backward equation 中文意思是什麼
backward equation
解釋
後向方程-
Under the most elementary conditions for backward stochastic differential equation introduced by peng s., we put forward and prove a general converse comparison theorem
摘要在由彭實戈引入的倒向隨機微分方程的最基本的條件下,提出並證明了一個一般的反比較定理。 -
Under the most elementary conditions for backward stochastic differential equation ( bsde in short ) introduced by peng s g, a new converse comparison theorem for bsdes has been proved in this paper, based on investigating the relations between the generator and the solutions of bsdes
摘要通過研究倒向隨機微分方程的解與其生成元的關系,在由彭實戈引入的倒向隨機微分方程的最基本的條件下,證明了一個反比較定理。 -
An almost surely continuous property on solutions of backward stochastic differential equation
幾乎處處意義下倒向隨機微分方程解對終值的連續性 -
Nonlinear electric field transient finite element equation is performed based on the backward euler method and the variational principle
摘要基於後退歐拉法和變分原理推導了非線性電場的暫態有限元方程。 -
In the numerical solution algorithm, the method of characteristics, analytic method and galerkin finite element method ( galerkin - fem ) can be chosen to solve the advective equation, diffusion equations, reaction ( source / sink ) equations, propagation equations and pressure poisson equation, respectively. the developed new algorithm has been verified using analytical solution of circular conduit flow in a reynolds number range of 100 < re < 1 000 and experimental data of the laminar flow over a backward - step facing step. the flow properties are well characterized by this three - dimensional numerical model
本論文在評述三維粘性流動數學模型已有研究成果的基礎上,著重在數值計算方法的選擇和定解條件的給定對數學模型計算結果的影響進行了研究,並首次提出了求解三維純對流方程的高精度的擬協調單元法,建立了三維低雷諾數re流動的數學模型,並在圓管流動、臺階突擴矩形管道流動中得到驗證和應用。 -
In this note, we give the detail proofs of time - homogeneity of the solution of backward stochastic differential equation ( bsde in short ) and their explanations in financial market
摘要本注記在一定條件下證明了倒向隨機微分方程(簡記為bsde )的解滿足時齊性,並給出其在金融市場中的解釋。 -
First, the backward kolmogorov equation for the conditional reliability function and the pontryagin equation for mean first - passage time and then - associated boundary and initial conditions are derived based on the stochastic averaging methods for quasi non - integrable, quasi integrable and quasi partially integrable hamiltonian systems, respectively
首先利用擬不可積、擬可積非共振及擬部分可積非共振hamilton系統的隨機平均法分別給出了研究該系統首次穿越問題的提法,包括計算條件可靠性函數的後向kolmogorov方程及計算平均首次穿越時間的pontryagin方程及其邊值條件。 -
A note on the solution of backward stochastic differential equation
關于倒向隨機微分方程解的一點注記
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