A new law of nature asserts that chemical equilibria and chemical kinetics are governed by fundamental principles of projective geometry. The equilibrium constans of chemical reactions are the invariants of projective geometry in disguise. Chemical reactions may geometrically be represented by incidence structures, which are preserved under projective transformations. Theorems of Ceva, Menelaus, and Carnot for triangles and n-gons represent the chemical equilibria, while Routh's theorem represents non-equilibria. Intrinsically projective Riccati's differential equation, being also generic to many other equations of mathematical physics, governs parametric dependence of the equilibrium constants. The theory offers tangible geometrizations an...
This paper studies the relations among system parameters, uniqueness, and stability of equilibria, f...
We start by formulating geometrically the Newton's law for a classical free particle in terms of Ri...
Carmichael (1970) identified crossing isograds in the Whetstone Lake area of Ontario, a finding that...
Abstract. We demonstrate the benefits of a convex geometric perspective for questions on chemical st...
It is well established that many physical and chemical phenomena such as those in chemical reaction ...
Equilibrium theory occupies an important position in chemistry and it is traditionally based on ther...
ABSTRACT. In this work is induced a new topology of solutions of chemical equations by virtue of poi...
Projective geometry is a branch of mathematics which is foundationally based on an axiomatic system....
The general laws governing thermodynamic processes and phenomena are recapitulated and completed wit...
The time evolution of macroscopic systems can be experimentally observed and mathematically describe...
The concept of balanced chemical reactions, introduced by Wenzel in 1777l and made more exact by Ber...
20 pages, 4 figuresGiven a real vector space V of finite dimension, together with a particular homog...
International audienceThe logical structure of classical thermodynamics is presented in a modern, ge...
Given its importance in modern physics, philosophers of science have paid surprisingly little attent...
In this work a geometrical representation of equilibrium and near equilibrium statistical mechanics ...
This paper studies the relations among system parameters, uniqueness, and stability of equilibria, f...
We start by formulating geometrically the Newton's law for a classical free particle in terms of Ri...
Carmichael (1970) identified crossing isograds in the Whetstone Lake area of Ontario, a finding that...
Abstract. We demonstrate the benefits of a convex geometric perspective for questions on chemical st...
It is well established that many physical and chemical phenomena such as those in chemical reaction ...
Equilibrium theory occupies an important position in chemistry and it is traditionally based on ther...
ABSTRACT. In this work is induced a new topology of solutions of chemical equations by virtue of poi...
Projective geometry is a branch of mathematics which is foundationally based on an axiomatic system....
The general laws governing thermodynamic processes and phenomena are recapitulated and completed wit...
The time evolution of macroscopic systems can be experimentally observed and mathematically describe...
The concept of balanced chemical reactions, introduced by Wenzel in 1777l and made more exact by Ber...
20 pages, 4 figuresGiven a real vector space V of finite dimension, together with a particular homog...
International audienceThe logical structure of classical thermodynamics is presented in a modern, ge...
Given its importance in modern physics, philosophers of science have paid surprisingly little attent...
In this work a geometrical representation of equilibrium and near equilibrium statistical mechanics ...
This paper studies the relations among system parameters, uniqueness, and stability of equilibria, f...
We start by formulating geometrically the Newton's law for a classical free particle in terms of Ri...
Carmichael (1970) identified crossing isograds in the Whetstone Lake area of Ontario, a finding that...