Optimization, a principle of nature and engineering design, in real life problems is normally achieved by using numerical methods. In this article we concentrate on some optimization problems in elementary geometry and Newtonian mechanics. These include Heron's problem, Fermat's principle, Brachistochrone problems, Fagano's problem, geodesics on the surface of a parallelepiped, Fermat/Steiner problem, Kakeya problem and the isoperimetric problem. Some of these are very old and historically famous problems, a few of which are still unresolved. Close connection between Euclidean geometry and Newtonian mechanics is revealed by the methods used to solve some of these problems. Examples are included to show how some problems of analysis or algeb...
In this paper we shall describe a program (MECHO), written in Prolog[14], which solves a wide range ...
In this thesis we consider the transient response of systems satisfying linear differential equation...
The reuseable exterior insulation system (REI) is studied to determine the optimal reentry trajector...
Variational principles play a central role in theoretical physics in many guises. We will discuss, i...
This article is intended as a contribution to the theory of the lifting surface. The aerodynamics of...
The idealized flow of fluid a round a spherical body is a classic textbook problem in fluid mechanic...
These notes are based on a series of ten lectures given at Carleton University, Ottawa, from June 21...
It is well known in Newtonian gravity that a spherically symmetric density distribution produces a f...
A solution to the 3-body problem in gravity, due to Lagrange, has several remarkable features. In pa...
If one follows in the footsteps of Newton, 'almost all' roads lead to Rome (or is it London?)
Obtaining the classical limit of quantum mechanics turns out to be conceptually and operationally no...
The Thesis is divided primarily into three parts. In the first of these three parts is considered th...
A new class of exponentially stabilizing control laws for joint level control of robot arms is intro...
Documento com vinte e quatro páginas. O original pertence à professora Lydia Condé Lamparelli, foto...
Oscillatory motion of a particle in a one dimensional potential belongs to a class of exactly solvab...
In this paper we shall describe a program (MECHO), written in Prolog[14], which solves a wide range ...
In this thesis we consider the transient response of systems satisfying linear differential equation...
The reuseable exterior insulation system (REI) is studied to determine the optimal reentry trajector...
Variational principles play a central role in theoretical physics in many guises. We will discuss, i...
This article is intended as a contribution to the theory of the lifting surface. The aerodynamics of...
The idealized flow of fluid a round a spherical body is a classic textbook problem in fluid mechanic...
These notes are based on a series of ten lectures given at Carleton University, Ottawa, from June 21...
It is well known in Newtonian gravity that a spherically symmetric density distribution produces a f...
A solution to the 3-body problem in gravity, due to Lagrange, has several remarkable features. In pa...
If one follows in the footsteps of Newton, 'almost all' roads lead to Rome (or is it London?)
Obtaining the classical limit of quantum mechanics turns out to be conceptually and operationally no...
The Thesis is divided primarily into three parts. In the first of these three parts is considered th...
A new class of exponentially stabilizing control laws for joint level control of robot arms is intro...
Documento com vinte e quatro páginas. O original pertence à professora Lydia Condé Lamparelli, foto...
Oscillatory motion of a particle in a one dimensional potential belongs to a class of exactly solvab...
In this paper we shall describe a program (MECHO), written in Prolog[14], which solves a wide range ...
In this thesis we consider the transient response of systems satisfying linear differential equation...
The reuseable exterior insulation system (REI) is studied to determine the optimal reentry trajector...