Seminar talk, 19 October 2011: Difference between revisions
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{{Talk | {{Talk | ||
| speaker = Pavel Bibikov | | speaker = Pavel Bibikov | ||
| title = | | title = Classification of linear actions of algebraic groups on the space of homogeneous forms | ||
| abstract = Consider an action of a group <math>G</math> on a manifold <math>M</math>. This action prolongs to action on the space of functions on <math>M</math>. The talk will discuss a new method of construction the field of differential invariants of this action (and, as a consequence, classification of <math>G</math>-orbits of functions on <math>M</math>). | | abstract = Consider an action of a group <math>G</math> on a manifold <math>M</math>. This action prolongs to action on the space of functions on <math>M</math>. The talk will discuss a new method of construction the field of differential invariants of this action (and, as a consequence, classification of <math>G</math>-orbits of functions on <math>M</math>). | ||
Latest revision as of 13:38, 22 October 2011
Speaker: Pavel Bibikov
Title: Classification of linear actions of algebraic groups on the space of homogeneous forms
Abstract:
Consider an action of a group on a manifold . This action prolongs to action on the space of functions on . The talk will discuss a new method of construction the field of differential invariants of this action (and, as a consequence, classification of -orbits of functions on ).
As an example, there will be discussed solutions of the problems of classification - and -orbits of ternary forms. Then there will be considered a solution of more general problem of classification of -orbit of homogeneous form in many variables. Surprisingly, this classification does not depend on the degree of the form, on the number of variables, and even on (in a sense) the group .
In conclusion, there will be explained how to generalized these results to classification of -orbit of functions on manifolds.