Add to ORKGThe gauge bundle of the 4-dim conformal group over an 8-dim base space, called biconformal space, is shown have a consistent interpretation as a scale-invariant phase space. Specifically, we show that a classical Hamiltonian system generates a differential geometry which is necessarily biconformal, and that the classical Hamiltonian dynamics of a point particle is equivalent to the specification of a 7-dim hypersurface in flat biconformal space together with the consequent necessary existence of a set of preferred curves. The result is centrally important for establishing the physical interpretation of conformal gauging
We give an explicit example of a model in D=4-ε space-time dimensions that is scale but not conforma...
AbstractWe give an explicit example of a model in D=4−ϵ space–time dimensions that is scale but not ...
Biconformal gauging of the conformal group gives a scale-invariant volume form, permitting a single ...
The gauge bundle of the 4-dim conformal group over an 8-dim base space, called biconformal space, is...
A new 8-dimensional conformal gauging avoids the unphysical size change, third order gravitational f...
We write a gravity theory with Yang–Mills-type action using the biconformal gauging of the conformal...
We consider the conformal group of a space of dim n=p+q, with SO(p,q) metric. The quotient of this g...
The quotient of the conformal group of Euclidean 4-space by its Weyl subgroup results in a geometry ...
Cartan geometry provides a rich formalism from which to look at various geometrically motivated exte...
This dissertation consists of two parts. In the first, we study the possibility of recurrent traject...
A discussion is given of recent developments in canonical gravity that assimilates the conformal ana...
Gravity theories based on the conformal group give general relativity augmented by local dilatationa...
A new eight-dimensional conformal gauging solves the auxiliary field problem and eliminates unphysic...
Conformal theories in a d dimensional spacetime may be expressed as manifestly conformal theories in...
Scale-invariant actions are investigated in curved space to clarify the relation between scale-, Wey...
We give an explicit example of a model in D=4-ε space-time dimensions that is scale but not conforma...
AbstractWe give an explicit example of a model in D=4−ϵ space–time dimensions that is scale but not ...
Biconformal gauging of the conformal group gives a scale-invariant volume form, permitting a single ...
The gauge bundle of the 4-dim conformal group over an 8-dim base space, called biconformal space, is...
A new 8-dimensional conformal gauging avoids the unphysical size change, third order gravitational f...
We write a gravity theory with Yang–Mills-type action using the biconformal gauging of the conformal...
We consider the conformal group of a space of dim n=p+q, with SO(p,q) metric. The quotient of this g...
The quotient of the conformal group of Euclidean 4-space by its Weyl subgroup results in a geometry ...
Cartan geometry provides a rich formalism from which to look at various geometrically motivated exte...
This dissertation consists of two parts. In the first, we study the possibility of recurrent traject...
A discussion is given of recent developments in canonical gravity that assimilates the conformal ana...
Gravity theories based on the conformal group give general relativity augmented by local dilatationa...
A new eight-dimensional conformal gauging solves the auxiliary field problem and eliminates unphysic...
Conformal theories in a d dimensional spacetime may be expressed as manifestly conformal theories in...
Scale-invariant actions are investigated in curved space to clarify the relation between scale-, Wey...
We give an explicit example of a model in D=4-ε space-time dimensions that is scale but not conforma...
AbstractWe give an explicit example of a model in D=4−ϵ space–time dimensions that is scale but not ...
Biconformal gauging of the conformal group gives a scale-invariant volume form, permitting a single ...