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Local classification of stable geometric solutions of systems of quasilinear first-order PDE 被引量:1
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作者 李兵 李养成 《Science China Mathematics》 SCIE 2002年第9期1163-1170,共8页
Systems of quasilinear first order PDE are studied in the framework of contact manifold. All of the local stable geometric solutions of such systems are classified by using versal deformation and the classification of... Systems of quasilinear first order PDE are studied in the framework of contact manifold. All of the local stable geometric solutions of such systems are classified by using versal deformation and the classification of stable map germs of type ∑1 in singularity theory. 展开更多
关键词 versal deformation system of quasilinear first order PDE stable local geometric solution CLASSIFICATION
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A General Representation of Geometrical Solution Model for Predicting Ternary Thermodynamic Properties
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作者 K.-C.Chou 《Rare Metals》 SCIE EI CAS CSCD 1989年第4期22-26,共5页
The existing geometrical solution models for predicting ternary thermodynamic properties from relevant binary ones have been analysed,and a general representation was proposed in an integral form on the bases of these... The existing geometrical solution models for predicting ternary thermodynamic properties from relevant binary ones have been analysed,and a general representation was proposed in an integral form on the bases of these models. 展开更多
关键词 A General Representation of geometrical Solution Model for Predicting Ternary Thermodynamic Properties EG
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The MAP/PH(PH/PH)/1 Discrete-time Queuing System with Repairable Server 被引量:4
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作者 禹海波 聂赞坎 杨建伟 《Chinese Quarterly Journal of Mathematics》 CSCD 2001年第2期59-63,共5页
In this paper, we discuss a discrete time repairable queuing system with Markovian arrival process, where lifetime of server, service time and repair time of server are all discrete phase type random variables. Using... In this paper, we discuss a discrete time repairable queuing system with Markovian arrival process, where lifetime of server, service time and repair time of server are all discrete phase type random variables. Using the theory of matrix geometric solution, we give the steady state distribution of queue length and waiting time. In addition, the stable availability of the system is also provided. 展开更多
关键词 discrete time queuing system reliability phase type distribution Markovian arrival process matrix geometric solution
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A Variant of Fermat’s Diophantine Equation
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作者 Serdar Beji 《Advances in Pure Mathematics》 2021年第12期929-936,共8页
A variant of Fermat’s last Diophantine equation is proposed by adjusting the number of terms in accord with the power of terms and a theorem describing the solubility conditions is stated. Numerically obtained primit... A variant of Fermat’s last Diophantine equation is proposed by adjusting the number of terms in accord with the power of terms and a theorem describing the solubility conditions is stated. Numerically obtained primitive solutions are presented for several cases with number of terms equal to or greater than powers. Further, geometric representations of solutions for the second and third power equations are devised by recasting the general equation in a form with rational solutions less than unity. Finally, it is suggested to consider negative and complex integers in seeking solutions to Diophantine forms in general. 展开更多
关键词 Variant of Fermat’s Last Equation Positive Integer solutions of New Fermat-Type Equations geometric Representations for solutions of New Diophantine Equations
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The GI/M/1 Queue in a Multi-phase Service Environment with Working Vacations and Bernoulli Vacation Interruption
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作者 Jian-Jun Li Li-Wei Liu 《Journal of the Operations Research Society of China》 EI CSCD 2023年第3期627-656,共30页
In this paper,we consider a GI/M/1 queue operating in a multi-phase service environment with working vacations and Bernoulli vacation interruption.Whenever the queue becomes empty,the server begins a working vacation ... In this paper,we consider a GI/M/1 queue operating in a multi-phase service environment with working vacations and Bernoulli vacation interruption.Whenever the queue becomes empty,the server begins a working vacation of random length,causing the system to move to vacation phase 0.During phase 0,the server takes service for the customers at a lower rate rather than stopping completely.When a vacation ends,if the queue is non-empty,the system switches from the phase 0 to some normal service phase i with probability qi,i=1,2,⋯,N.Moreover,we assume Bernoulli vacation interruption can happen.At a service completion instant,if there are customers in a working vacation period,vacation interruption happens with probability p,then the system switches from the phase 0 to some normal service phase i with probability qi,i=1,2,⋯,N,or the server continues the vacation with probability 1−p.Using the matrix geometric solution method,we obtain the stationary distributions for queue length at both arrival epochs and arbitrary epochs.The waiting time of an arbitrary customer is also derived.Finally,several numerical examples are presented. 展开更多
关键词 GI/M/1 queue Working vacation Matrix geometric solution method Queueing theory
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Ergodicity of Quasi-birth and Death Processes(Ⅰ) 被引量:1
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作者 Zhen Ting HOU Xiao Hua LI 《Acta Mathematica Sinica,English Series》 SCIE CSCD 2007年第2期201-208,共8页
Quasi-birth and death processes with block tridiagonal matrices find many applications in various areas. Neuts gave the necessary and sufficient conditions for the ordinary ergodicity and found an expression of the st... Quasi-birth and death processes with block tridiagonal matrices find many applications in various areas. Neuts gave the necessary and sufficient conditions for the ordinary ergodicity and found an expression of the stationary distribution for a class of quasi-birth and death processes. In this paper we obtain the explicit necessary and sufficient conditions for/-ergodicity and geometric ergodicity for the class of quasi-birth and death processes, and prove that they are not strongly ergodic. Keywords ergodicity, quasi-birth and death process. 展开更多
关键词 ERGODICITY quasi-birth and death process Markov chain matrix geometric solutions
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