In differential geometry, the Lie derivative /ˈliː/, named after Sophus Lie by Władysław Ślebodziński, evaluates the change of a tensor field… (More)

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2016

2016

- Chaojie Li, Xinghuo Yu, Tingwen Huang, Guo Chen, Xing He
- IEEE Transactions on Neural Networks and Learning…
- 2016

This paper proposes a generalized Hopfield network for solving general constrained convex optimization problems. First, the… (More)

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2009

2009

The motivation behind mathematically modeling the human operator is to help explain the response characteristics of the complex… (More)

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2008

2008

- Christian Duval
- 2008

The space of linear differential operators on a smooth manifold M has a natural one-parameter family of Diff(M) (and Vect(M… (More)

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2007

2007

- Artur Sergyeyev
- 2007

We show that under minor technical assumptions any weakly nonlocal Hamiltonian structures compatible with a given nondegenerate… (More)

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Review

2005

Review

2005

- Marco Godina, Paolo Luciano Matteucci
- 2005

Starting from the general concept of a Lie derivative of an arbitrary differentiable map, we develop a systematic theory of Lie… (More)

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2002

2002

- Marco Godina, Paolo Luciano Matteucci
- 2002

Reductive G-structures on a principal bundle Q are considered. It is shown that these structures, i.e. reductive G-subbundles P… (More)

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2002

2002

- Tomás Ort́ın
- 2002

The definition of “Lie derivative” of spinors with respect to Killing vectors is extended to all kinds of Lorentz tensors. This… (More)

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1997

1997

- Jarmo Hietarinta
- 1997

Takhtajan has recently studied the consistency conditions for Nambu brackets, and suggested that they have to be skew-symmetric… (More)

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1996

1996

- Lorenzo Fatibene, Marco Ferraris, Mauro Francaviglia, Marco GODINA
- 1996

Relying on the general theory of Lie derivatives a new geometric deenition of Lie derivative for general spinor elds is given… (More)

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1995

1995

Relying on the general theory of Lie derivatives a new geometric definition of Lie derivative for general spinor fields is given… (More)

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