[2] Chen Ji, Generalization of El duis-Modier Inequality, Mathematical Communication, 1984 1 period (total period 149), 27-3 1. [3] Chen Ji, Generalization of Fermat Inverse Problem, Mathematical Communication, 65438. Supplement to Kummer Discriminant Method, Engineering Mathematics, 1984 No.2 (No.2 in total), 55-56. [5] Chen Ji, the generalization of Zhu's inequality, middle school mathematics teaching reference, No.3 1985 (No.77 in total), 15. [6] 1986 1,15-16,26. [7] Chen Ji, Generalization of Hardy Inequality, Research on Mathematics Teaching, No.4, 1986 (total No.1 16), 34. [1987 No.3 (10), 57-60. [9] Chen Ji, Luo, discussion on several conjectures, Journal of Yuxi Teachers College (Comprehensive Edition), No.6 1987 (No.3). Mathematical Newsletter, No.6 (No.0/987), 7. [1 1] Chen Ji, Exponential Extension and Application of Heron Formula, Mathematical Communication,No. 1987 (No.65438) Chen Ji, Notes on Some New Inequalities, Journal of Chengdu University (Natural Science Edition), 1988No./kloc. [13] Chen Ji, Lin, on the generalization of several mean inequalities, Chengdu University. 75-76. [1 4] Chen Ji, He, Inequalities involving two triangles, mathematical communication, 19881period (total 197), 3-4. [15] Chen Ji, Shu Hai. 1988 No.3 (199), 7-8. [16] Chen Ji,, Quadrilateral Generalization of Neuberg-Pedoe Inequality, Mathematical Communication, No.5 (No.201). A Proof of Garfunkel-Bankoff Inequality, Mathematical CommunicationNo. 10 (No.206), pp. 7-8. [18] Chen Ji, Exponential Generalization of Barrow-Lehnhard Inequality, Mathematical Communication,No. 1988. 7-8.[ 19] Chen Ji, Heron mean and power mean inequality, Hunan Mathematics Exchange, 1988 No.2 (No.43 in total), 15- 16. [20], Wang Zhen, Power Mean and Heron Mean Inequality, Mathematics, Vol. 14 (1988), No.4, pp. 97-99. [2 1] Chen Ji, Generalization of Mitrinovic-Djokovic Inequality, Mathematics Teaching in Middle Schools (Shanghai), 1988 No.4,18,35. [22] Chen Ji, Zhang, Fenlieerhard Wigel Inequality, Research on Mathematics Teaching, 1988 No.5 (No.27 in total, pp.26-27). [23] Wang Wanlan, Li Guangxing, Chen Ji, some inequalities about the ratio of the average, Journal of Chengdu University of Science and Technology, No.6 (No.42 in total),1988,83-88. [24] Zhang Zaiming, Chen Ji, Liu Jingou, a proof of Woodall inequality, Liupanshui Branch. 86-87.[25] Chen Ji, Liu Jingou, on the first few Heilbronn numbers of circular regions, Journal of Ningbo University (Science and Technology Edition), 1989No. 1 (No.3 in total), pp. 6-9. [26] Chen Ji, the generalization of Mitrinovic-Djokovic inequality. 1989,No. 1 3,115-117. [27] Chen Ji, Li Guangxing, Strengthening Erdos-florian Inequality, Journal of Ningbo University (Science and Technology Edition) 12- 14. [28] Jeffery Ji, a generalization of Oppenheim area inequality of triangle, Crux Mathematicorum, Vol. 15 (1989),No. 1, 1-3. [29] Jeffery Ji, Wang Zhen, a generalization of Lenhard inequality, Crux Mathematicorum, Vol. 15 (1989), No.9, 257-259. Chen Ji, A Class of Inequalities Involving Two Simplex, Mathematical Research and Review, Vol.9 (1989), No.2, 282-284; China's Geometric Inequalities, Jiangsu Education Press, 1st edition,1996,397-400. [3 1] Chen Ji, Li Guangxing, Inequalities in Polygons, Hunan Mathematics Communication, 1989, No.3 (50 issues in total), 32-33. [32 1989 No.4 (No.51), 37-39. [33] Chen Ji, Generalization of Lamkin Inequality, Research on Mathematics Teaching, No.4 (No.32), 2-3 pages. [34] Li Wenzhi, 1989 No.4 (total 12), 13- 15. [35] Chen Ji, conjecture about Erdos and Fejestos, Mathematical Communication, No.5 (No.265438 in total), Popularization and Application of Barrow-oppenheim Inequality, Mathematical Communication, No.6, 1989 (No.214 in total), 3. [37] Chen Ji, Gao Haiming, extension and strengthening of a problem-solving method, Mathematical Communication No.8, 1989 (No.265438 in total), Liu Jingou, Exponential Extension of Catalan Inequality, Mathematical Communication, 1989. Chen Ji, Exponential Generalization of Gugenheimer Inequality, Mathematical Communication, 1989,No. 12. 3.[40] Jeffery Ji, Paul Hu, Ky Fan-type inequality of identity mean and power mean, Journal of University (Nis), series: Mathematics and Informatics, 4 (1989), 9- 12. [4 1] Wang Zhen, Chen Ji, Generalization of Ky Fan Inequality, Journal of Ningbo University (Science and Technology Edition), 65438+ 1990. 23-26.[42], Chen Ji, Ky, Fan's inequality on Heron mean and power mean, Journal of Ningbo University (Science and Technology Edition), 1990 No.2 (No.6 in total), pp. 32-35. [43] Chen Ji, on the lower bound of logarithmic mean, Journal of Chengdu University of Technology, 65433. 100- 102.[44] Liu Qiming, Chen Ji, on the generalization of Beckenbach inequality, Journal of Chengdu University of Technology, 1990, No.2 (No.50 in total),117-/kloc. Elementary proof of a theorem about unit fraction, Journal of Chengdu University of Science and Technology, No.2 (No.50 in total), 1 19- 123. [46] Chen Ji, Deformation of Markovsky-Beukes Inequality, Research on Mathematics Teaching, 123. 34.[47] Chen Ji, Weighted Generalization of Padoa Inequality (Research Communication 2), Hunan Mathematical Communication, 1990 No.3 (No.56 in total), 40. [48] Wang Zhen, Chen Ji, the maximum area of an n(≥5) polygon can't be expressed by the radical formula of side length, Journal of Chengdu University (Nature) 199 1, p. 1, pp. 38-42. [49] Chen Ji, Generalization of Oppenheim Inequality on Polygon Area, Journal of Ningbo University (Science and Technology Edition),No. 19 1 issue (total) Pecaric, Volence, Chen Ji, Addendum to the monograph "New Progress in Geometric Inequalities" (1), Journal of Ningbo University (Science and Technology) (Pricing: 3.00 yuan. On Erdos-Mo Deer inequality, Mathematical Communication No.7 199 1 (No.240th in total), 28-29. [52] Chen Ji, Elementary Proof of Unary Inequality, Mathematical Communication,No. 19 1 period. 14.[53] Chen Ji, Preface to the Chinese Version of Geometric Inequalities, Peking University Publishing House, first edition in September, 199 1, 1-2. (Pricing: 3.20 yuan) [54] A generalization of the inequality of Zhen Wang, Jeffery Ji and Ky Fan, mathematics. Balkany card, 5 (199 1), 373-380. [55] Chen Ji, Strengthening the Bencze Inequality, Journal of Suzhou Institute of Education (Natural Science Edition), 1992 No.28, 37-38,40. [56] Chen Ji, A Proof of Analytic Inequality, Journal of Ningbo University (Science and Technology Edition), 1992 No.2 (No.1 10). Calculation of Steinhaus circle with k≤ 10 degree, Journal of Ningbo University (Science and Technology Edition), 192 No.2 (Total No.0/0), Chen Ji, On the generalization of Kooistra inequality, Journal of Chengdu University (Natural Science Edition) 43-46,/kloc-0. [59], Chen Ji, Generalization of Mitrinovic-Jakovic Inequality (English), Mathematics Quarterly, 1992, No.4, 95-99. [60] Chen Ji, 10th anniversary of the death of Professor Edwin Ford Beckenbach, 1992 No.5 (No.42 in total), 34-35 pages. [6 1] Chen Ji, On the Strengthening of Gerber Inequality, Mathematics in Fujian Middle School, Vol.5 (No.75), pp.8-9. Chen Ji, Janous. 1992 No.6 (76 in total), No.8-9. [63] Chen Ji, Review of Geometric Inequalities, Mathematical Communication, 1992 No.5, (No.250 in total), 40. [64] Chen Ji, simple proof of Janous conjecture, mathematical communication. 16- 17.[65] Chen Ji, some views on the pre-selected topic 2 provided by Thailand for 3 1 IMO, Mathematical Communication, 1992,No. 10 (255 in total), 39-. [66] 1992 No.6 (No.71), 27, 7. [67] Chen Ji, Strengthening a Triangle Inequality, Middle School Mathematics (Wuhan), 1992 No.8 (No.1 126), 23-24 pages. 1992 10 (128), 33. [69] Chen Ji, two newly discovered trigonometric inequalities, Middle School Mathematics (Wuhan), 1992No. 12 (130) Middle School Mathematics (Suzhou), 1992, 10 (Suzhou). [7 1] Chen Ji, inequality family of triangle, middle school teaching and research (mathematical edition),No. 1992. A New Trigonometric Inequality, Middle School Teaching and Research (Mathematical Edition),No. 1992 (No.14 1 period), 23-24. [73] Chen Ji, Neuberg-Pedoe Inequality and Oppenheim Inequality, Selected Papers on Elementary Mathematics. 1992 10 first edition, 303-334. (Pricing: 10.00 yuan) [74] Chen Ji, Extension of Erdos-Ke Lamkin Inequality (English), Journal of Ningbo University (Science and Technology Edition), 1993 No.653.98-100. [75], Chen Ji, elementary proof of OYZ inequality, Journal of Ningbo University (Science and Technology Edition), No.2 (total No.1 12), 25-27. [76] Wang Zhen, Chen Ji, bisector of triangle angle. 1993No. 1 (total 142), 34-36. [77] Chen Ji, On the Strengthening of a Triangle Inequality and Others, Middle School Teaching and Research (Mathematical Edition), No.7 1993 (No.48 in total) 1993. 1 1 (total number152),15-17. [79] He, Chen Ji, N-point problem in plane convex graph, middle school teaching and research (mathematical edition), 65438. 23-24.[80] Chen Ji, Strengthening of a Triangular Inequality, Mathematical Communication, 1993 1 period (No.258 in total), 22-23. [8 1] Chen Ji, from garfinkel conjecture, mathematical communication, 65438+. Two new trigonometric inequalities, Shanghai Middle School Mathematics, 1993 Volume II, 37-38. [83] Chen Ji, A New Triangle Inequality Chain, Middle School Mathematics (Wuhan), 1993 No.2 (total No.0/32), 2,22. [1993 No.8 (total 138), 26-27. [85] Wang Zhen, Chen Ji, another generalization of Mitrinovic-Jakovic inequality (English), Mathematics Quarterly, 1993 No.3, 108. Inequality between generalized Heron mean and power mean, Journal of Chengdu University (Natural Science Edition), No.4, 1993 (No.28 in total), 6-8. [87] Wang Zhen, Chen Ji, Strengthening a Triangle Inequality (Research Brief 40), Hunan Mathematical Exchange, No.6, 1993 (Total) Discussion on a Geometric Inequality (1), Fujian Middle School Mathematics, No.6, 1993 (Total No.82) [89] Chen Ji, the first few calculations of Heilbronn number, Fujian Elementary Mathematics Research Collection, Fujian Education. 49-53. (Pricing: 4.20 yuan) [90] Chen Ji, Paradigm Inequality between the Mean and Power Mean of Ky Exponent, Fujian Elementary Mathematics Research Collection, Fujian Education Press, 1st edition in July,1993,53-56. [9 1] Jeffery Ji, Xie Zhiyang. On the relationship between A. Zirakzadeh inequality and inscribed triangle. Public library. Elektrotehn。 Fak。 , jazz. :Mat。 , 4 (1993), 25-27.[92] Chen Ji, the inverse of an analytic inequality, Journal of Ningbo University (Science and Technology Edition), 1994No. 1 issue (totalNo. 13 issue),/kl [93] 1994 No.2 (No.14), 10- 15. Chen Ji, Cotangent and Improvement of Lower Bound, Mathematics of Fujian Middle School,No. 1994 (No.83). 1994No. 1 (78 in total), 44-45. [96] Baron, Chen Ji, Refinement of a Triangle Inequality Chain (Research Newsletter No.56), Hunan Mathematics Newsletter, 1994 No.5 (No.82 in total), 44-45 pages. 1994No. 1 (270 in total), 33-34. Chen Ji, Tetrahedral Generalization of Neuberg-Pedoe Inequality, Mathematical Communication, No.2 (total No.271period), 22-. 1994 No.6 (275 in total), 22. [100] Chen Ji, Refinement of Two Triangular Inequalities (topic abstract), Mathematical Communication, 1994 No.6 (No.275 in total), 22-23. [65438] 1994No. 10 of 279, 25-26. [102] Chen Qi, Chen Ji, convex graph and covering problem, middle school mathematics (Wuhan), 1994 No.3 (total No.0/45) middle school mathematics teaching (Hefu), 1994 No.6 (total No.90). [104] Wang Zhen, Chen Ji, Strengthening two conjectural inequalities, etc., Middle School Teaching and Research (Mathematical Edition), No.7-8 (1994), Another Proof of a Geometric Inequality, Junior Middle School Students' Mathematics Learning, No.7-8,117. [106] Wang Zhen, Chen Ji, from Putnam Competition. 1994 first edition, 27-32. (Pricing: 2.70 yuan) [107] Chen Ji, Starting from the distance of the center of a triangle, mathematical competition, series 19, Hunan Education Press, 1994 first edition, 82-. Perfection of a triangular inequality family, mathematical competition, series 2 1, Hunan Education Press, April 1st edition 105- 1 12. (Pricing: 2.70 yuan) [109] Wang Zhen. 1995No. 1 (total 15), 70-72. [1 10] Chen Ji, Matrix Similarity of Some Analytic Inequalities, Journal of Ningbo University (Science and Technology Edition), 1995 No.3.21-26. [11] Shi Shichang, Chen Ji, separation and application of ternary quadratic symmetric average to power average, Journal of Chengdu University (Natural Science Edition), 1995 No.2 (No.34 in total), 2-8. Generalization of Garfunkel-Kuczma cyclic inequality, Anhui Institute of Education (Natural Science Edition), 1995 No.2 (No.62 in total), 8- 10. [1 13] Chen Ji, an inequality about triangles, Middle School Mathematics (Wuhan), 66. 34. [114] Chen Ji, on the inequality of tangent radius of a quadrilateral, Mathematics of Fujian Middle School, 1995 No.3 (89 in total),11. [168] Hunan Mathematical Yearbook (Special Issue of International Olympic Mathematics), Volume 15 (1995), No.4 (Summary No.32), pp. 3-5. [1 16] Chen Ji, on the vertical triangle of the triangle center of gravity, Hunan Mathematical Yearbook (International Olympiad) No.4 (Summary No.32), 42-44. [1 17] Chen Ji, Several Ky Fan Inequalities, Hunan Mathematical Exchange, 1995, No.5 (88 in total), 30-32. [16548].1995 No.9 (290 in total), 28-29. [1 19] Chen Ji, Denton, the generalization of an angular bisector inequality, mathematical communication, 1995 th1period (. An inequality about acute triangle, excellent thesis of China middle school mathematics teachers (Volume II), Guizhou Education Press, first edition in May, 1995, 177- 178. (Pricing: 8.80 yuan) [12 1] Zhen Wang. Another generalization of Mitrinovic-Dokovich inequality. Public library. Elektrotehn。 Fak。 , jazz. :Mat。 , 6 (1 995), 25-28. [122] Chen Ji, Strengthening an inequality about tetrahedron, Middle School Mathematics Teaching (Hefei), 1996No.1issue (97 in total), 36. [123] Chen Ji, some estimates about the center line (research brief), Hunan Mathematical Communication, 1996 No.65438. Simple proof of Oppenheim inequality, mathematical research and comments, vol. 16 (1996), p. China's Geometric Inequalities, Jiangsu Education Press, 1 September 1996, version1,2 13-2 17. [125] Chen Ji, Pang Huomao, Chen Congjie, triangle formed by angular bisector, mathematical exchange, 1996. 29-3 1.[ 126] Chen Qi, Chen Ji, An Inequality Chain with Triangle Radius, Outstanding Essays of Middle School Mathematics Teachers in China (Volume III), Inner Mongolia People's Publishing House, 1st edition in March,1996,95-96. (Pricing: 10. Generalization of complementary Ky Fan inequality, Frontiers of Elementary Mathematics (I), Jiangsu Education Press, April 1 Edition, 1996, 56-69. (Pricing: 13.60 yuan) [128] Wang Zhen, Chen Ji, the generalization of Zadeh inequality in Czirak, the frontier of elementary mathematics. 1996 first edition in April, 104- 1 1. [129] Wang, Chen Ji, Foreword, Frontiers of Elementary Mathematics (the first series), Jiangsu Education Press, 65438. Chen Congjie, Linear Inequalities and Geometric Inequalities in Triangle, China, Jiangsu Education Press, the first 1 edition, September, 1996, 87- 1 10. (Pricing: 13.40 Yuan) [13 1] Chen Ji. The first edition in September, 1996,11-121. [132] Wang Zhen, Jeffery Ji, the generalization of light and norm inequality, Belgrade University. Public library. Elektrotehn。 Fak。 , jazz. :Mat。 , 7 (1 996), 9-17. [133] Chen Ji, Pang Huomao, Improvement of the Third Diagram of Bagg, Journal of Ningbo University (Science and Technology Edition) 1997,No.1(No. [134], improvement of the fourth diagram of Chen Ji, Sheng and Bage, Journal of Ningbo University (Science and Technology Edition), 650. Improvement of Bagh's Fifth Diagram, Journal of Ningbo University (Science and Technology Edition), No.4 (No.26 in total) 1997, 49-55. [136] Chen Ji, Generalization and Strengthening of a Triangle Inequality, Journal of Chengdu University (Natural Science Edition), 1998. 1-5.[ 137] Chen Ji, Xia, and the perfection of the sixth picture of bagger, Journal of Ningbo University (Science and Technology Edition), No.3 (No.29 in total), 52-56. [138] Journal of Sichuan University (Natural Science Edition), 1999 No.2 (total No.0/28), 197-200. [139] Xu, Chen Ji, Different distances between 8 o'clock on Euclidean plane, Journal of Ningbo University (Science and Technology Edition), 16-22. [140] Chen Ji, General Mathematical Software and Its Website, Science, 1999 (Volume 5 1), No.5, 6 1-62. [1465438+2000 No.2 (36 issues in total), 43-47. [142] Chen Ji, the distribution law of quantifiers on seven conjunctions-1an example of computer automatic reasoning, Journal of Ningbo University (Science and Technology Edition), No.3, 200 1 (No.465438 in total), Popularization of a Vietnamese contest, Teaching and Research in Middle Schools [144] Ji Chaocheng, Chen Ji, Promotion of Gordon Inequality, Middle School Teaching and Research (Mathematical Edition), No.5, 2008, 48. [145] Ji Chaocheng. No.12,26-28,2009. Catalogue of Chen Ji's Works Translated by Albert W. Marshall and Ingram Olgin [1]; Chen Ji, translated by Cao Dongji; Zhang Zaiming, Introduction to the Dominant Method of Inequality, Journal of Yuxi Teachers College (Natural Science Edition), 1989 No.4 (No.23 in total), 86-10/editor. [2] R.E. Woodrow; Chen Ji, Selected Problems of Elementary Mathematics, Fujian Elementary Mathematics Research Collection, Fujian Education Press,No. 1 Edition, July,1993,235-242. [3] H. Harborth, A. Kemnitz, Chen Jibian, Fibonacci Triangle, Mathematical Communication, No.5 (1994) 4 1-42. [4]s. Vajda, Chen Jibian, Introduction to Generalized Fibonacci Series, Mathematical Communication, 1994,No. 12 (28 1 period in total), 24-25 pages. [5] author O. Bottema. Frontiers of Elementary Mathematics (I), Jiangsu Education Press, April,No. 1 Edition,1996,378-391. (Pricing: 13.60 yuan) Directory of Students' Papers Directed by Chen Ji [1] Yang Rener, Cao Dongji, Promotion of Logarithmic Average (English) 1989 No.2 (No.4 in total),105-1. [2] Estimation of SOP number of Wang,,,, Journal of Ningbo University (Science and Technology Edition), 1990 No.2 (No.6 in total), 6544. Polygonal generalization of Garfunkel-Kuczma inequality, mathematical exchange, 1992 No.0/in total (No.20) [4] Xu Yiping, Ky's Paradigm Inequalities of Mean and Power Mean, Journal of Chengdu University (Natural Science Edition), 198. 10- 12.[5] Yang Rener, Strengthening of a Triangle Inequality, Mathematical Communication, 1992No.1(256 in total), 20-2 1. [6] Yang Rener. Shanghai Education Press, first edition, 1992,10,359-364. [7] Ding, Let's talk about spontaneous numbers again, Mathematical Communication, No.4 (No.261), pp.35-36. [8] 1993 No.2 (No.12), pp. 39-48. [9] Chen Congjie, Solution and Popularization of a Geometry Problem, Journal of Ningbo University (Science and Technology Edition), No.3 (No.1 17), 76-77.