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linear difference equation meaning in Chinese

线性差分方程

Examples

  1. The solution of homogeneous and linear difference equations with constant coefficient
    一类齐次线性常系数差分方程组的解
  2. Abstract : the oscillation criteria for the linear difference equations with oscillatory coefficients was established . some exmpls were given to illustrane the theory
    文摘:研究具变号系数的二阶线性时滞差分方程,获得了此类方程振动的充分条件
  3. A formula to solve the initial value problem of homogeneous linear differential equations with constant coefficients is given and a formula to solve the homogeneous linear difference equations with constant coefficients under certain conditions is derived
    摘要给出了常系数齐次线性微分方程组初值问题的一个求解公式,并由此推出常系数齐次线性差分方程组在给定的初始条件下的一个求解公式。
  4. Invariable coefficient the number of times is different linear recursion sequence will transform using the sequence difference as often the coefficient inhomogeneous linear difference equation , thus obtains one kind of computation invariable coefficient the number of times is different linear recursion sequence special another interpretation simple method
    摘要利用数列的差分将常系数非齐次线性递归数列转化为常系数非齐次线性差分方程,从而得到一种求常系数非齐次线性递归数列特解的简易方法。
  5. By citing a series of counterexamples , , e demonstrate in section 5 that famous indian scholar e . thandapani ' s and american scholar k . ravy ' s classification methods are essentially , rong for second order quasi - linear difference equation , ith damped term in " computers and mathematics , ith applications " , state ne , results and solve completely the problem for the classification of this kind of equation
    通过列举一系列的反例,我们在第五节指出,著名的印度学者e thandapani和美国学者k ravy在《 computersandmathematicswithapplications 》上关于具有强迫项的二阶拟线性差分方程非振动解的分类方法是根本错误的,给出了新的结论,完整地解决了这类方程的分类问题。

Related Words

  1. differences
  2. astigmatic difference
  3. potential difference
  4. second difference
  5. azimuth difference
  6. vectorial difference
  7. declination difference
  8. ontological difference
  9. index difference
  10. induced differences
  11. linear dichroism
  12. linear differeantial equation
  13. linear differential equation
  14. linear differential equations model
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