Fixed point theory has been great attention to mathematicians ( especially, applied mathematicians ) and engineers 不動(dòng)點(diǎn)理論一直倍受數(shù)學(xué)工作者(特別是應(yīng)用數(shù)學(xué)工作者)和工程技術(shù)人員的關(guān)注。
The stability and hopf bifurcation of functional differential equations have great attention to mathematicians ( especially applied mathematicians ) and engineers, both of its theory and applications to the objective phenomena has broad prospects 泛函微分方程的穩(wěn)定性和hopf分支是數(shù)學(xué)工作者(特別是應(yīng)用數(shù)學(xué)工作者)和工程技術(shù)人員十分關(guān)心的話題,無論理論本身還是應(yīng)用實(shí)際都有廣泛的前景。
Nonlinear functional analysis is a subject . old but fashionable . its abundant theories and advanced methods are providing powerful and fruitful tools in solving ever increasing nonlinear problems in the fields of science and technology . though the theories of integral and differential equations in banach spaces, as new branches of nonlinear functional analysis . have developed for no more than thirty years, they are finding extensive applications in such domains as the critical point theory, the theory of partial differential equa-tions, eigenvalue problems . and so on, are attracting much more attentions from both pure and applied mathematicians 非線性泛函分析是一門既悠久又現(xiàn)代的學(xué)科,它的豐富理論和先進(jìn)方法為解決當(dāng)今科技領(lǐng)域?qū)映霾桓F的非線性問題提供了卓有成效的工具,作為自非線性泛函分析中衍生發(fā)展起來的新的分支,banach空間微分方程和積分方程理論雖經(jīng)歷了不足三十年的發(fā)展過程,然而它已被廣泛應(yīng)用于諸如臨界點(diǎn)理論,偏微分方程理論,特征值問題等許多領(lǐng)域,其重要性日益凸現(xiàn)出來