Open Access Open Access  Restricted Access Subscription Access
Open Access Open Access Open Access  Restricted Access Restricted Access Subscription Access

Local Expression of Hessian Structures and Dissections on Manifolds


Affiliations
1 School of Mathematics & CIS., University of Hyderabad, Hyderabad, India
     

   Subscribe/Renew Journal


The Christoffel symbols are usually understood to be the coefficients of a connection or the components of a spray. In this note we show that they also arise naturally when one tries to obtain local characterizations of dissections of the bundle of second order tangent vectors on a manifold or of Hessian structures on a manifold. These results give an elementary explanation of known theorems relating connections, sprays, dissections and. Hessian structures. Further they show that the same local structure can be interpreted globally in widely different ways.

Keywords

Connection, Spray, Dissection, Hessian Structure.
User
Subscription Login to verify subscription
Notifications
Font Size

Abstract Views: 218

PDF Views: 0




  • Local Expression of Hessian Structures and Dissections on Manifolds

Abstract Views: 218  |  PDF Views: 0

Authors

R. David Kumar
School of Mathematics & CIS., University of Hyderabad, Hyderabad, India
K. Viswanath
School of Mathematics & CIS., University of Hyderabad, Hyderabad, India

Abstract


The Christoffel symbols are usually understood to be the coefficients of a connection or the components of a spray. In this note we show that they also arise naturally when one tries to obtain local characterizations of dissections of the bundle of second order tangent vectors on a manifold or of Hessian structures on a manifold. These results give an elementary explanation of known theorems relating connections, sprays, dissections and. Hessian structures. Further they show that the same local structure can be interpreted globally in widely different ways.

Keywords


Connection, Spray, Dissection, Hessian Structure.