Recurrent oral ulceration,which is small but not easy to cure,seriously affects the quality of life of the patients.This paper analyzes professor Wang Xiaoyan's application of Yinhuotanghuacai to treat oral ulcer ...Recurrent oral ulceration,which is small but not easy to cure,seriously affects the quality of life of the patients.This paper analyzes professor Wang Xiaoyan's application of Yinhuotanghuacai to treat oral ulcer with floating of yang in deficiency condition,which can significantly improve the clinical symptoms of patients and improve the quality of life of patients.展开更多
In the present paper, we study the boundary concentration-breaking phenomena on two thermal insulation problems considered on Lipschitz domains, based on Serrin's overdetermined result, the perturbation argument, ...In the present paper, we study the boundary concentration-breaking phenomena on two thermal insulation problems considered on Lipschitz domains, based on Serrin's overdetermined result, the perturbation argument, and a comparison of Laplacian eigenvalues with different boundary conditions. Since neither of the functionals in the two problems is C^(1), another key ingredient is to obtain the global H?lder regularity of minimizers of both problems on Lipschitz domains. Also, the exact dependence on the domain of breaking thresholds is given in the first problem, and the breaking values are obtained in the second problem on ball domains, which are related to 2π in dimension 2.展开更多
文摘Recurrent oral ulceration,which is small but not easy to cure,seriously affects the quality of life of the patients.This paper analyzes professor Wang Xiaoyan's application of Yinhuotanghuacai to treat oral ulcer with floating of yang in deficiency condition,which can significantly improve the clinical symptoms of patients and improve the quality of life of patients.
基金supported by National Natural Science Foundation of China (Grant Nos. 11625103 and 12171144)Hunan Science and Technology Planning Project (Grant No. 2019RS3016)+3 种基金supported by the National Natural Science Fund for Youth Scholars (Grant No. 12101215)Scientific Research Start-Up Funds by Hunan Universitysupported by the National Natural Science Fund for Youth Scholars (Grant No. 12101216 )the Natural Science Fund of Hunan Province (Grant No. 2022JJ40030)。
文摘In the present paper, we study the boundary concentration-breaking phenomena on two thermal insulation problems considered on Lipschitz domains, based on Serrin's overdetermined result, the perturbation argument, and a comparison of Laplacian eigenvalues with different boundary conditions. Since neither of the functionals in the two problems is C^(1), another key ingredient is to obtain the global H?lder regularity of minimizers of both problems on Lipschitz domains. Also, the exact dependence on the domain of breaking thresholds is given in the first problem, and the breaking values are obtained in the second problem on ball domains, which are related to 2π in dimension 2.
