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Differential invariant algebras of Lie pseudo-groups
Peter J. Olver, Juha Pohjanpelto
School of Mathematics
Research output
:
Contribution to journal
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Article
›
peer-review
41
Scopus citations
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Dive into the research topics of 'Differential invariant algebras of Lie pseudo-groups'. Together they form a unique fingerprint.
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Keyphrases
Lie Pseudo-groups
100%
Differential Invariants
100%
Pseudogroup
57%
Group Acting
28%
Differential Syzygies
28%
Moving Frames
14%
Computational Algorithm
14%
Commutative Algebra
14%
High-order
14%
Group Action
14%
Syzygies
14%
Lower Order
14%
Recurrence Relations
14%
Differential Set
14%
One-to-one Correspondence
14%
Finite Systems
14%
Grbner Bases
14%
Annihilator
14%
Local Freeness
14%
Commuting Derivation
14%
Differential Algebra
14%
Algebraic Module
14%
Generating Set
14%
Analytic Manifolds
14%
Group Generators
14%
Complete System
14%
Non-commuting
14%
Mathematics
Differential Invariant
100%
Commutative Algebra
14%
Modulo
14%
Submanifold
14%
Finite System
14%
Annihilator
14%
Generating Set
14%
Analytic Manifold
14%
Differential Algebra
14%
Base Manifold
14%
Determining System
14%
One to one correspondence
14%
Moving Frame
14%
Recurrence Relation
14%
Complete System
14%