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本文讨论二阶非线性常微分方程 (a(t)ψ(x(t))x’(t))’+q(t)f(x(t))g(x’(t))=0 (1)的解的振动性质。在方程(1)中,α∈C[[t_0,∞),(0,∞)],ψ∈C[R,(0,∞)](R=(-∞,+∞)),q∈C[[t_0,∞),[0,∞)]且在任意的区间(t,∞)(t≥t_0)上不恒等于0,f∈C’[R,R],g∈C[R,R]。关于微分方程振动性的定义,如通常定义,不再详述。在下面的定理中,以下条件将要用到: 相似文献
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Itisknowntoallthatthetheoryofthepoint-countablecoversbeoneofthemostimpor-tantsubjectsinGeneralTopology.Thepoint-countablecoverswithvariouscharacterhavebeendiscussedbymanytopologists,suchasLinandTanaka’spaper[1]onpoint-countableK-network.Inthispaper,w… 相似文献
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李克典 《数学物理学报(A辑)》2010,30(3):649-655
该文利用双g-函数和半连续函数给出了双层空间的刻画,得到:空间(X,Υ_1,Υ_2)是双层当且仅当对于每一个f∈Υ_i-LSC(X),都对应一个h(f)∈Υ_i-LSC(X)∩Υ_j-USC(X)使得(1)0≤h(f)≤f且当f(x)0时,0h(f)(x)f(x).(2)当f≤f′时,h(f)≤h(f′). 相似文献
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In this paper,spaces with a locally countable sn-network are discussed.It is shown that a space with a locally countable sn-network iff it is an snf-countable space with a locally countable k-network.As its application,almost-open and closed mappings(or finite-to-one and closed mapping) preserve locally countable sn-networks,and a perfect preimage theorem on spaces with a locally countable sn-network is established. 相似文献
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In this paper, we give some characterizations of almost completely regular spaces and c-semistratifiable spaces(CSS) by semi-continuous functions. We mainly show that:(1)Let X be a space. Then the following statements are equivalent:(i) X is almost completely regular.(ii) Every two disjoint subsets of X, one of which is compact and the other is regular closed, are completely separated.(iii) If g, h : X → I, g is compact-like, h is normal lower semicontinuous, and g ≤ h, then there exists a continuous function f : X → I such that g ≤ f ≤ h;and(2) Let X be a space. Then the following statements are equivalent:(a) X is CSS;(b) There is an operator U assigning to a decreasing sequence of compact sets(Fj)j∈N,a decreasing sequence of open sets(U(n,(Fj)))n∈N such that(b1) Fn■U(n,(Fj)) for each n ∈ N;(b2)∩n∈NU(n,(Fj)) =∩n∈NFn;(b3) Given two decreasing sequences of compact sets(Fj)j∈N and(Ej)j∈N such that Fn■Enfor each n ∈ N, then U(n,(Fj))■U(n,(Ej)) for each n ∈ N;(c) There is an operator Φ : LCL(X, I) → USC(X, I) such that, for any h ∈ LCL(X, I),0 Φ(h) h, and 0 Φ(h)(x) h(x) whenever h(x) 0. 相似文献
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本文利用序列覆盖分层强紧映射,建立了Ν-空间,g-可度量空间与特定的度量空间的关系,这是对Alexandroff的部分问题的肯定回答. 相似文献
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InthefollowingXdenotesatopologicalspaceandNthesetofnaturalnumbers,theread-erisreferedto[2]forbasicterminologyandtheoremsingeneraltopology.WerecallthatabaseβforatopologicalspaceXisregular[2],ifforeverypointx∈XandanyneighborhoodUofxthereexistsaneighbor… 相似文献