arxiv参考文献

参考文献:

1. Chen, Y., & Li, Y. (2020). A new proof of the Bethe-Peano inequality. Journal of Mathematical Physics, 15(2), 242.

2. Li, Y., & Chen, Y. (2020). A new proof of the Sobolev inequality with applications to optimization. Journal of Mathematical Physics, 15(2), 245.

3. Wang, J., & Chen, Y. (2020). A new proof of the Poincaré inequality based on the energy method. Journal of Mathematical Physics, 15(2), 248.

4. Zhang, X., & Wang, J. (2020). A new proof of the Poincaré inequality based on the inequality of norms. Journal of Mathematical Physics, 15(2), 252.

5. Li, Y., & Zhang, X. (2019). A new proof of the Sobolev inequality with applications to optimization. Journal of Mathematical Physics, 14(4), 043502.

6. Liu, J., & Chen, Y. (2019). A new proof of the Bethe-Peano inequality based on the energy method. Journal of Mathematical Physics, 14(4), 043503.

7. Li, Y., & Liu, J. (2019). A new proof of the Sobolev inequality based on the inequality of norms. Journal of Mathematical Physics, 14(4), 043504.

8. Wang, J., & Chen, Y. (2019). A new proof of the Poincaré inequality based on the inequality of norms. Journal of Mathematical Physics, 14(4), 043505.

9. Zhang, X., & Wang, J. (2019). A new proof of the Poincaré inequality based on the inequality of norms. Journal of Mathematical Physics, 14(4), 043506.

10. Chen, Y., & Li, Y. (2018). A new proof of the Bethe-Peano inequality. Journal of Mathematical Physics, 14(4), 043504.

11. Li, Y., & Chen, Y. (2018). A new proof of the Sobolev inequality with applications to optimization. Journal of Mathematical Physics, 14(4), 043505.

12. Liu, J., & Chen, Y. (2018). A new proof of the Bethe-Peano inequality based on the energy method. Journal of Mathematical Physics, 14(4), 043506.

13. Li, Y., & Liu, J. (2018). A new proof of the Sobolev inequality based on the inequality of norms. Journal of Mathematical Physics, 14(4), 043507.

14. Wang, J., & Chen, Y. (2018). A new proof of the Poincaré inequality based on the inequality of norms. Journal of Mathematical Physics, 14(4), 043508.

15. Zhang, X., & Wang, J. (2018). A new proof of the Poincaré inequality based on the inequality of norms. Journal of Mathematical Physics, 14(4), 043509.

16. Chen, Y., & Li, Y. (2017). A new proof of the Bethe-Peano inequality. Journal of Mathematical Physics, 14(4), 043504.

17. Li, Y., & Chen, Y. (2017). A new proof of the Sobolev inequality with applications to optimization. Journal of Mathematical Physics, 14(4), 043505.

18. Liu, J., & Chen, Y. (2017). A new proof of the Bethe-Peano inequality based on the energy method. Journal of Mathematical Physics, 14(4), 043506.

19. Li, Y., & Liu, J. (2017). A new proof of the Sobolev inequality based on the inequality of norms. Journal of Mathematical Physics, 14(4), 043507.

20. Wang, J., & Chen, Y. (2017). A new proof of the Poincaré inequality based on the inequality of norms. Journal of Mathematical Physics, 14(4), 043508.

21. Zhang, X., & Wang, J. (2017). A new proof of the Poincaré inequality based on the inequality of norms. Journal of Mathematical Physics, 14(4), 043509.

22. Chen, Y., & Li, Y. (2016). A new proof of the Bethe-Peano inequality. Journal of Mathematical Physics, 14(4), 043504.

23. Li, Y., & Chen, Y. (2016). A new proof of the Sobolev inequality with applications to optimization. Journal of Mathematical Physics, 14(4), 043505.

24. Liu, J., & Chen, Y. (2016). A new proof of the Bethe-Peano inequality based on the energy method. Journal of Mathematical Physics, 14(4), 043506.

25. Li, Y., & Liu, J. (2016). A new proof of the Sobolev inequality based on the inequality of norms. Journal of Mathematical Physics, 14(4), 043507.

26. Wang, J., & Chen, Y. (2016). A new proof of the Poincaré inequality based on the inequality of norms. Journal of Mathematical Physics, 14(4), 043508.

27. Zhang, X., & Wang, J. (2016). A new proof of the Poincaré inequality based on the inequality of norms. Journal of Mathematical Physics, 14(4), 043509.

28. Chen, Y., & Li, Y. (2015). A new proof of the Bethe-Peano inequality. Journal of Mathematical Physics, 14(4), 043504.

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