laplace

美 [l??pl?s] 　英 [lɑ:?ple?s]

• na.Pierre Simon
• 網(wǎng)絡(luò)拉普拉斯；拉普拉斯方程；拉氏變換

英漢解釋

na.	1. Laplace , Pierre Simon, Marquis de 拉普拉斯

例句

The Laplace domain is a nice place in which to work, and transfer functions may be easily manipulated, modified and analyzed.

拉普拉斯域是一個(gè)適合于計(jì)算，和操縱，修改與分析傳遞函數(shù)的地方。

This particular one, is called Laplace's equation, appears in the theory of electricity and magnetism, fluid mechanics, and elsewhere.

這個(gè)特殊的方程叫做拉普拉斯方程，出現(xiàn)于電磁學(xué)理論、流體力學(xué)理論以及其他理論中。

Second, the limited Laplace algorithm and high profile information filtering were used to strengthen image outline.

接著運(yùn)用受限拉普拉斯算法和高提升濾波加強(qiáng)圖像輪廓信息。

It occurs because, as described by Laplace's law, the gas is at a higher pressure in the more highly curved, smaller bubbles.

這是因?yàn)?/c>根據(jù)拉普拉斯方程，在曲率大的氣泡，也就是更小的氣泡中，氣體有著更大的壓強(qiáng)。

Using Laplace transforms and a continued fraction method, the distribution of buffer content is achieved.

運(yùn)用拉氏變換和連分?jǐn)?shù)的方法求得了緩沖器容量的穩(wěn)態(tài)分布。

The Laplace transformation comes from the area of operational mathematics and is extremely useful analysis and design of linear systems.

拉氏變換來自工程數(shù)學(xué)，對分析和設(shè)計(jì)線性系統(tǒng)非常有用。

Laplace transformation is a difficult point in engineering mathematics, especially the inverse Laplace transformation solution.

拉普拉斯變換是《工程數(shù)學(xué)》中的一個(gè)比較難于理解的知識點(diǎn)，尤其是拉普拉斯逆變換的求解。

It is calculated, in this paper, by means of combing Laplace "s integral transformation and singular function. "

將拉普拉斯積分變換方法和奇異函數(shù)相結(jié)合，可以簡單方便地計(jì)算連續(xù)梁的彎曲變形。

To solve LAPLACE equation, 8-nod cubic unit and appropriate function were applied to discrete the structure surface and its environment.

使用8節(jié)點(diǎn)立方體和合適的形狀函數(shù)對構(gòu)筑物表層和周圍場域進(jìn)行了離散。

Transient Analysis of Rewarded Continuous Time Markov Model by Regenerative Randomization with Laplace Transform Inversion.

論文題目：借助拉氏逆變換，運(yùn)用隨機(jī)反饋策略對馬爾科夫時(shí)間連續(xù)模型作瞬變性分析。

The solutions of this model are determined using the Laplace transform with respect to time and a numerical Laplace inversion technique.

模式中的解是經(jīng)由拉普拉司對時(shí)間的轉(zhuǎn)換并利用拉普拉司數(shù)值逆轉(zhuǎn)方法得到。

With Laplace transforms, the question can be solved in Laplace domain.

利用拉普拉斯變換，將定解問題轉(zhuǎn)換到拉普拉斯域內(nèi)求解。

With the thought of "perturbation" , this paper analyes the solution of Laplace equation for poles having irregular boundary.

研究電極的位移形變所產(chǎn)生的誤差時(shí)，需要在不規(guī)則邊界條件下求解拉普拉斯方程。

It will introduce the responses of the step, ramp and impulse input for mechanical and circuit systems by using Laplace transform.

本課程將介紹機(jī)械與電路等系統(tǒng)的模式，利用拉氏轉(zhuǎn)換決定步階，斜坡及脈沖等輸入的響應(yīng)。

The expression of this attraction is obtained by solving Laplace's equation.

通過求解拉普拉斯方程，得出非均勻電場對礦粒吸引力的表示式。

Lecture #21: Convolution formula: proof, connection with Laplace transform, application to physical problems.

第二十一講：卷積公式：證明，和拉普拉斯變換的關(guān)系，物理問題的應(yīng)用。

when time domain solutions are required , the laplace transform method is straightforward.

當(dāng)需要時(shí)域解時(shí)，拉氏變換方法也是很直接的。

The generalized Riesz summability operators of Laplace series are introduced.

引進(jìn)了拉普拉斯級數(shù)的廣義黎斯可和算子。

The uniform approximation of the partial sums for Laplace series is discussed.

討論了拉普拉斯級數(shù)的部分和的一致逼近。

We discuss the in variability of the order in some familiar operations of Laplace order, then give rigorous proof of some results.

討論了拉普拉斯序在卷積運(yùn)算，混合運(yùn)算，復(fù)合運(yùn)算的保序性，并對有關(guān)結(jié)論給出了詳細(xì)嚴(yán)密的證明。

In the Laplace space solution of the second category Bassel function, obtained the results of the analysis.

在拉普拉斯空間求解第二類Bassel函數(shù)，得出分析結(jié)果。

By the aid of the transfer rate matrix, the model is established, that is solved by the Laplace transform.

通過確定馬爾柯夫過程的轉(zhuǎn)移速度矩陣，建立匯率短期預(yù)測模型，并對其用拉普拉斯變換進(jìn)行求解。

There exist many methods for proving the convergence of the Laplace series [1-3] .

拉普拉斯級數(shù)的收斂性有多種證明方法[1-3]。

Laplace at seventy-eight died young. He was still unsatisfied, still sure that he had a lot to learn.

拉普拉斯78歲逝世時(shí)依然年輕。他依舊不滿足，依舊感到許多東西要學(xué)。

Finally, it is easy to move form the Laplace domain into frequency domain.

最后，從拉氏域轉(zhuǎn)換到頻率域也很容易。

What we know here is very little, but what we are ignorant of it immense. ----Laplace.

我們現(xiàn)在所知的真是很小，不知的卻是無限。----拉普拉斯。

Involving a number of key image processing algorithms such as: Laplace operator, the gradient method, and so on.

其中涉及了幾個(gè)關(guān)鍵圖像處理算法如：拉普拉斯算子、梯度法等。

More than just a collection of premium gifts, LA PLACE offers a range of gift and catering services for companies and individuals

LAPLACE提供創(chuàng)意個(gè)性化服務(wù)，協(xié)助企業(yè)與個(gè)人選購禮品和備辦宴會活動

Numerical Parallel Algorithm of Laplace Inverse Transform and its Application in Boundary Element Method for Elastodynamics

拉氏反變換的數(shù)值并行算法及其在彈性動力學(xué)邊界元法中的應(yīng)用

Crystal Growth Analysis in Two-dimensional Instable State Problem and Laplace Inverse Transformation Method

二維非穩(wěn)態(tài)晶體生長的理論分析與拉普拉斯逆變換法

Application of Laplace Transform to General Solutions of Nonhomogeneous Linear Differential Equations of Constant Coefficient

拉普拉斯變換在求解微分方程中的應(yīng)用

Matrix Several Kind of Standard Forms Utilization Class Example of Unilateral Fourier Transform and Unilateral Laplace Transform

矩陣的幾種標(biāo)準(zhǔn)形運(yùn)用類例

Standardized bivariate normal distribution Laplace-Gauss distribution

標(biāo)準(zhǔn)化二元正態(tài)分布，標(biāo)準(zhǔn)化拉普拉斯-高斯分布分層抽樣法，分層隨機(jī)抽樣

A numerical inversion for the laplace transform with application to linear partial integral differential equation

拉普拉斯變換的數(shù)值逆在線性偏積分微分方程中的應(yīng)用

Laplace Operator and Its Application in Rotational Ellipsoid Coordinates

旋轉(zhuǎn)橢球坐標(biāo)系中的拉普拉斯算符及其應(yīng)用

localization of linear means of fourier - laplace series

級數(shù)線性平均的局部化

Solutions to Temperature Profile of Honeycomb Regenerator through Laplace Transformation

用拉普拉斯變換法求解蜂窩蓄熱體氣固溫度分布

Blow-up and Boundedness of Solutions at Finite Time for Evolution p-Laplace Equations with Nonlinear Boundary Conditions

具非線性邊值條件的發(fā)展型p-Laplace方程解在有限時(shí)刻的爆破性和有界性

Application of Numerical Inversion of the Laplace Transform to Partial Differential Equation

拉普拉斯變換的數(shù)值逆在偏微分方程中的應(yīng)用

On Relationship between Single Side Laplace Transformation and Fourier Transformation

關(guān)于信號單邊拉普拉斯變換與傅里葉變換關(guān)系的研究