例句與造句

1. third-order semi-discrete central-upwind scheme for hyperbolic conservation laws
   求解雙曲型守恒律的半離散三階中心迎風(fēng)格式
2. kind of uniform second order differential scheme for solving hyperbolic conservation laws
   穩(wěn)定性可保證二階格式在多重網(wǎng)格中的有效性和經(jīng)濟性
3. it may serve as effective finite-difference method s for hyperbolic conservation laws
   本方法使用方便，易于推廣，是求解雙曲型守恒律非常有效的差分方法。
4. in this thesis, we couple high resolution shock capturing method and level set method to compute hyperbolic conservation laws
   本文將高分辨率激波捕捉格式與levelset方法結(jié)合起來計算雙曲守恒律方程(組)。
5. in the multidimensional, these schemes are maximum and minimum bounds under the restriction of cfl condition . these schemes are extended to system of hyperbolic conservation laws
   含有剛度源項的雙曲守恒律可以用宋描述許多物理問題，如氣體動力學(xué)、水波、交通流等等。
6. It's difficult to find hyperbolic conservation law in a sentence. 用hyperbolic conservation law造句挺難的
7. at last this method is applied to 2-d hyperbolic conservation laws, and can be extended to higher dimensions easily for the computation of numerical divergence dimension by dimension
   最后這種方法被應(yīng)用到求解二維雙曲型守恒律，同時還可以很容易地通過在一維基礎(chǔ)上計算數(shù)值散度的方式擴展到高維情形。
8. for the numerical computation of one-dimensional hyperbolic conservation laws, various difference schemes were established . these schemes are becoming more and more perfect which have higher resolution and accuracy
   在一維雙曲守恒律方程的的數(shù)值計算中，眾多學(xué)者研究并建立了各種各樣的差分格式，這些格式不斷趨于成熟，分辨率更強，精度更高。
9. in this paper, we develop the high-order accurate essentially non-oscillatory ( eno ) schemes on one and two-dimensional structured meshes in the finite volume formulation, and discuss their applications in hyperbolic conservation laws
   本文構(gòu)造了一維、二維結(jié)構(gòu)網(wǎng)格中的高階精度基本無振蕩(eno)有限體積格式，并且討論了它在雙曲守恒型方程中的應(yīng)用。
10. however, when we use these schemes to compute the initial problem of hyperbolic conservation laws, there is still numerical dissipation near the interface, that is to say, the resolution is decreased near the interface
    但是，我們知道，即使用這兩種格式來計算雙曲守恒律方程的初值問題，在間斷面的附近仍會發(fā)生數(shù)值耗散，也就是說在間斷處的分辨率降低了。
11. double variable technique is used by kruzkov in 70's to obtain the existence, uniqueness and regularity of entropy solution to ( 0.2 . 1 ) for the scalar case, especially the contractive properity of entropy solution . kuznetsov applied this technique to approximation of scalar hyperbolic conservation laws ( 0.2 . 1 ) in 1976
    kruzkov481在70年代用雙變t技巧(doublevariableteehnique)解決了多維單個雙曲守恒律(0.1.1)的摘解的適定性問題，即嫡解的存在性，唯一性及正規(guī)性結(jié)果，特別摘解的ll收縮性質(zhì)
12. in this paper, a class of the second order accurate explicit gauss schemes with staggered grids for the computation of solutions of hyperbolic conservation laws are presented, the advantages of these schemes are : riemann solver-free, faster and programming is much simple, no complete set of eigenvectors is needed and hence weakly hyperbolic system can be solved . in one dimensional case, these schemes are and total variation diminishing and convergence under the restriction of cfl condition, the convergence rate is the first order, and a pointwise error bound is presented
    本文在交錯網(wǎng)格的情況下，利用gauss型求積公式構(gòu)造了一類求解雙曲守恒律的時空一致二階顯式gauss型差分格式，這類gauss型差分格式，具有不需要求解riemann問題、計算簡單、工作量少、編程簡便等優(yōu)美特點，而且由于這類格式在應(yīng)用于求解方程組的時候，不需要對方程組進行特征分解，因此可應(yīng)用于求解非嚴(yán)格的雙曲守恒律方程組。
13. the numerical solutions obtained in computation of riemann problem are satisfied . hyperbolic conservation laws with stiff source terms could describe the effect of relaxation as in the kinetic theory of gases, water waves and traffic flows, etc . the gauss schemes with staggered grids for hyperbolic conservation laws are applied to solve hyperbolic conservation laws with stiff source terms, a class high resolution schemes for hyperbolic conservation laws with stiff source terms are presented . these schemes are the second order accurate and tvd under the restriction of cfl condition, convergence of these schemes are proved
    本文將求解雙曲守恒律方程的交錯網(wǎng)格的gauss型差分格式，應(yīng)用于求解含有剛度源項的雙曲守恒律，構(gòu)造了一類具有高分辨，計算簡便等優(yōu)點的求解含有剛度源項的雙曲守恒律的交錯網(wǎng)格的gauss型差分格式，證明該格式為一致二階精度的格式，證明了該格式在cfl條件限制下為tvd格式，并證明了該格式的收斂性。
14. the numerical solutions obtained in computation of riemann problem are satisfied . hyperbolic conservation laws with stiff source terms could describe the effect of relaxation as in the kinetic theory of gases, water waves and traffic flows, etc . the gauss schemes with staggered grids for hyperbolic conservation laws are applied to solve hyperbolic conservation laws with stiff source terms, a class high resolution schemes for hyperbolic conservation laws with stiff source terms are presented . these schemes are the second order accurate and tvd under the restriction of cfl condition, convergence of these schemes are proved
    本文將求解雙曲守恒律方程的交錯網(wǎng)格的gauss型差分格式，應(yīng)用于求解含有剛度源項的雙曲守恒律，構(gòu)造了一類具有高分辨，計算簡便等優(yōu)點的求解含有剛度源項的雙曲守恒律的交錯網(wǎng)格的gauss型差分格式，證明該格式為一致二階精度的格式，證明了該格式在cfl條件限制下為tvd格式，并證明了該格式的收斂性。
15. the numerical solutions obtained in computation of riemann problem are satisfied . hyperbolic conservation laws with stiff source terms could describe the effect of relaxation as in the kinetic theory of gases, water waves and traffic flows, etc . the gauss schemes with staggered grids for hyperbolic conservation laws are applied to solve hyperbolic conservation laws with stiff source terms, a class high resolution schemes for hyperbolic conservation laws with stiff source terms are presented . these schemes are the second order accurate and tvd under the restriction of cfl condition, convergence of these schemes are proved
    本文將求解雙曲守恒律方程的交錯網(wǎng)格的gauss型差分格式，應(yīng)用于求解含有剛度源項的雙曲守恒律，構(gòu)造了一類具有高分辨，計算簡便等優(yōu)點的求解含有剛度源項的雙曲守恒律的交錯網(wǎng)格的gauss型差分格式，證明該格式為一致二階精度的格式，證明了該格式在cfl條件限制下為tvd格式，并證明了該格式的收斂性。
16. the numerical solutions obtained in computation of riemann problem are satisfied . hyperbolic conservation laws with stiff source terms could describe the effect of relaxation as in the kinetic theory of gases, water waves and traffic flows, etc . the gauss schemes with staggered grids for hyperbolic conservation laws are applied to solve hyperbolic conservation laws with stiff source terms, a class high resolution schemes for hyperbolic conservation laws with stiff source terms are presented . these schemes are the second order accurate and tvd under the restriction of cfl condition, convergence of these schemes are proved
    本文將求解雙曲守恒律方程的交錯網(wǎng)格的gauss型差分格式，應(yīng)用于求解含有剛度源項的雙曲守恒律，構(gòu)造了一類具有高分辨，計算簡便等優(yōu)點的求解含有剛度源項的雙曲守恒律的交錯網(wǎng)格的gauss型差分格式，證明該格式為一致二階精度的格式，證明了該格式在cfl條件限制下為tvd格式，并證明了該格式的收斂性。
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