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BULLETIN OF SCIENCE AND TECHNOLOGY
2015年
4期
1-3
,共3页
B?cklund变换%双线性化%常微分方程%非凸松弛解
B?cklund變換%雙線性化%常微分方程%非凸鬆弛解
B?cklund변환%쌍선성화%상미분방정%비철송이해
B?cklund transform%bilinear%ordinary differential equations%non convex relaxation solution
研究采用B?cklund变换的双线性化常微分方程非凸松弛解分析问题,双线性化常微分方程非凸松弛解是保证模型平稳分布和存在性的重要因素,从而提高许多模型在不同边界条件下的稳定特性。把双线性化常微分方程的非凸松弛解算子进行敏感域分析表征,采用B?cklund变换进行目标函数统一迭代,得到非凸松弛解的3种核函数分别是线性核函数、多项式核函数和高斯核函数。计算双线性化常微分方程的非凸松弛解的对称广义中心的稳定性平衡点,计算线性化常微分方程的非凸松弛解满足的边界条件,通过B?cklund变换扩展欧几里得算法,实现对非凸松弛解的稳定性和收敛性的证明,得到在不同多向增量式和减量式分析下,采用B?cklund变换的双线性化常微分方程非凸松弛解是收敛和稳定的。
研究採用B?cklund變換的雙線性化常微分方程非凸鬆弛解分析問題,雙線性化常微分方程非凸鬆弛解是保證模型平穩分佈和存在性的重要因素,從而提高許多模型在不同邊界條件下的穩定特性。把雙線性化常微分方程的非凸鬆弛解算子進行敏感域分析錶徵,採用B?cklund變換進行目標函數統一迭代,得到非凸鬆弛解的3種覈函數分彆是線性覈函數、多項式覈函數和高斯覈函數。計算雙線性化常微分方程的非凸鬆弛解的對稱廣義中心的穩定性平衡點,計算線性化常微分方程的非凸鬆弛解滿足的邊界條件,通過B?cklund變換擴展歐幾裏得算法,實現對非凸鬆弛解的穩定性和收斂性的證明,得到在不同多嚮增量式和減量式分析下,採用B?cklund變換的雙線性化常微分方程非凸鬆弛解是收斂和穩定的。
연구채용B?cklund변환적쌍선성화상미분방정비철송이해분석문제,쌍선성화상미분방정비철송이해시보증모형평은분포화존재성적중요인소,종이제고허다모형재불동변계조건하적은정특성。파쌍선성화상미분방정적비철송이해산자진행민감역분석표정,채용B?cklund변환진행목표함수통일질대,득도비철송이해적3충핵함수분별시선성핵함수、다항식핵함수화고사핵함수。계산쌍선성화상미분방정적비철송이해적대칭엄의중심적은정성평형점,계산선성화상미분방정적비철송이해만족적변계조건,통과B?cklund변환확전구궤리득산법,실현대비철송이해적은정성화수렴성적증명,득도재불동다향증량식화감량식분석하,채용B?cklund변환적쌍선성화상미분방정비철송이해시수렴화은정적。
Based on B?cklund Bilinear transformation of ordinary differential convex relaxation solution analysis of non equation, bilinear differential convex relaxation solution is to ensure the stable distribution and the model parameters of non equation, so as to improve the stability of many models under different boundary conditions. The non convex relaxation double linear ordinary differential equations of operators are sensitive domain characterization, using B?cklund transforma?tion to an unified objective function iteration, 3 kinds of kernel functions are non convex relaxation solution of the linear kernel, polynomial kernel function and Gauss function. Stability of equilibrium point of generalized Centro symmetric non convex relaxation double linear ordinary differential equations, non convex relaxation linear ordinary differential equations which satisfy the boundary conditions, the B?cklund transformation extended Euclidean algorithm, the stability and conver?gence proof non convex relaxation solution, obtained by analysis incremental and decremental under different direction, B?cklund Bilinear transformation of ordinary differential equations with non convex relaxation solution is convergent and stable.