Add to ORKGNoether’s Theorem relates the Action Integral of a Lagrangian with symmetries which leave it invariant and the first integrals consequent upon the variational principle and the existence of the symmetries. These each have an equivalent in the Schrödinger Equation corresponding to the Lagrangian and by extension to linear evolution equations in general. The implications of these connections are investigated
Internal global symmetries exist for the free non-relativistic Schrodinger particle, whose associate...
We extend the second Noether theorem to optimal control problems which are invariant under symmetrie...
The constants of motion of a mechanical system with a finite number of degrees of freedom are relate...
Noether’s Theorem relates the Action Integral of a Lagrangian with symmetries which leave it invaria...
It is argued that awareness of the distinction between dynamical and variational symmetries is cruci...
Noether theorem plays a central role in linking symmetries and first integrals in Lagrangian mechani...
In Noether's original presentation of her celebrated theorem of 1918, allowances were made for the d...
International audienceThe Noether theorem connecting symmetries and conservation laws can be applied...
Internal global symmetries exist for the free non-relativistic Schrodinger particle, whose associate...
Noether’s theorem, named for early twentieth century German mathematician Emmy Noether, is an import...
Noether’s theorem, named for early twentieth century German mathematician Emmy Noether, is an import...
This paper provides a modern presentation of Noether's theory in the realm of classical dynamics, wi...
This paper deals with conservation laws for mechanical systems with nonholonomic constraints. It use...
This paper deals with conservation laws for mechanical systems with nonholonomic constraints. It use...
A common calculus problem is to find an input that optimizes (maximizes or minimizes) a function. An...
Internal global symmetries exist for the free non-relativistic Schrodinger particle, whose associate...
We extend the second Noether theorem to optimal control problems which are invariant under symmetrie...
The constants of motion of a mechanical system with a finite number of degrees of freedom are relate...
Noether’s Theorem relates the Action Integral of a Lagrangian with symmetries which leave it invaria...
It is argued that awareness of the distinction between dynamical and variational symmetries is cruci...
Noether theorem plays a central role in linking symmetries and first integrals in Lagrangian mechani...
In Noether's original presentation of her celebrated theorem of 1918, allowances were made for the d...
International audienceThe Noether theorem connecting symmetries and conservation laws can be applied...
Internal global symmetries exist for the free non-relativistic Schrodinger particle, whose associate...
Noether’s theorem, named for early twentieth century German mathematician Emmy Noether, is an import...
Noether’s theorem, named for early twentieth century German mathematician Emmy Noether, is an import...
This paper provides a modern presentation of Noether's theory in the realm of classical dynamics, wi...
This paper deals with conservation laws for mechanical systems with nonholonomic constraints. It use...
This paper deals with conservation laws for mechanical systems with nonholonomic constraints. It use...
A common calculus problem is to find an input that optimizes (maximizes or minimizes) a function. An...
Internal global symmetries exist for the free non-relativistic Schrodinger particle, whose associate...
We extend the second Noether theorem to optimal control problems which are invariant under symmetrie...
The constants of motion of a mechanical system with a finite number of degrees of freedom are relate...