Add to ORKGWe derive both Lagrangian and Hamiltonian mechanics as gauge theories of Newtonian mechanics. Systematic development of the distinct symmetries of dynamics and measurement suggest that gauge theory may be motivated as a reconciliation of dynamics with measurement. Applying this principle to Newton\u27s law with the simplest measurement theory leads to Lagrangian mechanics, while use of conformal measurement theory leads to Hamiltonian mechanics.PACS Nos.: 45.20.Jj, 11.25.Hf, 45.10.–b [ABSTRACT FROM AUTHOR
An elementary mechanical example is discussed in which the appearance of the easiest inertial force ...
We describe the connection between continuous symmetries and conservation laws in classical mechanic...
Mathematically, gauge theories are extraordinarily rich --- so rich, in fact, that it can ...
We derive both Lagrangian and Hamiltonian mechanics as gauge theories of Newtonian mechanics. System...
We derive both Lagrangian and Hamiltonian mechanics as gauge theories of Newtonian mechanics. System...
We argue that Hamiltonian mechanics is more fundamental than Lagrangian mechanics. Our argument prov...
Absolute space is eliminated from the body of mechanics by gauging translations and rotations in the...
The gauge bundle of the 4-dim conformal group over an 8-dim base space, called biconformal space, is...
This article discusses and explains the Hamiltonian formulation for a class of simple gauge invarian...
Change seems missing in Hamiltonian General Relativity's observables. The typical definition takes ...
This article commemorates three distinct periods in the growing understanding of physics of motion d...
Like moths attracted to a bright light, philosophers are drawn to glitz. So in discussing the notion...
This paper suggests a fresh look at gauge symmetries, with the aim of drawing a clear line between ...
Unfortunately, the Hamiltonian mechanics of degenerate Lagrangian systems is usually presented as a ...
1 Why a fixed law of dynamics for each system? $O$ne of the implicit but standard preconceptions in ...
An elementary mechanical example is discussed in which the appearance of the easiest inertial force ...
We describe the connection between continuous symmetries and conservation laws in classical mechanic...
Mathematically, gauge theories are extraordinarily rich --- so rich, in fact, that it can ...
We derive both Lagrangian and Hamiltonian mechanics as gauge theories of Newtonian mechanics. System...
We derive both Lagrangian and Hamiltonian mechanics as gauge theories of Newtonian mechanics. System...
We argue that Hamiltonian mechanics is more fundamental than Lagrangian mechanics. Our argument prov...
Absolute space is eliminated from the body of mechanics by gauging translations and rotations in the...
The gauge bundle of the 4-dim conformal group over an 8-dim base space, called biconformal space, is...
This article discusses and explains the Hamiltonian formulation for a class of simple gauge invarian...
Change seems missing in Hamiltonian General Relativity's observables. The typical definition takes ...
This article commemorates three distinct periods in the growing understanding of physics of motion d...
Like moths attracted to a bright light, philosophers are drawn to glitz. So in discussing the notion...
This paper suggests a fresh look at gauge symmetries, with the aim of drawing a clear line between ...
Unfortunately, the Hamiltonian mechanics of degenerate Lagrangian systems is usually presented as a ...
1 Why a fixed law of dynamics for each system? $O$ne of the implicit but standard preconceptions in ...
An elementary mechanical example is discussed in which the appearance of the easiest inertial force ...
We describe the connection between continuous symmetries and conservation laws in classical mechanic...
Mathematically, gauge theories are extraordinarily rich --- so rich, in fact, that it can ...