Add to ORKGWe consider two theorems formulated in the derivation of the Quantum Hamilton-Jacobi Equation from the EP. The first one concerns the proof that the cocycle condition uniquely defines the Schwarzian derivative. This is equivalent to show that the infinitesimal variation of the stress tensor "exponentiates" to the Schwarzian derivative. The cocycle condition naturally defines the higher dimensional version of the Schwarzian derivative suggesting a role in the transformation properties of the stress tensor in higher dimensional CFT. The other theorem shows that energy quantization is a direct consequence of the existence of the quantum Hamilton-Jacobi equation under duality transformations as implied by the EP
We show that if space is compact, then trajectories cannot be defined in the framework of the quantu...
We study the quantum Hamilton-Jacobi (QHJ) equation of the recently obtained exactly solvable models...
27 pages, 2 figuresA quantum integrable model is considered which describes a quantization of affine...
We consider two theorems formulated in the derivation of the Quantum Hamilton-Jacobi Equation from t...
We consider two theorems formulated in the derivation of the Quantum Hamilton-Jacobi Equation from t...
We consider two theorems formulated in the derivation of the Quantum Hamilton-Jacobi Equation from t...
We consider the two main theorems in the derivation of the Quantum Hamilton--Jacobi Equation from th...
In this thesis we analyze an interesting recurrent pattern of symmetry-induced emergence of the Schw...
We show that the quantum Hamilton-Jacobi equation can be written in the classical form with the spat...
We show that the recently formulated equivalence principle (EP) implies a basic cocycle condition bo...
A basic aspect of the recently proposed approach to quantum mechanics is that no use of any axiomati...
We study how the classical Hamilton's principal and characteristic functions are generated from the ...
An important aspect of multi-scale modelling of materials is to link continuum concepts, such as fie...
We show that if space is compact, then time cannot be defined by Jacobi's theorem in the quantum Ham...
We investigate two methods of constructing a solution of the Schr\"{o}dinger equation from the canon...
We show that if space is compact, then trajectories cannot be defined in the framework of the quantu...
We study the quantum Hamilton-Jacobi (QHJ) equation of the recently obtained exactly solvable models...
27 pages, 2 figuresA quantum integrable model is considered which describes a quantization of affine...
We consider two theorems formulated in the derivation of the Quantum Hamilton-Jacobi Equation from t...
We consider two theorems formulated in the derivation of the Quantum Hamilton-Jacobi Equation from t...
We consider two theorems formulated in the derivation of the Quantum Hamilton-Jacobi Equation from t...
We consider the two main theorems in the derivation of the Quantum Hamilton--Jacobi Equation from th...
In this thesis we analyze an interesting recurrent pattern of symmetry-induced emergence of the Schw...
We show that the quantum Hamilton-Jacobi equation can be written in the classical form with the spat...
We show that the recently formulated equivalence principle (EP) implies a basic cocycle condition bo...
A basic aspect of the recently proposed approach to quantum mechanics is that no use of any axiomati...
We study how the classical Hamilton's principal and characteristic functions are generated from the ...
An important aspect of multi-scale modelling of materials is to link continuum concepts, such as fie...
We show that if space is compact, then time cannot be defined by Jacobi's theorem in the quantum Ham...
We investigate two methods of constructing a solution of the Schr\"{o}dinger equation from the canon...
We show that if space is compact, then trajectories cannot be defined in the framework of the quantu...
We study the quantum Hamilton-Jacobi (QHJ) equation of the recently obtained exactly solvable models...
27 pages, 2 figuresA quantum integrable model is considered which describes a quantization of affine...