Add to ORKGIn this paper we give a contribution to the taxonomy of physical theories. We provide here a thorough description of the axiomatic foundations of the most relevant physical theories, Mechanics, Special Relativity, General Relativity, Quantum Mechanics. The corresponding interactions will be dealt with as well, i.e. Gravity in the Minkowskian limit, Electricity without quantized energy, Gravity without quantized energy, Electricity with quantized energy. We pose the problem if the extension of the principle of solidarity to all interactions can impose to consider all variables as dynamic.Comment: 23 pages, Keywords: Axiomatic foundations; mechanics; special relativity; general relativity and quantum mechanics; principle of solidarity; in...
The Elementary Process Theory (EPT) is a collection of seven elementary process-physical principles ...
This paper is an approach to the problem of establishing finite limits and values for mass, energy, ...
In this article I present a new axiomatic algebraic (matrix) approach based on the ring theory (incl...
Written in the tradition of G. Ludwig’s groundbreaking works, this book aims to clarify and formulat...
In present times, Science has become more and more contiguous to philosophy due to the advent of Rel...
Both relativistic mechanics and Newtonian mechanics are based on principles that have ontological im...
The concepts of conservation and relativity lie at the heart of classical mechanics. In the hands of...
The ideology and scheme of physical axiomatics are proposed, the initial postulates and axioms are f...
In general, a physical theory is based on some fundamental principles concerning space, time, matter...
A new approach to theoretical physics, along with the basic formulation of a new MICROSCOPIC MECHANI...
Our main purpose here is to make some considerations about the definability of physical concepts lik...
In the present paper I argue that the formalism of Newtonian mechanics stems directly from the gener...
Quantum mechanics is a mathematical formalism that models the dynamics of physical objects. It deals...
Based on the Bohr's correspondence principle it is shown that relativistic mechanics and quantum mec...
I argue for a full mathematisation of the physical theory, including its axioms, which must contain ...
The Elementary Process Theory (EPT) is a collection of seven elementary process-physical principles ...
This paper is an approach to the problem of establishing finite limits and values for mass, energy, ...
In this article I present a new axiomatic algebraic (matrix) approach based on the ring theory (incl...
Written in the tradition of G. Ludwig’s groundbreaking works, this book aims to clarify and formulat...
In present times, Science has become more and more contiguous to philosophy due to the advent of Rel...
Both relativistic mechanics and Newtonian mechanics are based on principles that have ontological im...
The concepts of conservation and relativity lie at the heart of classical mechanics. In the hands of...
The ideology and scheme of physical axiomatics are proposed, the initial postulates and axioms are f...
In general, a physical theory is based on some fundamental principles concerning space, time, matter...
A new approach to theoretical physics, along with the basic formulation of a new MICROSCOPIC MECHANI...
Our main purpose here is to make some considerations about the definability of physical concepts lik...
In the present paper I argue that the formalism of Newtonian mechanics stems directly from the gener...
Quantum mechanics is a mathematical formalism that models the dynamics of physical objects. It deals...
Based on the Bohr's correspondence principle it is shown that relativistic mechanics and quantum mec...
I argue for a full mathematisation of the physical theory, including its axioms, which must contain ...
The Elementary Process Theory (EPT) is a collection of seven elementary process-physical principles ...
This paper is an approach to the problem of establishing finite limits and values for mass, energy, ...
In this article I present a new axiomatic algebraic (matrix) approach based on the ring theory (incl...