We present an existence theorem for a class of generalized quasi-variational problem involving Grassmannian manifolds. This class is directly inspired by a general equilibrium problem with time, uncertainty and incomplete financial market with real assets. The problem of the existence of this equilibrium cannot be analyzed using standard techniques employed in similar models. Then, we show how the concept of equilibrium is strictly related to the concept of Grassmannian manifolds. Finally, we present a variational inequality problem, whose solutions are equilibria of the proposed model.
AN EXISTENCE THEOREM FOR GENERALIZED QUASI-VARIATIONAL INEQUALITIES INVOLVING THE GRASSMANNIAN MANIFOLD WITH AN APPLICATION / antonio villanacci; Maria Bernadette Donato. - In: ATTI DELLA ACCADEMIA PELORITANA DEI PERICOLANTI, CLASSE DI SCIENZE FISICHE, MATEMATICHE E NATURALI. - ISSN 1825-1242. - ELETTRONICO. - 98:(2020), pp. A6.1-A6.23. [10.1478/AAPP.98S2A6]
AN EXISTENCE THEOREM FOR GENERALIZED QUASI-VARIATIONAL INEQUALITIES INVOLVING THE GRASSMANNIAN MANIFOLD WITH AN APPLICATION
antonio villanacci;
2020
Abstract
We present an existence theorem for a class of generalized quasi-variational problem involving Grassmannian manifolds. This class is directly inspired by a general equilibrium problem with time, uncertainty and incomplete financial market with real assets. The problem of the existence of this equilibrium cannot be analyzed using standard techniques employed in similar models. Then, we show how the concept of equilibrium is strictly related to the concept of Grassmannian manifolds. Finally, we present a variational inequality problem, whose solutions are equilibria of the proposed model.
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