Conclusion It is indicated that the expression of E2F1 is increased in the hypertrophic scar and keloid. E2F1 overexpression may play an important role in the proleferation of fibroblasts and in the development of pathological scar.
Conclusion:It is suggested that some relations exist between β-1,4-GalT-I and the aging of Schwann cells,and that may play an important role in regulating the proliferation of Schwann cells in peripheral nerves.
In the conclusion it is argued that propulsion based on the Orion concept only is not the best method for interplanetary travel owing to the very large number of nuclear explosion required.
In conclusion it is pointed out that a particular case of the presented proof yields a Tychonoff property criterion for Lie groups.
Conclusion It is concluded that religious delusions are commonly found in schizophrenia and that by comparison with other patients who have schizophrenia, those patients with religious delusions appear to be more severely ill.
Conclusion It seems that Nebivolol in these hyperreactive patients is as safe as placebo despite its significant effect on blood pressure and pulse rate.
As a conclusion it is deduced that the term "anti-infective vitamin" does not hold absolutely true for vitamin A, although certain anti-infective properties cannot be denied.
In the second example, we obtain a proof of the Chalyh-Veselov conjecture that the Calogero-Moser system with integer parameter is algebraically integrable, using the results of Felder and Varchenko.
As an application of the results we prove a generalization of Chevalley's restriction theorem for the classical Lie algebras.
We apply these results to intersection theory on varieties with group actions, especially to Schubert calculus and its generalizations.
In this paper, we prove three types of rigidity results related to CAT(-1) spaces, namely the rigidity of the isometric actions on CAT(-1) spaces under the commensurability subgroups, the higher rank lattices and certain ergodic cocycles.
This extends the results and simplifies the proof for the classical orbit structure description of  and , which applies whenF=Z.