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Publications and Talks(in part):
[1] Peng Lu, Jie Qing and Yu Zheng ,A note on conformal Ricci flow ,Pacific Journal of Mathematics, 268(2), pp 413-434,2014.
[2] Andrews, Ben; McCoy, James; Zheng, Yu Contracting convex hypersurfaces by curvature. Calc. Var. Partial Diff. Eqs. 47 (2013), no. 3-4, 611-665.
[3] Wang, Er-Min; Zheng, Yu Regularity of the first eigenvalue of the p-Laplacian and Yamabe invariant along geometric flows. Pacific J. Math. 254 (2011), no. 1, 239-255.
[4] Jiayong Wu, Ermin Wang, Yu Zheng, First eigenvalue of the p-Laplace operator along the Ricci flow, Anals of Global Analysis and Geometry, 2010, Vol. 38, No. 1, 27-55.
[5] Jia-Yong Wu and Yu Zheng, Interpolating between constrained Li-Yau and Chow-Hamilton Harnack inequalities on a surface, Archiv der Mathematik, 2010, Volume 94, No 6, 591-600.
[6] M. Hong, Y. Zheng, The ASD connection and its related flow on the 4-manifolds, Cal. Var. P. D. E., Vol. 31(2008), 325-349.
[7] Y. Zheng, On the study of one flow for ASD connection, Comm. Contem. Math. Vol. 9, No. 4 (2007), 545-569.
[8] Y. Zheng, On The Local Existence of One Calabi Type Flow, Chinese Anals of Math(A), 27(A)3, 2006.
[9] Y. Zheng, The Negative Gradient Flow For $L^2$-integral of Ricci Curvature, Manuscripta Mathematica, Vol. 111(2003), 163-186.
[10] The Hamiltonian Equations in Some Mathematics and Physics Problems, Appl. Math. Mech., vol. 24, No.1(2003).
[11] Generalized Extended tanh-Function Method to Construct New Explicit Exact Solutions for the Approximate Equations for Long Water Waves, Int. Jour.Modern.,Phy. C., Vol. 15(2003). [12] The Hamiltonian Canonical Form for Euler-Lagrange Equations, Commun. Theor, Phys., Vol. 38, 2002.
[13] Ordered Analytic Representation of PDEs by Hamiltonian Canonical System, Appl. Math. J. Chinese Univ. Ser. B, Vol.17, No.2, 2002.
[14] Multiple subharmonic of nonautonomous Hanmiltonian system, J.Math.Research and Exposition, No. 2, Vol. 13, 1993.
[15] On the flow for ASD connections,2009 Sino-France Summer Institute on Geometric Analysis, Beijing University,2009,7.15-7.23.
[16] On the convexity along the Ricci flow, 2011 Workshop on Convex Geometric Analysis and Integral Geometry, Shanghai University, 2011,6.22-6.26.
[17] Notes on one curvature invariance under the Ricci flow , Workshop on Geometry and Topology, Tongji University.2011,10.14-10.16.
[17] On the study of eigenvalue problems along Ricci flow,AMS 2012 Spring Western Sectional Meeting and Conference,University of Hawaii, in Honolulu, Hawaii, March 3 - March 4, 2012.
[18] On the curvature invariance along the Ricci problems, International Conference on Geometry and Analysis on Manifolds, University of California,Santa Barabra,2012,7.08-7.12.
[19] On new study of the curvature invariance along the Ricci flow , 2013 Nanjing Conference on Geometric Analysi, Nanjing University,2013, 6.17-6.21.
[20]On the local existences of several geometric evolution equations, Workshop on geometric analysis, Nangjin University of Science and Technology, 2013, 6.15-6.16.