Laplace transform

Laplace transform is to simplify the calculation and the establishment of the function is variable and complex variables of a function transformation.

拉普拉斯变换是简化计算而建立的实变量函数和复变量间的一种函数变换。

It is different from the method of embedded Markov chain, which can only give the results in the form of Laplace transform or generating function.

而传统的嵌入马尔可夫链方法所得结果均以Laplace变换或母函数的形式给出。

The integral equation can be simplified by means of Laplace transform.

对所得的积分方程进行Laplace变换，得到变换域内的积分方程。

This is achieved using Matlab on Laplace transform and inverse transform of the few examples.

这是用Matlab实现的关于Laplace变换及反变换的几个实例。

A direct method has been presented for the transient response analysis that numerical Laplace inverse transform can be avoided.

对某些动态响应问题，提出了一种直接分析方法，可以避免Laplace数值反变换。

bilateral laplace transform：双侧拉普拉斯变换

bilateral derivative 双侧导数 | bilateral laplace transform 双侧拉普拉斯变换 | bilaterally bounded sequence 双侧有界序列

bilateral laplace transform：双边拉普拉斯变换

Bandwidth 带宽 | Bilateral Laplace transform 双边拉普拉斯变换 | Bilinear 双线性的

general laplace transform：一般拉普拉斯变换

general integral 通积分 | general laplace transform 一般拉普拉斯变换 | general linear equation 一般线性方程

inverse laplace transform：逆拉普拉斯变换

inverse isotone mapping 逆保序映射 | inverse laplace transform 逆拉普拉斯变换 | inverse laplace transformation 拉普拉斯逆变换

inverse laplace transform：拉氏反变换

拉普拉斯变换Laplace transform | 拉氏反变换inverse laplace transform | 离心调速器centrifugal governor