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• Invariants_of_tensors abstract "In mathematics, in the fields of multilinear algebra and representation theory, invariants of tensors are coefficients of the characteristic polynomial of the tensor A:,where is the identity tensor and is the polynomial's indeterminate (it is important to bear in mind that a polynomial's indeterminate may also be a non-scalar as long as power, scaling and adding make sense for it, e.g., is legitimate, and in fact, quite useful).The first invariant of an n×n tensor A is the coefficient for (coefficient for is always 1), the second invariant is the coefficient for , etc., the nth invariant is the free term.The definition of the invariants of tensors and specific notations used throughout the article were introduced into the field of Rheology by Ronald Rivlin and became extremely popular there. In fact even the trace of a tensor is usually denoted as in the textbooks on rheology.".
• Invariants_of_tensors wikiPageID "2147961".
• Invariants_of_tensors wikiPageRevisionID "597295921".
• Invariants_of_tensors hasPhotoCollection Invariants_of_tensors.
• Invariants_of_tensors subject Category:Invariant_theory.
• Invariants_of_tensors subject Category:Linear_algebra.
• Invariants_of_tensors subject Category:Tensors.
• Invariants_of_tensors type Abstraction100002137.
• Invariants_of_tensors type Cognition100023271.
• Invariants_of_tensors type Concept105835747.
• Invariants_of_tensors type Content105809192.
• Invariants_of_tensors type Idea105833840.
• Invariants_of_tensors type PsychologicalFeature100023100.
• Invariants_of_tensors type Quantity105855125.
• Invariants_of_tensors type Tensor105864481.
• Invariants_of_tensors type Tensors.
• Invariants_of_tensors type Variable105857459.
• Invariants_of_tensors comment "In mathematics, in the fields of multilinear algebra and representation theory, invariants of tensors are coefficients of the characteristic polynomial of the tensor A:,where is the identity tensor and is the polynomial's indeterminate (it is important to bear in mind that a polynomial's indeterminate may also be a non-scalar as long as power, scaling and adding make sense for it, e.g., is legitimate, and in fact, quite useful).The first invariant of an n×n tensor A is the coefficient for (coefficient for is always 1), the second invariant is the coefficient for , etc., the nth invariant is the free term.The definition of the invariants of tensors and specific notations used throughout the article were introduced into the field of Rheology by Ronald Rivlin and became extremely popular there. ".
• Invariants_of_tensors label "Invariante algebraico (álgebra lineal)".
• Invariants_of_tensors label "Invariante algébrico".
• Invariants_of_tensors label "Invariants of tensors".
• Invariants_of_tensors sameAs Invariante_algebraico_(álgebra_lineal).
• Invariants_of_tensors sameAs Invariante_algébrico.
• Invariants_of_tensors sameAs m.06q9vl.
• Invariants_of_tensors sameAs Q9009080.
• Invariants_of_tensors sameAs Q9009080.
• Invariants_of_tensors sameAs Invariants_of_tensors.
• Invariants_of_tensors wasDerivedFrom Invariants_of_tensors?oldid=597295921.
• Invariants_of_tensors isPrimaryTopicOf Invariants_of_tensors.