Seminar talk, 19 October 2011: Difference between revisions

Revision as of 23:47, 7 October 2011

Title: On differential invariants of G-manifolds

Abstract:
Consider an action of a group $G$ on a manifold $M$ . This action prolongs to action on the space of functions on $M$ . The talk will discuss a new method of construction the field of differential invariants of this action (and, as a consequence, classification of $G$ -orbits of functions on $M$ ).

As an example, there will be discussed solutions of the problems of classification $\mathrm {GL} _{3}(\mathbb {C} )$ - and $\mathrm {SO} _{3}(\mathbb {C} )$ -orbits of ternary forms. Then there will be considered a solution of more general problem of classification of $G$ -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 $G$ .

In conclusion, there will be explained how to generalized these results to classification of $G$ -orbit of functions on manifolds.

@@ Line 2: / Line 2: @@
 | speaker = Pavel Bibikov
 | title = On differential invariants of G-manifolds
-| abstract = Consider an action of a group G on a manifold M.  This action prolongs to action on the space of functions on M.  The talk will discuss a new method of construction the field of differential invariants of this action (and, as a consequence, classification of G-orbits of functions on M).
+| 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>).
-As an example, there will be discussed solutions of the problems of classification \mathrm{GL}_3(\mathbb{C})- and \mathrm{SO}_3(\mathbb{C})-orbits of ternary forms. Then there will be considered a solution of more general problem of classification of G-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 G.
+As an example, there will be discussed solutions of the problems of classification <math>\mathrm{GL}_3(\mathbb{C})</math>- and <math>\mathrm{SO}_3(\mathbb{C})</math>-orbits of ternary forms. Then there will be considered a solution of more general problem of classification of <math>G</math>-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 <math>G</math>.
-In conclusion, there will be explained how to generalized these results to classification of G-orbit of functions on manifolds.
+In conclusion, there will be explained how to generalized these results to classification of <math>G</math>-orbit of functions on manifolds.
 | slides =
 | references =
 | 79YY-MM-DD = 7988-89-80
 }}

Seminar talk, 19 October 2011: Difference between revisions

Revision as of 23:47, 7 October 2011

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