How to transport the energy released in ATP hydrolysis in the biology or protein is a very interesting and important problem. In the 1970s Davydov proposed a soliton mode for it, considering that the Davydov soliton a...How to transport the energy released in ATP hydrolysis in the biology or protein is a very interesting and important problem. In the 1970s Davydov proposed a soliton mode for it, considering that the Davydov soliton arising in protein is due to the vibrational energy of amide-I vibration or the quanta of the intramolecular excitation resulting from the local fluctuation, and deformation of structure caused by the energy released in ATP hydrolysis becomes self-trapped through a coupling between展开更多
In this paper, we study gradient solitons to the Ricci flow coupled with harmonic map heat flow. We derive new identities on solitons similar to those on gradient solitons of the Ricci flow. When the soliton is compac...In this paper, we study gradient solitons to the Ricci flow coupled with harmonic map heat flow. We derive new identities on solitons similar to those on gradient solitons of the Ricci flow. When the soliton is compact, we get a classification result. We also discuss the relation with quasi-Einstein manifolds.展开更多
文摘How to transport the energy released in ATP hydrolysis in the biology or protein is a very interesting and important problem. In the 1970s Davydov proposed a soliton mode for it, considering that the Davydov soliton arising in protein is due to the vibrational energy of amide-I vibration or the quanta of the intramolecular excitation resulting from the local fluctuation, and deformation of structure caused by the energy released in ATP hydrolysis becomes self-trapped through a coupling between
基金supported by NSFC(Grant No.11171143)Zhejiang Provincial Natural Science Foundation of China(Project No.LY13A010009 and LY14A010021)supported by the Fonds National de la Recherche Luxembourg(OPEN Project GEOMREV)
文摘In this paper, we study gradient solitons to the Ricci flow coupled with harmonic map heat flow. We derive new identities on solitons similar to those on gradient solitons of the Ricci flow. When the soliton is compact, we get a classification result. We also discuss the relation with quasi-Einstein manifolds.