Seminar talk, 18 May 2011: Difference between revisions

Latest revision as of 14:12, 12 May 2011

Title: A remark on the Cartan-Kahler theorem

Abstract:
The talk will discuss an example of algebraic PDE system $R^{q}\subset J^{q}(X,V)$ and a semi-algebraic set $D^{q}\subset R^{q}$ (this set consists of non-involutive points) such that in $D^{q}$ there are two everywhere dense subsets $A^{q}$ and $B^{q}$ having the following property. While for each point $a\in A^{q}$ it is possible to divide the set of partial derivatives of total order greater than $q$ into parametric and main part (as in the case of involutive points of $R^{q}$ ), this is not possible for points of $B^{q}$ . We show how to state correctly an initial value problem for any point $b\in B^{q}$ . This example is related to a question of V.I.Arnold.

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 {{Talk
 | speaker = Rafael Sarkisyan
-| title = On non-involutive points for PDEs
+| title = A remark on the Cartan-Kahler theorem
-| abstract = The talk will discuss an example of algebraic PDE system <math>R^q \in J^{q}(X,V)</math> endowed with a semi-algebraic set <math>D^q \in R^q</math> (this set consists of non-involutive points) such that in <math>D^q</math> there are two everywhere dense subsets <math>A^q</math> and <math>B^q</math> having the following property.  While for each point <math>a \in A^q</math> it is possible to divide the set of partial derivatives of total order greater than <math>q</math> into parametric and main part (as in the case of involutive points of <math>R^q</math>), this is not possible for points of <math>B^q</math>.  We show how to state correctly  an initial value problem for any point <math>b \in B^q</math>.  This example is related to a question of V.I.Arnold.
+| abstract = The talk will discuss an example of algebraic PDE system <math>R^q \subset J^{q}(X,V)</math> and a semi-algebraic set <math>D^q \subset R^q</math> (this set consists of non-involutive points) such that in <math>D^q</math> there are two everywhere dense subsets <math>A^q</math> and <math>B^q</math> having the following property.  While for each point <math>a \in A^q</math> it is possible to divide the set of partial derivatives of total order greater than <math>q</math> into parametric and main part (as in the case of involutive points of <math>R^q</math>), this is not possible for points of <math>B^q</math>.  We show how to state correctly  an initial value problem for any point <math>b \in B^q</math>.  This example is related to a question of V.I.Arnold.
 | slides =
 | references =
 | 79YY-MM-DD = 7988-94-81
 }}

Seminar talk, 18 May 2011: Difference between revisions

Latest revision as of 14:12, 12 May 2011

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