) -- ideal generated by the polynomial coefficients of a differential form or vector field
- String | DiffAlgElement -- concatenate a string with a differential form or vector field
- substitute(DiffAlgElement,Ring) -- gets the RingElement of a differential form or vector field in a ring
- toString(DiffAlgElement) -- converts a differential form or vector field to a string
- ZZ * DiffAlgElement -- scalar multiplication