NEW NUMERICAL METHOD FOR VOLTERRA INTEGRAL EQUATION OF THE SECOND KIND IN PIEZOELASTIC DYNAMIC PROBLEMS 被引量：2

NEW NUMERICAL METHOD FOR VOLTERRA INTEGRAL EQUATION OF THE SECOND KIND IN PIEZOELASTIC DYNAMIC PROBLEMS

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摘要 The elastodynamic problems of piezoelectric hollow cylinders and spheres under radial deformation can be transformed into a second kind Volterra integral equation about a function with respect to time, which greatly simplifies the solving procedure for such elastodynamic problems. Meanwhile, it becomes very important to find a way to solve the second kind Volterra integral equation effectively and quickly. By using an interpolation function to approximate the unknown function, two new recursive formulae were derived, based on which numerical solution can be obtained step by step. The present method can provide accurate numerical results efficiently. It is also very stable for long time calculating. The elastodynamic problems of piezoelectric hollow cylinders and spheres under radial deformation can be transformed into a second kind Volterra integral equation about a function with respect to time, which greatly simplifies the solving procedure for such elastodynamic problems. Meanwhile, it becomes very important to find a way to solve the second kind Volterra integral equation effectively and quickly. By using an interpolation function to approximate the unknown function, two new recursive formulae were derived, based on which numerical solution can be obtained step by step. The present method can provide accurate numerical results efficiently. It is also very stable for long time calculating.

作者丁皓江王惠明陈伟球

机构地区 Department of Civil Engineering Department of Mechanics

出处《Applied Mathematics and Mechanics(English Edition)》 SCIE EI 2004年第1期16-23,共8页 应用数学和力学（英文版）

基金 theNationalNaturalScienceFoundationofChina (1 0 1 72 0 75)

关键词 PIEZOELECTRIC elastodynamic problem Volterra integral equation numerical solution recursive formulae piezoelectric elastodynamic problem Volterra integral equation numerical solution recursive formulae

分类号 O242 [理学—计算数学]

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参考文献3

1王熙,龚育宁.弹性动力学轴对称问题的理论解[J].力学学报,1992,24(1):93-101. 被引量：7
2阎玉斌,崔明根.第二类Volterra积分方程的准确解[J].高等学校计算数学学报,1993,15(4):291-296. 被引量：10
3王熙,龚育宁.A THEORETICAL SOLUTION FOR AXIALLY SYMMETRIC PROBLEMS IN ELASTODYNAMICS[J].Acta Mechanica Sinica,1991,7(3):275-282. 被引量：5

二级参考文献3

1龚育宁，1991年被引量：1
2崔明根，数学进展，1988年，1期，103页被引量：1
3崔明根,邓中兴,吴勃英.第二类Fredholm积分方程的解析解[J].高等学校计算数学学报,1989,11(1):53-64. 被引量：20

共引文献18

1周永芳,吕学琴,张艳英.再生核空间中一类积分方程的解[J].哈尔滨师范大学自然科学学报,2006,22(5):12-15. 被引量：1
2戴宏亮,戴庆华.厚壁圆筒在热、磁耦合场作用下的动态响应[J].动力学与控制学报,2003,1(1):78-83. 被引量：3
3丁皓江,王惠明,陈伟球.ELASTODYNAMIC SOLUTION OF A NON-HOMOGENEOUS ORTHOTROPIC HOLLOW CYLINDER[J].Acta Mechanica Sinica,2002,18(6):621-628. 被引量：1
4丁皓江,王惠明,陈伟球.TRANSIENT THERMAL STRESSES IN AN ORTHOTROPIC HOLLOW CYLINDER FOR AXISYMMETRIC PROBLEMS[J].Acta Mechanica Sinica,2004,20(5):477-483. 被引量：1
5崔明根,闫玉斌,李春利.算子方程Au=f的解的表示[J].高等学校计算数学学报,1995,17(1):82-86. 被引量：8
6戴庆华,戴宏亮,王熙.多场耦合下压电圆筒的热电弹性瞬态响应[J].深圳大学学报（理工版）,2006,23(2):122-127.
7文松龙,朴勇杰,全宽益.W_2~1［a，b］空间中线性有界算子方程的解[J].延边大学学报（自然科学版）,1996,22(4):1-4. 被引量：1
8殷政伟,郭海刚,张瑞民.再生核空间的有界线性算子的最佳逼近[J].河南科技大学学报（自然科学版）,2007,28(2):75-77. 被引量：1
9Chen Aijun.STUDY ON DYNAMIC STRESS INTENSITY FACTORS OF DISK WITH A RADIAL EDGE CRACK SUBJECTED TO EXTERNAL IMPULSIVE PRESSURE[J].Acta Mechanica Solida Sinica,2007,20(1):41-49. 被引量：1
10Aijun Chen,Lianfang Liao,Dingguo Zhang.Analysis of dynamic stress intensity factors of thick-walled cylinder under internal impulsive pressure[J].Acta Mechanica Sinica,2009,25(6):803-809. 被引量：3

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1WANG Ji DU JianKe PAN QiaoQiao.A two-dimensional analysis of surface acoustic waves in finite elastic plates with eigensolutions[J].Science China(Physics,Mechanics & Astronomy),2007,50(5):631-649. 被引量：4
2CHEN Zhijun HAN Tao JI Xiaojun GUO Huawei SHI Wenkang.Lamb wave sensors array for nonviscous liquid sensing[J].Science China(Physics,Mechanics & Astronomy),2006,49(4):461-472. 被引量：3
3HU Yuantai1,2,HU Hongping2 & YANG Jiashi3 1. Institute of Mechanics and Sensing Technology,Central South University,Changsha 410083,China,2. Department of Mechanics,Huazhong University of Science and Technology,Wuhan 430074,China,3. Department of Engineering Mechanics,University of Nebraska,Lincoln,NE 68588-0526,USA.A low frequency piezoelectric power harvester using a spiral-shaped bimorph[J].Science China(Physics,Mechanics & Astronomy),2006,49(6):649-659. 被引量：9
4Hu Yuantai,Chen Chuanyao,Li Guoqing,Yang Jiashi,Jiang Qing.BASIC CURVILINEAR COORDINATE EQUATIONS OF ELECTROELASTIC PLATES UNDER BIASING FIELDS WITH APPLICATIONS IN BUCKLING ANALYSIS[J].Acta Mechanica Solida Sinica,2002,15(3):189-200. 被引量：3
5Zhao Hanzhong (Department of Mechanics,Huazhong University of Science and Technology,Wuhan 430074,China).ACOUSTIC REFLECTION FROM A BAFFLED ELASTIC/PIEZOELECTRIC PLATE[J].Acta Mechanica Solida Sinica,2002,15(2):156-162. 被引量：3
6Tian Xiaogeng, Shen Yapeng.FINITE ELEMENT ANALYSIS OF THERMOELASTIC BEHAVIOR OF PIEZOELECTRIC STRUCTURES UNDER FINITE DEFORMATION[J].Acta Mechanica Solida Sinica,2002,15(4):312-322. 被引量：3
7姜文华,杜功焕.QUASILONGITUDINAL WAVE ALONG Y-DIRECTION OF LiNbO_3 AND ITS ULTRASONIC NONLINEARITY PARAMETERS[J].Science China Mathematics,1991,34(3):346-353. 被引量：1
8杨嘉实,胡元太,杨新华.电弹性体力学中的偏场方法及其应用[J].力学进展,2004,34(3):408-426. 被引量：7
9Hu Yuantai,Yang Jiashi,Jiang Qing.WAVE PROPAGATION IN ELECTROSTRICTIVE MATERIALS UNDER BIASED FIELDS[J].Acta Mechanica Solida Sinica,2004,17(3):209-217. 被引量：1
10张碧星,汪承灏,Anders Bostrm.压电条SH声辐射场研究[J].物理学报,2005,54(5):2111-2117. 被引量：6

引证文献2

1丁皓江,王惠明.Numerical approach for a system of second kind Volterra integral equations in magneto-electro-elastic dynamic problems[J].Journal of Zhejiang University-Science A(Applied Physics & Engineering),2005,6(9):928-932.
2YANG JiaShi1,2↑ & YANG ZengTao1 1 Institute of Mechanics and Sensing Technology, School of Civil Engineering and Architecture, Central South University, Changsha 410083, China,2 Department of Engineering Mechanics, University of Nebraska, Lincoln, NE 68588-0526, USA.Analytical and numerical modeling of resonant piezoelectric devices in China-A review[J].Science China(Physics,Mechanics & Astronomy),2008,51(12):1775-1807. 被引量：2

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2张忠华,王淑云,程光明,阚君武,王鸿云.多次压电效应对压电石英物性系数的影响[J].纳米技术与精密工程,2013,11(1):45-50. 被引量：1

1丁皓江,王惠明.Numerical approach for a system of second kind Volterra integral equations in magneto-electro-elastic dynamic problems[J].Journal of Zhejiang University-Science A(Applied Physics & Engineering),2005,6(9):928-932.
2WANG Ru-zhi.L_（loc）~p-solutions of Nonlinear Impulsive Volterra Integral Equation in Abstract Space[J].Chinese Quarterly Journal of Mathematics,2011,26(1):61-68.
3Lin ZHENG,Gong Qin ZHU.A New Method of Constructing Bivariate Vector Valued Rational Interpolation Function[J].Journal of Mathematical Research and Exposition,2011,31(4):605-616. 被引量：2
4孙右烈.THE GENERAL METHOD FOR SOLVING DYNAMIC PROBLEMS[J].Applied Mathematics and Mechanics(English Edition),1996,17(7):665-676.
5谢鸿政,杨华球,丁树森.Existence of Nontrivial Solutions of A Nonlinear Volterra Integral Equation[J].Journal of Harbin Institute of Technology(New Series),1995,2(2):9-14.
6Raed S. Batahan.Volterra Integral Equation of Hermite Matrix Polynomials[J].Analysis in Theory and Applications,2013,29(2):97-103.
7Han, CQ,Zhang, IQ.HERMITE-TYPE METHOD FOR VOLTERRA INTEGRAL EQUATION WITH CERTAIN WEAKLY SINGULAR KERNEL[J].Journal of Computational Mathematics,1995,13(4):306-314.
8孔庆凯,张炳根.SOME GENERALIZATION OF GRONWALL-BIHARI INTEGRAL INEQUALITIES AND THEIR APPLICATIONS[J].Chinese Annals of Mathematics,Series B,1989,10(3):371-385.
9蔡守峰,张树功.THE ALGEBRAIC METHOD OF RATIONAL INTERPOLATION[J].Numerical Mathematics A Journal of Chinese Universities(English Series),2005,14(4):375-382.
10丁皓江,王惠明,陈伟球.TRANSIENT THERMAL STRESSES IN AN ORTHOTROPIC HOLLOW CYLINDER FOR AXISYMMETRIC PROBLEMS[J].Acta Mechanica Sinica,2004,20(5):477-483. 被引量：1

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