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'^[0] /{o{  }% 0hgUSCQ@wr 5;-@wr 5 [ % ?@wr 6;1@wr 6  pG % @lʑ^ lʑ  XTableStyleMedium2PivotStyleLight16`I 2015 SCIeVVn* _20181130InCites_lWS^'Yf[2008_2018ezUS_5981{=""  ;" Lg R{y 7S China Univ Technol 7,{N\OUSMO 7^S 7  7>Wang, Zhen; Shen, Luming; Miao, Yu; Chen, Shanshan; Xu, WenfeiLiu, Baiyu; Ma, Li(Wang, Pengyan; Dai, Zhaohui; Cao, LinfenGuo, LuJun; Leng, Gangsong>Hsu, Sze-Bi; Lopez-Gomez, Julian; Mei, Linfeng; Wang, Feng-Bin)Hsu, Sze-Bi; Mei, Linfeng; Wang, Feng-Bin8Huang, Guangyue; Guo, Xin; Du, Hongxia; He, Yi; Miao, Yu%Chen YongQiang; Luo ZiYan; Xiu NaiHua6Dai, Zhaohui; Wang, Xiaosong; Zhang, Lingrui; Hou, WeiWOShQ\O 7WOS:000353211500020FFURTHER REFINEMENTS OF ZHAN'S INEQUALITY FOR UNITARILY INVARIANT NORMS+Zuo, Hongliang; Seo, Yuki; Fujii, Masatoshi234-241WOS:000354405200009Henan Normal Univ 7WOS:000360508500008(On the Equiaffine Symmetric HyperspheresLi, Xingxiao; Zhao, Guosong117-142WOS:0003532111000151SPECTRAL PROPERTIES OF k-QUASI-(*)-A(n) OPERATORSWOS:000359327500006^A NOTE ON BERNSTEIN-TYPE RESULTS OF SPACELIKE HYPERSURFACES IN SEMI-RIEMANNIAN WARPED PRODUCTS`UNIVERSITY POLITEHNICA OF BUCHAREST SCIENTIFIC BULLETIN-SERIES A-APPLIED MATHEMATICS AND PHYSICS59-68WOS:0003721993000235EXPONENTIAL INEQUALITIES FOR BOUNDED RANDOM VARIABLES 1557-1570WOS:000358787100016^The analysis of PMHSS-multigrid methods for elliptic problems with smooth complex coefficientsLi, Shishun; 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Zhao, Xianhe; Li, ShirongWOS:000361469400005ERadial symmetry and monotonicity for fractional Henon equation in R-n 1685-1695WOS:0003558475000055Exponential Convergence for the k-th Order Statistics)Yao, Suxia; Miao, Yu; Nadarajah, Saralees977-984WOS:000348055700012MCONCENTRATION PHENOMENON IN A NONLOCAL EQUATION MODELING PHYTOPLANKTON GROWTH%Mei, Linfeng; Dong, Wei; Guo, Changhe587-597WOS:000351893200008OA note on the exponential inequality for negatively associated random variablesMiao, Yu; Mu, Jian-Yong77-88WOS:000359611800021fComplete spacelike hypersurfaces with positive r-th mean curvature in a semi-Riemannian warped product259-277WOS:000359760100006AN AFFINE SCALING INTERIOR TRUST-REGION ALGORITHM COMBINING BACKTRACKING LINE SEARCH WITH FILTER TECHNIQUE FOR NONLINEAR CONSTRAINED OPTIMIZATIONPei, Yonggang; Zhu, Detong 1046-1066WOS:000351252900013*Zhan's inequality on A-G mean inequalities+Fujii, Masatoshi; Seo, Yuki; Zuo, Hongliang241-251WOS:000352169200008*Some convergence theorems for RM algorithm"Wang, Zhen; 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L.; Xu, R. W..NUMERICAL FUNCTIONAL ANALYSIS AND OPTIMIZATION499-504WOS:000351657200006OA PROJECTED LANDWEBER METHOD WITH VARIABLE STEPS FOR THE SPLIT EQUALITY PROBLEM(JOURNAL OF NONLINEAR AND CONVEX ANALYSIS467-472(NONLINEAR ANALYSIS-MODELLING AND CONTROLWOS:000365611600014PSYMMETRY OF SOLUTIONS TO SEMILINEAR EQUATIONS INVOLVING THE FRACTIONAL LAPLACIAN Zhang, Lizhi 2393-2409WOS:000351249300007A U(n+1) Bailey latticeZhang, Zhizheng; Wu, Yun747-764WOS:000358366300001Gao, Fugen; Li, XiaochunWOS:0003654781000084Deformations and extensions of Lie-Yamaguti algebrasZhang, Tao; Li, Juan 2212-2231WOS:000356966000022On Radford BiproductMa, Tianshui; Li, Haiying 3946-3966WOS:000351560400011[Radial symmetry of entire solutions of a bi-harmonic equation with exponential nonlinearityWOS:000354405200011IGENERALIZED COMPOSITION OPERATORS FROM ZYGMUND TYPE SPACES TO Q(K) SPACES&Li, Haiying; Ma, Tianshui; Guo, Zhitao425-435WOS:000355197100003`IMPROVED REVERSE ARITHMETIC-GEOMETRIC MEANS INEQUALITIES FOR POSITIVE OPERATORS ON HILBERT SPACEZuo, Hongliang; Cheng, Nan51-60vAnalysis of a stochastic predator-prey model with disease in the predator and Beddington-DeAngelis functional responseLi, Shuang; Wang, XiaopanWOS:000352727800008HAttractive points and convergence theorems of generalized hybrid mapping Zheng, Yuchun.JOURNAL OF NONLINEAR SCIENCES AND APPLICATIONS354-362WOS:0003463509000014Cohomology and deformations of 3-Lie colour algebrasWOS:000350888300002]A class of braided monoidal categories via quasitriangular Hopf pi-crossed coproduct algebras&Ma, Tianshui; Liu, Linlin; Li, HaiyingWOS:000349811400037WBlow up threshold for the Gross-Pitaevskii system with combined nonlocal nonlinearities 1214-1224Liu, Xia; Wang, JinlingWOS:000359258700001<PAC-Bayesian inequalities of some random variables sequences%Guo, Zongming; Huang, Xia; Zhou, Feng 1972-2004651-671 1013-1020WOS:000360258000015qOn a nonlocal reaction-diffusion-advection system modelling the growth of phytoplankton with cell quota structure 5353-5378APPLICABLE ANALYSIS Zhang, TaoWOS:000354167600002SThe global weak solutions to the Cauchy problem of the generalized Novikov equation 1334-1354MA Beale-Kato-Majda criterion for the 3D viscous magnetohydrodynamic equationsYang, Xinguang; Qin, Yuming701-707WOS:000349982500013\Moderate Deviation Principles for Empirical Covariance in the Neighbourhood of the Unit Root&Miao, Yu; Wang, Yanling; Yang, Guangyu"SCANDINAVIAN JOURNAL OF STATISTICS234-255WOS:000364732700004uSub-harmonicity, monotonicity formula and finite Morse index solutions of an elliptic equation with negative exponentGuo ZongMing; Zhou Feng 2301-2316WOS:00036687< 2400032^Stability analysis of the anti-stable heat equation with uncertain disturbance on the boundary(Liu, Juan; Zheng, Guojie; Ali, M. Montaz 1193-12012ACTA MATHEMATICAE APPLICATAE SINICA-ENGLISH SERIESWOS:000351645000009A Mehrotra-type predictor-corrector infeasible-interior-point method with a new one-norm neighborhood for symmetric optimization'Yang, Ximei; Liu, Hongwei; Liu, Changhe106-121WOS:000348625000007UA gauge-Uzawa finite element method for the time-dependent Viscoelastic Oldroyd flows'Si, Zhiyong; Li, Wenqiang; Wang, Yunxia96-110WOS:000348590700006JRICCI SOLITONS ON THREE-DIMENSIONAL eta-EINSTEIN ALMOST KENMOTSU MANIFOLDS91-100WOS:000359507800015OThe Cauchy problem for a higher order shallow water type equation on the circleWOS:000348847200013WOS:000344577500005=ON THE CAUCHY PROBLEM FOR A GENERALIZED CAMASSA-HOLM EQUATION871-889#Chen, Defu; Li, Yongsheng; Yan, Wei285-298WOS:000364249400012+L-2 norm preserving flow in matrix geometry220-231JOURNAL OF FUNCTION SPACESWOS:0003689614000108ON A POWER-TYPE COUPLED SYSTEM OF MONGE-AMPERE EQUATIONSZhang, Zhitao; Qi, Zexin)TOPOLOGICAL METHODS IN NONLINEAR ANALYSIS717-7294Li, Shiming; Yan, Wei; Li, Yongsheng; Huang, Jianhua 4863-4896WOS:000353093300009]The Cauchy problem for the modified two-component Camassa-Holm system in critical Besov spaceYan, Wei; Li, Yongsheng9ANNALES DE L INSTITUT HENRI POINCARE-ANALYSE NON LINEAIRE443-469WOS:000354825800018ROn well-posedness of two-component Camassa-Holm system in the critical Besov spaceWOS:000358781400001ANNALS OF FUNCTIONAL ANALYSIS$Pang, Shanqi; Zhu, Yan; Wang, YajuanWOS:000368466500005-A pivotal eigenvalue problem in river ecology 2280-2316WOS:000350918400008*Primitive tensors and directed hypergraphs$Cui, Lu-Bin; Li, Wen; Ng, Michael K.96-108OA class of mixed orthogonal arrays obtained from projection matrix inequalitiesWOS:000348852300007YConsistency of LS estimators in the EV regression model with martingale difference errors(Miao, Yu; Wang, Yanling; Zheng, Haojiang104-118WOS:000352120700013(Heat equation in a model matrix geometry'JOURNAL OF ALGEBRA AND ITS APPLICATIONSWOS:000351517100001MOn the rate of convergence in the strong law of large numbers for martingales'Miao, Yu; Yang, Guangyu; Stoica, GeorgeLSTOCHASTICS-AN INTERNATIONAL JOURNAL OF PROBABILITY AND STOCHASTIC PROCESSES185-198'Zhai, Xiaoping; Li, Yongsheng; Yan, Wei179-195WOS:000363244800011PGradient estimates and Liouville type theorems for a nonlinear elliptic equation491-499 Li, Jiaojiao351-355Wang, Fenghui; Yang, ChangsenWOS:000359030800013fGlobal well-posedness for the 3-D incompressible inhomogeneous MHD system in the critical Besov spacesWOS:000362745700021KSTRONG AVERAGING PRINCIPLE FOR SLOW-FAST SPDES WITH POISSON RANDOM MEASURESXu, Jie; Miao, Yu; Liu, Jicheng2DISCRETE AND CONTINUOUS DYNAMICAL SYSTEMS-SERIES B 2233-2256WOS:000354992000001XPullback attractors of 2D Navier-Stokes equations with weak damping and continuous delay'Li, Juntao; Wang, Yadi; Yang, Xin-GuangBOUNDARY VALUE PROBLEMS ADVANCES IN DIFFERENCE EQUATIONSWOS:000359866400009IHalf thresholding eigenvalue algorithm for semidefinite matrix completion%Zhao, Yongye; Li, Yongsheng; Yan, WeiWOS:000365611600004bBLOW UP THRESHOLD FOR A PARABOLIC TYPE EQUATION INVOLVING SPACE INTEGRAL AND VARIATIONAL STRUCTURE 2169-2183SCIENCE CHINA-MATHEMATICSWOS:000350904800005*On phi-recurrent almost Kenmotsu manifoldsKUWAIT JOURNAL OF SCIENCE65-77WOS:000355155200007aThe Cauchy problem for the Ostrovsky equation with negative dispersion at the critical regularity'Li, Yongsheng; Huang, Jianhua; Yan, Wei 1379-1408 2015-2032WOS:000363056100028VFinite Morse index solutions of weighted elliptic equations and the critical exponents 3161-3181WOS:000348259500023The Orlicz mean zonoid operator(Guo, Lujun; Leng, Gangsong; Du, Changmin 1261-1271WOS:000360582300012AOn general (alpha, beta)-metrics with vanishing Douglas curvatureYang, Changsen'DISCRETE DYNAMICS IN NATURE AND SOCIETYCOMMUNICATIONS IN ALGEBRA137-144$INTERNATIONAL JOURNAL OF MATHEMATICSFILOMATWOS:000354828300031LProjectively flat general (alpha, beta)-metrics with constant flag curvatureYu, Changtao; Zhu, HongmeiWOS:000361446300013bSome nonlinear conjugate gradient methods with sufficient descent condition and global convergenceWOS:000351893200002FOn a type of almost Kenmotsu manifolds with harmonic curvature tensors9BULLETIN OF THE BELGIAN MATHEMATICAL SOCIETY-SIMON STEVIN15-24 1222-1239:Dong, Xiao Liang; Liu, Hongwei; Xu, Yin Ling; Yang, Xi MeiOPTIMIZATION LETTERS 1421-1432Wang, Yaning; Liu, XiminWOS:0003521996000032Complete self-shrinkers of the mean curvature flowCheng, Qing-Ming; Peng, Yejuan497-506(MATHEMATICAL INEQUALITIES & APPLICATIONS409-415WOS:0003557357000224Some Liouville theorems for the fractional Laplacian,Chen, Wenxiong; D'Ambrosio, Lorenzo; Li, Yan370-381 STATISTICS,MATHEMATICAL METHODS IN THE APPLIED SCIENCESWOS:0003537533000203A class of Finsler metrics of scalar flag curvature Zhu, Hongmei*DIFFERENTIAL GEOMETRY AND ITS APPLICATIONS321-331210-220 TAIWANESE JOURNAL OF MATHEMATICSWOS:000350529500019oA modified Hestenes-Stiefel conjugate gradient method with sufficient descent condition and conjugacy condition9CALCULUS OF VARIATIONS AND PARTIAL DIFFERENTIAL EQUATIONSHuang, Guangyue; Ma, BingqingARCHIV DER MATHEMATIK STATISTICS & PROBABILITY LETTERSWOS:000357411800001JOn a product-type operator from Zygmund-type spaces to Bloch-Orlicz spacesLi, Haiying; Guo, Zhitao(JOURNAL OF INEQUALITIES AND APPLICATIONS8Dong, Xiao Liang; Liu, Hong Wei; He, Yu Bo; Yang, Xi Mei0JOURNAL OF COMPUTATIONAL AND APPLIED MATHEMATICS239-249RESULTS IN MATHEMATICS&ACTA MATHEMATICA SINICA-ENGLISH SERIESCPROCEEDINGS OF THE INDIAN ACADEMY OF SCIENCES-MATHEMATICAL SCIENCESWOS:000343827800009:Necessary and sufficient conditions for copositive tensorsLINEAR & MULTILINEAR ALGEBRA120-131#APPLIED MATHEMATICS AND COMPUTATION1JOURNAL OF MATHEMATICAL ANALYSIS AND APPLICATIONS+COMMUNICATIONS ON PURE AND APPLIED ANALYSIS0NONLINEAR ANALYSIS-THEORY METHODS & APPLICATIONSCOMPTES RENDUS MATHEMATIQUE+BULLETIN OF THE KOREAN MATHEMATICAL SOCIETYSong, Yisheng; Qi, LiqunJOURNAL OF FUNCTIONAL ANALYSIS#LINEAR ALGEBRA AND ITS APPLICATIONS$JOURNAL OF MATHEMATICAL INEQUALITIES)DISCRETE AND CONTINUOUS DYNAMICAL SYSTEMS"}SSehegnf[yWwSguQHrt^n/aDu, Yihong; Guo, Zongming!JOURNAL OF DIFFERENTIAL EQUATIONS MathematicsCOMPLEX VAR ELLIPTIC ACTA MATH SINNUMER FUNC ANAL OPTANN FUNCT ANALLINEAR ALGEBRA APPLCOMMUN PUR APPL ANALCOMMUN ALGEBRAJ NONLINEAR CONVEX ADISCRETE CONT DYN-AJ INEQUAL APPLNONLINEAR ANAL-THEORAPPL MATH COMPUT J FUNCT ANALJ MATH ANAL APPLJ DIFFER EQUATIONSAN STI U OVID CO-MATSCI CHINA MATHCALC VAR PARTIAL DIF INT J MATH RESULTS MATH TAIWAN J MATHJ COMPUT APPL MATHDISCRETE DYN NAT SOC OPTIM LETTLINEAR MULTILINEAR ADISCRETE CONT DYN-BBOUND VALUE PROBLP INDIAN AS-MATH SCI J FUNCT SPACEJ ALGEBRA APPL APPL ANALMATH METHOD APPL SCIMATH INEQUAL APPLACTA MATH APPL SIN-EJ MATH INEQUALB KOREAN MATH SOC MATH SLOVACA ARCH MATHCR MATHADV DIFFER EQU-NYDIFFER GEOM APPLNONLINEAR ANAL-MODELPERIOD MATH HUNGB BELG MATH SOC-SIMSTAT PROBABIL LETT SCAND J STATSTATISTICS-ABINGDONTOPOL METHOD NONL AN STOCHASTICSJ NONLINEAR SCI APPLU POLITEH BUCH SER A KUWAIT J SCINONLINEAR ANAL-HYBRIANN I H POINCARE-AN Xidian Univ 7 Shanghai Univ 7Henan Normal Univ 7Henan Inst Sci & Technol 7Osaka Kyoiku Univ 7 Fukuoka Univ 7Henan Normal Univ 7Henan Normal Univ 7Henan Polyt<ech Univ 7Henan Normal Univ 7Henan Normal Univ 7Chinese Acad Sci 7Henan Normal Univ 7 Xidian Univ 7Univ Sci & Technol Beijing 7S China Univ Technol 7S China Univ Technol 7 Taibah Univ 7Luoyang Normal Univ 7Beijing Jiaotong Univ 7Pingdingshan Univ 7S China Normal Univ 7Natl Tsing Hua Univ 7Henan Normal Univ 7 Peking Univ 7 Shanghai Univ 7Univ New England 7Henan Normal Univ 7S China Univ Technol 7Natl Tsing Hua Univ 7Univ Sci & Technol Beijing 7Luoyang Teachers Coll 7S China Univ Technol 7Henan Normal Univ 7Guangxi Normal Univ 7Henan Polytech Univ 7Henan Normal Univ 7 Xidian Univ 7Henan Normal Univ 7Henan Normal Univ 7Henan Normal Univ 7S China Univ Technol 7S China Univ Technol 7#, D--./1/2346 i7R 8 3:a;J< >>?'A@B)CCEFGH'JnKWLONlO1JPLQRhSkT0V [W X Z 2[(\]|^A]_"n`3Fa bWceGf fmBgg|hAiiq6jjkmdnoApcc  PK![Content_Types].xmlN0EH-J@%ǎǢ|ș$زULTB l,3;rØJB+$G]7O٭VAػdV3`KPcgUkѧ;Ct3v>OQ$$o,L=Hdr촦䋓| F7ׯTaciNa)[g2J?:tz;vQh5(Ň; 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