Add to ORKGWe study the variation of a smooth volume form along extremals of a variational problem with nonholonomic constraints and an action-like Lagrangian. We introduce a new invariant describing the interaction of the volume with the dynamics and we study its basic properties. We then show how this invariant, together with curvature-like invariants of the dynamics, appear in the expansion of the volume at regular points of the exponential map. This generalizes the well-known expansion of the Riemannian volume in terms of Ricci curvature to a wide class of geometric structures, including all sub-Riemannian manifolds
In a recent paper Miranda Jr., Pallara, Paronetto and Preunkert have shown that the classical De Gio...
We consider one parameter analytic Hamiltonian perturbations of the geodesic flows on surfaces of co...
We show that the twisted K\ue4hler-Ricci flow on a compact K\ue4hler manifold X converges to a flow ...
We study the variation of a smooth volume form along extremals of a variational problem with nonholo...
Pairs (Hamiltonian system, Lagrangian distribution) called dynamical Lagrangian distributions, appea...
This paper tackles Hamiltonian chaos by means of elementary tools of Riemannian geometry. More preci...
We apply variational principles in the context of geometrothermodynamics. The thermodynamic phase sp...
Curvature-type invariants of Hamiltonian systems generalize sectional curvatures of Riemannian manif...
We survey some recent advances in the study of (area-preserving) flows on surfaces, in particular on...
In this letter a new Lagrangian variational principle is proved to hold for the Einstein field equat...
The approach to nonholonomic Ricci flows and geometric evolution of regular Lagrange systems [S. Vac...
This established reference work continues to provide its readers with a gateway to some of the most ...
We explain a general variational and dynamical nature of nice and powerful concepts and results main...
This book focuses on Hamilton's Ricci flow, beginning with a detailed discussion of the required asp...
136 pagesWe introduce a flow of Riemannian metrics and positive volume forms over compact oriented ...
In a recent paper Miranda Jr., Pallara, Paronetto and Preunkert have shown that the classical De Gio...
We consider one parameter analytic Hamiltonian perturbations of the geodesic flows on surfaces of co...
We show that the twisted K\ue4hler-Ricci flow on a compact K\ue4hler manifold X converges to a flow ...
We study the variation of a smooth volume form along extremals of a variational problem with nonholo...
Pairs (Hamiltonian system, Lagrangian distribution) called dynamical Lagrangian distributions, appea...
This paper tackles Hamiltonian chaos by means of elementary tools of Riemannian geometry. More preci...
We apply variational principles in the context of geometrothermodynamics. The thermodynamic phase sp...
Curvature-type invariants of Hamiltonian systems generalize sectional curvatures of Riemannian manif...
We survey some recent advances in the study of (area-preserving) flows on surfaces, in particular on...
In this letter a new Lagrangian variational principle is proved to hold for the Einstein field equat...
The approach to nonholonomic Ricci flows and geometric evolution of regular Lagrange systems [S. Vac...
This established reference work continues to provide its readers with a gateway to some of the most ...
We explain a general variational and dynamical nature of nice and powerful concepts and results main...
This book focuses on Hamilton's Ricci flow, beginning with a detailed discussion of the required asp...
136 pagesWe introduce a flow of Riemannian metrics and positive volume forms over compact oriented ...
In a recent paper Miranda Jr., Pallara, Paronetto and Preunkert have shown that the classical De Gio...
We consider one parameter analytic Hamiltonian perturbations of the geodesic flows on surfaces of co...
We show that the twisted K\ue4hler-Ricci flow on a compact K\ue4hler manifold X converges to a flow ...