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CONTACT PROBLEMS AND DUAL VARIATIONAL INEQUALITY OF 2-D ELASTOPLASTIC BEAM THEORY David Yang Gao Applied Mathematics and Mechanics (English Edition)    1996, 17 (10): 953-968.   Abstract （738）      PDF（pc） （955KB）（39603）       Knowledge map    Save In Order to study the frictional contact problems of the elastoplastic beam theory,an extended two-dimensional beam model is established, and a second order nonlinear equilibrium problem with both internal and external complementarity conditions is proposed. The external complementarity condition provides the free boundary condition. while the internal complemententarity condition gives the interface of the elastic and plastic regions. We prove that this bicomplementarity problem is equivalent to a nonlinear variational inequality The dual variational inequality is also developed.It is shown that the dual variational inequality is much easier than the primalvariational problem. Application to limit analysis is illustrated. Related Articles | Metrics | Comments（0）

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EXTENDED BOUNDING THEOREMS OF LIMIT ANALYSIS Gao Yang Applied Mathematics and Mechanics (English Edition)    1983, 4 (4): 571-584.   Abstract （517）      PDF（pc） （2018KB）（18576）       Knowledge map    Save This paper studies the bounding problems of the complete solution of limit analysis for a rigid-perfectly plastic medium, allowing for the discontinuity of plastic flow. A generalized variational principle involving conditions of the rigid-plastic interface and the discontinuous surface of a velocity field has been advanced for the mixed-boundary value problem. Based on this principle, a set of variational formulae of limit analysis is established. The safety factors obtained by these formulae lie between the upper and lower bounds obtained by the classical bounding theorems with the same kinematically and statically admissible field.Moreover, extended bounding theorems have been derived and proved, which hold a broader stress and velocity field than the statically and kinematically admissible field. The corollaries of these theorems indicate the relationship between the variational solution and the complete solution of limit analysis. Applications of these theorems show that a close approximation can be obtained by the proposed method with different admissible fields. Reference | Related Articles | Metrics | Comments（0）

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ON DECENTRALIZED STABILIZATION OF LINEAR LARGE SCALE SYSTEMS WITH SYMMETRIC CIRCULANT STRUCTURE JIN Chao-yong;ZHANG Xiang-wei Applied Mathematics and Mechanics (English Edition)    2004, 25 (8): 863-872.   Abstract （628）      PDF（pc） （622KB）（15640）       Knowledge map    Save The decentralized stabilization of continuous and discrete linear large scale systems with symmetric circulant structure was studied.A few sufficient conditions on decentralized stabilization of such systems were proposed.For the continuous systems,by introducing a concept called the magnitude of interconnected structure,a very important property that the decentralized stabilization of such systems is fully determined by the structure of each isolated subsystem that is obtained when the magnitude of interconnected structure of the overall system is given.So the decentralized stabilization of such systems can be got by only appropriately designing or modifying the structure of each isolated subsystem,no matter how complicated the interconnected structure of the overall system is.A algorithm for obtaining decentralized state feedback to stabilize the overall system is given.The discrete systems were also discussed.The results show that there is a great dfference on decentralized stabilization between continuous case and discrete case. Reference | Related Articles | Metrics | Comments（0）

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THE VIBRATION PROBLEM OF ROD SYSTEM IN THE CONTINUOUS ELASTIC MEDIUM Gu Xiang-zhen;Zhao Yu-xiang;Chien Er-xuan Applied Mathematics and Mechanics (English Edition)    1984, 5 (2): 1197-1207.   Abstract （514）      PDF（pc） （890KB）（10471）       Knowledge map    Save The vibration of rod system in the elastic continuous medium is a problem which is often met and also a composite solution problem of elastic dynamics and structural dynamics. It seems rather difficult and complex to find solutions by general method. Using Lagrangian method of multipliers, we give here the generalized functionals concerning this kind of plane problem and show how to apply the method presented through examples. Reference | Related Articles | Metrics | Comments（0）

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ON THE STABILITY OF THE ROTATIONAL MOTION OF A RIGID BODY HAVING A LIQUID FILLED CAVITY UNDER FINITE INITIAL DISTURBANCE Li Li Applied Mathematics and Mechanics (English Edition)    1983, 4 (5): 667-680.   Abstract （487）      PDF（pc） （1907KB）（8708）       Knowledge map    Save In this paper the problem of the stability of rotational motion of a rigid body which has a liquid filled cavity and a fixed point is investigated without any approximation. Criteria of stability and instability under finite disturbance are obtained. The region of stability is found out explicitly. Reference | Related Articles | Metrics | Comments（0）

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USING TANGENTIAL METHOD TO DETECT THE SINGULAR POINTS AND TO DISCRIMINATE THE STABILITY CONDITION OF A MOVABLE MASS POINT ON ANY GUIDE CURVE ROTATING ABOUT A VERTICAL AXIS WITHOUT FRICTION Liu Hsien-chih Applied Mathematics and Mechanics (English Edition)    1983, 4 (1): 1-39.   Abstract （672）      PDF（pc） （1922KB）（8517）       Knowledge map    Save The state plane method has been used to search the singular point and to determine their equilibrium state for a mass point sliding on a guide rail rotating about a vertical axis with friction disregarded. For the same purpose,this paper presents another method which wight be briefly named "The Tangential Force Method". In contrast with the state plane method,the new method is much simpler both in argumentation and calculation,especially when one resorts to the five criteria in section XIII.Throughout the paper the function for defining the guide rail was introduced,with great endeavor,in the equations newly set up,in order to avoid deducing them each time,i.e.,the useful equations are set up somewhat once for ever.Moreover,the condition of letting the tangential force vanish yields two solutions,the parabolic and the exponential curves of the shape of the guide rails;they are two additional orthogonal curve families although not conjugate harmonics.In the last part of the paper,we present nine examples to show the superiority of this method against the state plane and the potential function methods,seven of the nine examples might be considered as newly introduced in this writing. Reference | Related Articles | Metrics | Comments（0）

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Throughflow and g-jitter effects on binary fluid saturated porous medium P. KIRAN Applied Mathematics and Mechanics (English Edition)    2015, 36 (10): 1285-1304.   DOI: 10.1007/s10483-015-1984-9 Abstract （965）   HTML    PDF（pc） （647KB）（7819）       Knowledge map    Save A non-autonomous complex Ginzburg-Landau equation (CGLE) for the finite amplitude of convection is derived, and a method is presented here to determine the amplitude of this convection with a weakly nonlinear thermal instability for an oscillatory mode under throughflow and gravity modulation. Only infinitesimal disturbances are considered. The disturbances in velocity, temperature, and solutal fields are treated by a perturbation expansion in powers of the amplitude of the applied gravity field. Throughflow can stabilize or destabilize the system for stress free and isothermal boundary conditions. The Nusselt and Sherwood numbers are obtained numerically to present the results of heat and mass transfer. It is found that throughflow and gravity modulation can be used alternately to heat and mass transfer. Further, oscillatory flow, rather than stationary flow, enhances heat and mass transfer. Reference | Related Articles | Metrics | Comments（0） Cited: Baidu(9)

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ON THE STABILITY OF DISTORTED LAMINAR FLOW (I)—BASIC IDEAS AND THEORY Zhou Zhe-wei Applied Mathematics and Mechanics (English Edition)    1989, 10 (2): 123-138.   Abstract （787）      PDF（pc） （1025KB）（7021）       Knowledge map    Save This paper suggests a hydrodynamic stability theory of distorted laminar flow, and presents a kind of distortion profile of mean velocity in parallel shear flow. With such distortion profiles, the new theory can be used to investigate the stability behaviour of parallel shear flow, and thus suggests a new possible approach to instability. Reference | Related Articles | Metrics | Comments（0）

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THE VARIATIONAL INEQUALITY FORMULATION FOR THE DEFORMATION THEORY IN PLASTICITY AND ITS NON-ITERATIVE SOLUTION Guo Xiao-ming;She Ying-he Applied Mathematics and Mechanics (English Edition)    1993, 14 (12): 1163-1172.   Abstract （677）      PDF（pc） （485KB）（6946）       Knowledge map    Save In this paper, the deformation theory in plasticity is formulated in the variational inequality, which can relax the constraint conditions of the constitutive equations. The new form makes the calculation more convenient than general energy forms and have reliable mathematical basis. Thus the plasticity theory may be solved by means of the quadratic programming instead of the iterative methods. And the solutions can be made in one step without any diversion of the load. Reference | Related Articles | Metrics | Comments（0）

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HOMOTOPY ANALYSIS METHOD: A NEW ANALYTIC METHOD FOR NONLINEAR PROBLEMS Liao Shijun Applied Mathematics and Mechanics (English Edition)    1998, 19 (10): 957-962.   Abstract （1481）      PDF（pc） （406KB）（6502）       Knowledge map    Save In this paper, the basic ideas of a new analytic technique, namely the Homotopy Analysis Method (HAM), are described. Differem from perturbation methods, the validity of the HAM is independent on whether or not there exist small parameters in considered nonlinear equations. Therefore, it provides us with a powerful analytic tool for strongly nonlinear problems. A typical nonlinear problem is used as an example to verify the validity and the great potential of the HAM. Reference | Related Articles | Metrics | Comments（0）

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Bending of Uniformly Cantilever Rectangular Plates Chang Fo-van Applied Mathematics and Mechanics (English Edition)    1980, 1 (3): 371-383.   Abstract （1539）      PDF（pc） （675KB）（5720）       Knowledge map    Save An exact solution is given for the bending of uniformly loaded rectangular cantilever plates by using the idea of generalized simply supported edge together with the method of superposition. As illustrative examples, a square plate and a rectangular plate with the ratio of the clamped edge to the neighbouring free edge equal to two are solved numerically. The results are compared with those obtained from approximate methods to confirm the validity of the method presented. Reference | Related Articles | Metrics | Comments（0）

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THE DYNAMIC COUPLING OF LEFT VENTRICLE AND SYSTEMIC ARTERIES Wu Wangyi;Dai Guohao;Wen Gongbi Applied Mathematics and Mechanics (English Edition)    1999, 20 (7): 705-720.   Abstract （546）      PDF（pc） （999KB）（5468）       Knowledge map    Save Cardiovascular system is a complex interactive system. The study of ventriculo-arterial coupling can be greatly helpful to reveal the mechanism and regularity of cardiovascular system diseases. The dynamic process of the ventriculo-arterial coupling is considered making use ofE(t)-R model for the left ventricle and T-Y tube model for the arterial tree. The predicted pressure and flow waveforms agree well with the experimental data. The effects of the SA and LV properties on the LV/SA function and the optimal coupling of ventriculo-arterial are also discussed. The results have clinical significance. Reference | Related Articles | Metrics | Comments（0）

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LUBRICATION THEORY FOR MICROPOLAR FLUIDS AND ITS APPLICATION TO A JOURNAL BEARING WITH FINITE LENGTH Qiu Zu-gan;Lu Zhang-ji Applied Mathematics and Mechanics (English Edition)    1987, 8 (7): 655-665.   Abstract （858）      PDF（pc） （632KB）（4981）       Knowledge map    Save In this paper, the field equation of micropolar fluid with general lubrication theory assumptions is simplified into two systems of coupled ordinary differential equation. The analytical solutions of velocity and microrotat ion velocity are obtained. Micropolar fluid lubrication Reynolds equation is deduced. By means of numerical method, the characteristics of a finitely long journal bearing under various dynamic parameters, geometrical parameters and micropolar parameters are shown in curve form. These characteristics are pressure distribution, load capacity, coefficient of flow flux and coefficient of friction. Practical value of micropolar effects is shown, so micropolar fluid theory further closes to engineering application. Reference | Related Articles | Metrics | Comments（0）

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NAVIER SOLUTION FOR THE ELASTIC EQUILIBRIUM PROBLEMS OF RECTANGULAR THIN PLATES WITH VARIABLE THICKNESS IN LINEAR AND NONLINEAR THEORIES Yin Si-ming;Ruan Sheng-huang Applied Mathematics and Mechanics (English Edition)    1985, 6 (6): 545-558.   Abstract （1691）      PDF（pc） （846KB）（4859）       Knowledge map    Save This paper discusses the elastic equilibrium problems of rectangular thin plates of varying thickness and simply supported on all four sides by linear and nonlinear theory. using the Navier method to seek an approach to the problem. and illustrates the solution with two examples. In conclusion, mention is made of scope of application and the convergency of the solution. Reference | Related Articles | Metrics | Comments（0）

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Thermophoresis and Brownian motion effects on boundary layer flow of nanofluid in presence of thermal stratification due to solar energy N. ANBUCHEZHIAN;K. SRINIVASAN;K. CHANDRASEKARAN;R. KANDASAMY Applied Mathematics and Mechanics (English Edition)    2012, 33 (6): 765-780.   DOI: 10.1007/s10483-012-1585-8 Abstract （1335）      PDF（pc） （374KB）（4393）       Knowledge map    Save The problem of laminar fluid flow, which results from the stretching of a vertical surface with variable stream conditions in a nanofluid due to solar energy, is in- vestigated numerically. The model used for the nanofluid incorporates the effects of the Brownian motion and thermophoresis in the presence of thermal stratification. The sym- metry groups admitted by the corresponding boundary value problem are obtained by using a special form of Lie group transformations, namely, the scaling group of transfor- mations. An exact solution is obtained for the translation symmetrys, and the numerical solutions are obtained for the scaling symmetry. This solution depends on the Lewis number, the Brownian motion parameter, the thermal stratification parameter, and the thermophoretic parameter. The conclusion is drawn that the flow field, the temperature, and the nanoparticle volume fraction profiles are significantly influenced by these param- eters. Nanofluids have been shown to increase the thermal conductivity and convective heat transfer performance of base liquids. Nanoparticles in the base fluids also offer the potential in improving the radiative properties of the liquids, leading to an increase in the efficiency of direct absorption solar collectors. Related Articles | Metrics | Comments（0） Cited: Baidu(39)

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Monte Carlo simulation of stage separation dynamics of a multistage#br# launch vehicle J. Roshanian;M. Talebi Applied Mathematics and Mechanics (English Edition)    2008, 29 (11): 1411-1426.   DOI: 10.1007/s10483-008-1103-z Abstract （1876）      PDF（pc） （520KB）（4181）       Knowledge map    Save This paper provides the formulation used for studing the cold and hot separating stages of a multistage launch vehicle. Monte Carlo simulation is employed to account for the off nominal design parameters of the bodies undergoing separation to evaluate the risk of failure for the separation event. All disturbances, effect of dynamic unbalance, residual thrust, separation disturbance caused by the separation mechanism and misalignment in cold and hot separation are analyzed to find out nonoccurrence of collision between the separation bodies. The results indicate that the current design satisfies the separation requirements. Related Articles | Metrics | Comments（0）

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THE MOTION OF ORGANIZATION CENTER OF SCROLL WAVES IN EXCITABLE MEDIA WITH SINGLE DIFFUSION Liu Shenquan;Lu Qishao;Huang Kelei Applied Mathematics and Mechanics (English Edition)    1999, 20 (4): 418-425.   Abstract （631）      PDF（pc） （448KB）（4147）       Knowledge map    Save The motion of organization center of three-dimensional untwisted scroll waves in excitable media with single diffusion is studied by singular perturbation method in this paper. The relation of curvature and the linear law are derived for untwisted organization center. These results have explicit physical meaning and are in good agreement with experiments. Reference | Related Articles | Metrics | Comments（0）

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FUNCTION OF REGION Ho Chong Applied Mathematics and Mechanics (English Edition)    1986, 7 (2): 189-195.   Abstract （948）      PDF（pc） （474KB）（3841）       Knowledge map    Save The purpose of this paper is to extend points function and interval functions theoretics to an arbitrary region. For this, the new theory, the contraction of a region, and the retraction of a region; the extension of a region, and the kernel-preserving extension of a region are established by the author. Starting from these concepts, the new definitions of a region function is given. And a kernel (i.e. fixed point) of a region function is connected with a stable centre of defining region of such a region function. Thereby, the region theoretics and algorithms are established.In applications, to find a stable centre of a region, the author has utilized the measure theoretics of matrice defined by Hartfiel[7] and other authors. The measure problems of coefficient matrice of system of equations of linear algebra associated with some region are discussed. Reference | Related Articles | Metrics | Comments（0）

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QUASI-EQUILIBRIUM PROBLEMS IN NONCOMPACT GENERALIZED CONVEX SPACES Ding Xieping Applied Mathematics and Mechanics (English Edition)    2000, 21 (6): 637-644.   Abstract （625）      PDF（pc） （498KB）（3804）       Knowledge map    Save By applying a new fixed point theorem due to the author, some new equilibrium existence theorems of quasi-equilibrium problems are proved in noncompact generalized convex spaces. These theorems improve and generalize a number of important known results in recent literature. Reference | Related Articles | Metrics | Comments（0）

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NEW THEORY FOR EQUATIONS OF NON-FUCHSIAN TYPE——REPRESENTATION THEOREM OF TREE SERIES SOLUTION (Ⅱ) Dong Ming-de Applied Mathematics and Mechanics (English Edition)    1984, 5 (6): 1751-1767.   Abstract （566）      PDF（pc） （880KB）（3800）       Knowledge map    Save Our main result consists in proving the representation theorem. Irregular integral is a new type of analytic function, represented by a compound Taylor-Fourier tree series, in which each coefficient of the Fourier series is a Taylor series, while the Taylor coefficients are tree series in terms of equations parameters, higher order correction terms to each coefficient having tree structure with inexhaustible proliferation.The solution obtained is proved to be convergent absolutely and uniformly in the region defined by coefficient functions of the original equation, provided the structure parameter is less than unity. Direct substitution shows that our tree series solution satisfies the equation explicity generation by generation.As compared with classical theory our method not only furnishes explicit expression of irregular integral, leading to the solution of Poincare problem, but also provides possibility of extending the scope of investigation for analytic theory to equations with various kinds of singularities in a unifying way.Exact explicit analytic expression for irregular integrals can be obtained by means of correspondence principle.It is not difficult to prove the convergence of the tree series solution obtained. Direct substitution shows it satisfies the equation.The tree series is automorphic, which agrees completely with Poincaré’s conjecture. Reference | Related Articles | Metrics | Comments（0）