Space-charge limited current (SCLC) is easy to calculate theoretically for one-dimensional (1D) planar geometry using Poisson’s equation. But 1D cylindrical and spherical geometries require ...

Abstract: This paper proposes a novel nonlinear model predictive control (NMPC) method based on geometric variational calculus for high-dynamic and complex motion ...

Abstract: The breath rate (BR), heart rate (HR), breathing-breathing interval (BBI), and HR variability (HRV) are the critical vital sign parameters. In this article, a novel method named adaptive ...

To present basic ideas and techniques of variational calculus and Lagrangian dynamics. Review of standard methods for finding extrema. Definition of, and method for calculating, extremals ...

We introduce neutral excitation density-functional theory (XDFT), a computationally light, generally applicable, first-principles technique for calculating neutral electronic excitations. The concept ...

Calculus of variations provides a unifying language for problems in which the state or trajectory of a system is determined by extremising an energy or action functional. Rooted in classical mechanics ...

Greetings Network. I am thrilled to announce that I have published a new article about The Calculus of Variations (or Variational Calculus) on my physics/maths blog page, Physfrenzy. The research ...

ABSTRACT: This paper is devoted to implementing the Legendre spectral collocation method to introduce numerical solutions of a certain class of fractional variational problems (FVPs). The properties ...

ABSTRACT: This paper presents, an efficient approach for solving Euler-Lagrange Equation which arises from calculus of variations. Homotopy analysis method to find an approximate solution of ...