A note on Ricci flow and optimal transportation
We describe a new link between Perelman’s monotonicity formula for the reduced volume and ideas from optimal transport theory.
A Note on Right-Equivalence of Map-Germs.
A note on singular points of convex functions in Banach spaces
A note on strong differentiability spaces
A note on strong resonance problems for -Laplacian.
A Note on Sufficiency of Jets.
A note on tangent bundles in a category with a ring object.
A Note on the Alexander Theorem on the Complex Plane
We investigate the Banach manifold consisting of complex functions on the unit disc having boundary values in a given one-dimensional submanifold of the plane. We show that ∂/∂λ̅ restricted to that submanifold is a Fredholm mapping. Moreover, for any such function we obtain a relation between its homotopy class and the Fredholm index.
A note on the existence of two nontrivial solutions of a resonance problem.
A Note on the First Nonzero Eigenvalue of the Laplacian Acting of P-Forms.
A note on the holonomy of connections in twisted bundles
A note on the inverse function theorem of Nash and Moser.
A note on the isoperimetric constant
A Note on the Order of Determination of a Finitely Determined Germ.
A note on trignometric sums arising in gauge theory.
A note to the unipotency of the identity component of the group of algebra automorphisms.
A numerically based investigation on the symmetry breaking and asymptotic behavior of the ground states to the -Hénon equation.
A one-sided version of Alexiewicz-Orlicz's differentiability theorem.
Modificando adecuadamente el método de un trabajo olvidado [1], probamos que si una aplicación continua, de un subconjunto abierto no vacío U de un espacio vectorial topológico metrizable separable y de Baire E, en un espacio localmente convexo, es direccionalmente diferenciable por la derecha en U según un subconjunto comagro de E, entonces, es genéricamente Gâteaux diferenciable en U. Nuestro resultado implica que cualquier espacio vectorial topológico, metrizable, separable y de Baire, es débilmente...
A pair hamiltonian model of a non-ideal Boson gas
A partial regularity result for a class of stationary Yang-Mills in high dimension.
We prove, for arbitrary dimension of the base n greater than or equal to 4, stationary Yang-Mills Fields satisfying Borne approximability property are regular apart from a closed subset of the base having zero (n-4)- Hausdorff measure.