A New Geometric Proposal for the Hamiltonian Description of Classical Field Theories

A new geometric setting for classical field theories

A new Hamiltonian formalism for singular Lagrangian theories

A new hierarchy of integrable systems associated to Hurwitz spaces

A new integrable system on the sphere and conformally equivariant quantization

A new integral representation for the Riemann Zeta function

A new interpretation for the mass of a classical relativistic particle

A New Kind of Deformed Hermite Polynomials and Its Applications

A new kind of geometric phases in open quantum systems and higher gauge theory

A New Kind of Graded Lie Algebra and Parastatistical Supersymmetry

A new kind of representations on noncommutative phase space

A new kind of solutions of the Einstein's field equations with non-vanishing cosmological constant

A new Lax pair for the sixth Painlevé equation associated with $\hat{\mathfrak{so}}(8)$

A new Lie algebra expansion method: Galilei expansions to Poincare and Newton-Hooke

A new Lie systems approach to second-order Riccati equations

A New Look at the Arcsine Law and "Quantum-Classical Correspondence"

A New Look at the Multidimensional Inverse Scattering Problem

A new macroscopic model derived from the Boltzmann equation and the discontinuous Galerkin method for solving kinetic equations

A New Method of Strong-Coupling Expansion

A New Mode Reduction Strategy for the Generalized Kuramoto-Sivashinsky Equation