global convergence of the broyden's class of quasi-newton methods with nonmonotone linesearch
da-chuan xuinstitute of applied mathematics; academy of mathematics and system sciences; chinese academy of sciences; beijing 100080; china

..............page:19-24

a finite element method for singularly perturbed reaction-diffusion problems
huo-yuan duan; da-li zhangacademy of mathematics and system sciences; chinese academy of sciences; beijing 100080; china department of mathematics; university of utah salt lake city; ut84112-0090; usa

..............page:25-30

comparison of minque and simple estimate of the error variance in the general linear models
song-gui wang; mi-xia wu; wei-qing madepartment of applied mathematics; beijing polytechnic university; beijing 100022; china department of probability and statistics; peking university; beijing 100871; china

..............page:13-18

a combinatorial theorem on ordered circular sequences of n_1 u's and n_2 v's with application to kernel-perfect graphs
xiao-feng guo; yi huangdepartment of mathematics; xiamen university; xiamen 361005; chinadepartment of basic courses; xinjiang petroleum college; wulumuqi xinjiang 830000; china

..............page:41-46

Entropy Production and Adnlissibility of Shocks
tai-ping liu; tommaso ruggeriinstitute of mathematics; acadernia sinica; taipei; taiwan & department of mathematics; university of stanford; usadepartment of mathematics and research center of applied mathematics; c.i.r.a.m.; university of bologna; italy

..............page:1-12

the asymptotic behavior for numerical solution of a volterra equation
da xudepartment of mathematics; hunan normal university; changsha 410081; china

..............page:47-58

cauchy problem for quasilinear hyperbolic systems with higher order dissipative terms
wei-guo zhangdepartment of basic sciences; university of shanghai for science and technology; shanghai 200093; china

..............page:71-82

on the stabilizer of the automorphism group of a 4-valent vertex-transitive graph with odd-prime-power order
yan-quan feng; jin ho kwak; ming-yao xudepartment of mathematics; northern jiaotong university; beijing 100044; chinacombinatorial and computational mathematics center; pohang university of science and technology; pohang; 790-784; korealaboratory for mathematics and applied mathematics; institute of mathematics; peking university; beijing 100871; china

..............page:83-86

gelation of a reversible markov process of polymerization
dong han; yian-lin handepartment of mathematics; shanghai jiao tong university; shanghai 200030; chinadepartment of statistics; xinjiang finance university; urumqi 830000; china

..............page:87-96

persistence and periodic solution on a nonautonomous sis model with delays
san-ling yuan; zhi-en ma; zhen jindepartment of mathematics; shanghai jiaotong university; shanghai 200030; chinadepartment of applied mathematics; xian jiaotong university; xi an 710049; china

..............page:167-176

a liminf result on two-parameter gaussian process
li-xin zhang; chuan-rong ludepartment of mathematics; xixi campus; zhejiang university; hangzhou 310028; chinadepartment of statistics and operations; zhejiang institute of finance and economics; hangzhou 310012; china

..............page:157-166

on the upper bound of second eigenvalues for uniformly elliptic operators of any orders
gao jia; xiao-ping yang; chun-lin qianbengbu tank institute; bengbu 233013; china & school of science; nanjing university of science and technology; nanjing 210094; chinaschool of science; nanjing university of science and technology; nanjing 210094; china suzhou television & radio broadcasting university; suzhou 215004; china

..............page:107-116

the existence and multiplicity of positive solutions for a third-order three-point boundary value problem
qing-liu yaodepartment of applied mthematics; nanjing university of economics; nanjing 210003; china

..............page:117-122

periodic solutions of a second order non-autonomous differential system
jin zhou; shu sundepartment of applied mathematics; hebei university of technology; tianjin 300130; chinadepartment of mathematics; school of sciences; shanghai university; shanghai 200436; china

..............page:123-128

characterizations on heavy-tailed distributions by means of hazard rate
chun su; qi-he tangdepartment of statistics and finance; university of science and technology of china; hefei 230026; chinadepartment of quantitative economics; university of amsterdam; roetersstraat 11; 1018 wb amsterdam; netherland

..............page:135-142

reduction of volume-preserving flows on an n-dimensional manifold
yong-ai zheng; de-bin huang; zeng-rong liudepartment of mathematics; yangzhou university; yangzhou 225006; chinadepartment of mathematics; shanghai university; shanghai 200436; china

..............page:129-134

ruin theory for the risk process described by pdmps
guo-jing wang; chun-sheng zhang; rong wudepartment of mathematics; suzhou university; suzhou 215006; china department of mathematics; nankai university; tianjin 300071; china

..............page:59-70

a restarted conjugate gradient method for ill-posed problems
yan-fei wanglaboratory of remote sensing information sciences; institute of remote sensing applications; chinese academy of sciences; p.o. box 9718; beijing 100101; chinastate key laboratory of scientific and engineering computing; institute of computational mathematics and scientific/engineering computing; chinese academy of sciences; p.o. box 2719; beijing 100080; china

..............page:31-40

on k-ordered graphs involved degree sum
zhi-quan hu; feng tiandepartment of mathematics; central china normal university; wuhan 430079; chinainstitute of system sciences; academy of mathematics and system sciences; chinese academy of sciences; beijing 100080; china

..............page:97-106

some notes on reaction diffusion systems with nonlinear boundary conditions
wen-jun sunacademy of mathematics and system sciences; cas; beijing 100080; china

..............page:143-156