In this paper we study geometry of symmetric torsion-free connections which preserve a given symp... more In this paper we study geometry of symmetric torsion-free connections which preserve a given symplectic form
Dedicated to the memory of Chih-Han Sah, this volume covers a number of topics, including: combin... more Dedicated to the memory of Chih-Han Sah, this volume covers a number of topics, including: combinatorial geometry, connections between logic and geometry, Lie groups, algebras and their representations, and non-communcative algebra and its relations to physics.
Journal of Physics A: Mathematical and Theoretical
We study a fully noncommutative generalization of the commutative fourth Painlevé equation that p... more We study a fully noncommutative generalization of the commutative fourth Painlevé equation that possesses solutions in terms of an infinite Toda system over an associative unital division ring equipped by a derivation.
In this paper we study geometry of symmetric torsion-free connections which preserve a given symp... more In this paper we study geometry of symmetric torsion-free connections which preserve a given symplectic form
Dedicated to the memory of Chih-Han Sah, this volume covers a number of topics, including: combin... more Dedicated to the memory of Chih-Han Sah, this volume covers a number of topics, including: combinatorial geometry, connections between logic and geometry, Lie groups, algebras and their representations, and non-communcative algebra and its relations to physics.
Journal of Physics A: Mathematical and Theoretical
We study a fully noncommutative generalization of the commutative fourth Painlevé equation that p... more We study a fully noncommutative generalization of the commutative fourth Painlevé equation that possesses solutions in terms of an infinite Toda system over an associative unital division ring equipped by a derivation.
Uploads
Papers