Add to ORKGABSTRACT. Our paper contains two main results: (1) the integral manifolds of a distri-bution together with two Riemann metrics produce potential maps which are in fact least squares approximations of the starting integral manifolds; (2) the least squares energy ad-mits extremals satisfying periodic boundary conditions. Section 1 contains historical and bibliographical notes. Section 2 analyses some el-ements of the geometry produced on the jet bundle of order one by a semi-Riemann Sasaki-like metric. Section 3 describes the maximal integral manifolds of a distribution as solutions of a PDEs system of order one. Section 4 studies Poisson-like second-order prolongations of first order PDE systems and formulates the Lorentz-Udrişte World-Forc...
A Finsler manifold is a Riemannian manifold without the quadratic restriction. In this paper we intr...
We overview some L p -extensions of the classical divergence theorem to non-compact Riemannian mani...
We apply variational principles in the context of geometrothermodynamics. The thermodynamic phase sp...
Our paper contains two main results: (1) the integral manifolds of a distribution together with two ...
This article studies some examples of the family of problems where a Lagrangian is given for maps fr...
Abstract Multidegree of freedom nonlinear differential equations can often be transformed by means o...
We are interested in solving Liouville-type problems to explore constancy properties for maps or dif...
Abstract: Our theory of determining a tensor by boundary energy of a multitime first order PDE syste...
A theory of generalized harmonic maps between metric spaces is developed. The energy integral for ma...
We establish the convexity of Mabuchi’s K-energy functional along weak geodesics in the space of K\u...
According to the principle of least action, the spatially periodic motions of one-dimensional mechan...
We generalize the notion of integral Menger curvature introduced by Gonzalez and Maddocks [14] by de...
One potential pathway to find an ultimate rule governing our universe is to hunt for a connecti...
We describe some aspects of potential theory on Riemannian manifolds, concentrating on Liouville-typ...
We present a unified description of extremal metrics for the Laplace and Steklov eigenvalues on mani...
A Finsler manifold is a Riemannian manifold without the quadratic restriction. In this paper we intr...
We overview some L p -extensions of the classical divergence theorem to non-compact Riemannian mani...
We apply variational principles in the context of geometrothermodynamics. The thermodynamic phase sp...
Our paper contains two main results: (1) the integral manifolds of a distribution together with two ...
This article studies some examples of the family of problems where a Lagrangian is given for maps fr...
Abstract Multidegree of freedom nonlinear differential equations can often be transformed by means o...
We are interested in solving Liouville-type problems to explore constancy properties for maps or dif...
Abstract: Our theory of determining a tensor by boundary energy of a multitime first order PDE syste...
A theory of generalized harmonic maps between metric spaces is developed. The energy integral for ma...
We establish the convexity of Mabuchi’s K-energy functional along weak geodesics in the space of K\u...
According to the principle of least action, the spatially periodic motions of one-dimensional mechan...
We generalize the notion of integral Menger curvature introduced by Gonzalez and Maddocks [14] by de...
One potential pathway to find an ultimate rule governing our universe is to hunt for a connecti...
We describe some aspects of potential theory on Riemannian manifolds, concentrating on Liouville-typ...
We present a unified description of extremal metrics for the Laplace and Steklov eigenvalues on mani...
A Finsler manifold is a Riemannian manifold without the quadratic restriction. In this paper we intr...
We overview some L p -extensions of the classical divergence theorem to non-compact Riemannian mani...
We apply variational principles in the context of geometrothermodynamics. The thermodynamic phase sp...
