hereditarily 中文意思是什麼

hereditarily 解釋
adv. 動詞 副詞 世襲地;遺傳地。

  1. The de courcy's were hereditarily shortsighted.

    德庫西家的人祖傳下來全是近視眼。
  2. Theorem 4 space x is a cosmic space if and only if x is a - compact space with a - weakly hereditarily closure - preserving pair - networks

    , x 。具有。遺傳閉包保持雙網路當且僅當或者每x 『 ,是cosmic空間且除可數個a外, x 。
  3. We improved the theorem of inverse limits of hereditarily - normal spaces, and gave a simple proof of this result

    摘要討論了-正規空間的逆極限性質,改進了文[ 7 ]中關于遺傳-正規性逆極限保持定理,並給出一個簡單證明。
  4. The audition obstacle that if two ear appear, punishs severely, this kind of circumstance is the possibility that creates hereditarily wants a little bit big

    假如兩只耳朵出現嚴懲的聽力障礙,這種情況是遺傳造成的可能性要大些。
  5. On - weakly hereditarily closure - preserved family and cc - spaces in this paper, we discussed - weakly hereditarily closure - preserved family and cc spaces respectively

    本文主要由兩個部分組成,分別討論了-弱遺傳閉包保持集族和cc _空間。
  6. If have congenital drawback, be atavistic mostly, should grandson generation is shown, but drug is used when you narrate may fetal development or traumatic cause, belong to acquired reason, that won ' t arrive hereditarily next generation

    如有先天性缺陷大都是隔代遺傳,要孫輩顯現出來,但你述可能胎兒發育時用藥或外傷引起,屬後天原因,那就不會遺傳到下一代!
  7. Therefore, issr molecular markers are more suited than rapd molecular markers when testing the genetic diversity of ginkgo populations and determining the genetic relationship of among populations or among individuals which are much similar hereditarily

    因此,在研究親緣關系非常近的銀杏物種的遺傳多樣性並試圖確定群體間或個體間的遺傳關系時, issr分子標記技術比rapd分子標記技術更為合適。
  8. Let x is the limit of the inverse system. suppose each projection is an open and onto map. and x is - paracompact. if each x is normal mesocompact, then x is mesocompact. moreover, we obtain the analogous result for hereditarily normal and hereditarily mesocompact properties

    | = ,假設每個投射_ : x x _是開的且到上的。 x是-仿緊的,如果每個x _為正規中緊的,則x是正規中緊的,進一步得到關于遺傳正規且遺傳中緊空間的結論。
  9. In other words, d. burke and r. engelking and d. lutzer proved that a regular space is metrizable space if and only if it has a - hereditarily closure - preserving base in 1975, and introduced weakly hereditarily closure - preserving families, which proved that a regular k - space has - weakly hereditarily x closure - preserving bases is metrizable space, too

    Burke , r engelking和d lutzer證明了正則空間是可度量化空間當且僅當它具有遺傳閉包保持基,並引入了弱遺傳閉包保持集族( weaklyhereditarilyclosure - preservingfamilies ) ,同時證明了具有弱遺傳閉包保持基的正則的k空間是可度量化空間。
  10. Are there similar characterizations for the countable paracompact ( mesocompact, metacompact ) space and hereditarily mesocompact space ? in this paper, on the basis of the aboves, we obtain some results about them. and the product properties of mesocompact spaces and hereditarily mesocompact spaces have been paid attention. but there is no good result about them. in this paper we obtain a result about the limit of the inverse system of a normal mesocompact space and a hereditarily normal and hereditarily mesocompact space

    那末,可數仿緊(中緊、亞緊)空間及遺傳中緊空間是否具有類似junnila的刻畫呢?本文圍繞這個問題在上述結果的基礎上證明了一些結果。另外,中緊空間和遺傳中緊空間的可乘性問題一直受到人們的關注,但還沒有好的結果,本文證明了一個關于正規中緊空間及遺傳正規且遺傳中緊空間的逆極限的結果。
  11. On the other hand, locally finite families introduced by p. alexandroff in 1924 have played a fundamental role in the research of metrization problem and paracompact property. research of space with - locally finite networks betters understanding of metric property ' s essence. hereditarily closure - preserving families introduced by n. lasnev in 1966 ties up locally finite families

    Alexandroff引入的局部有限集族( locallyfinitefamilies )已在度量化問題及仿緊性的研究中起著不可替代的作用,對于具有局部有限網路空間的探索更加深了人們對度量性的本質了解, 1966年n
  12. These achievements will enrich the relationship between pair - network and network, and further understand the internal connection between hereditarily closure - preserving families and point countable families or locally finite families, and better certain topological non - variability of the space with pair - networks, and enrich the theory of generalized metric space. this paper reached some principal conclusions about the space with - hereditarily closure - preserving pair - networks

    弱遺傳閉包保持雙網路空間的類似結構,這些結果將更加充實雙網路與網路之間的關系,進一步明確遺傳閉包保持集族與點可數集族或局部有限集族之間的內在聯系,完善由雙網路確定的空間關于拓撲運算下的某種不變性,豐富了廣義度量空間理論
  13. And about a given property p which satisfies some conditions, we give a condition for the open sets in the tychnoff product of two spaces which have a open refinement having the property p. the last chapter obtains a result about the limit of the inverse system of a normal mesocompact space and a hereditar ily normal and hereditarily mesocompact space

    而且給出了,對滿足一定條件的某種性質p ,兩個空間的乘積中的每個開集族有p性質的開加細的一個充分條件。第四章詳細證明了關于正規中緊空間及遺傳正規且遺傳中緊空間的逆極限的一個結果。
  14. With the help of successful experiences the space with - hereditarily closure - preserving cs * pair - networks and the space with - hereditarily closure - preserving psedobases have gained, this thesis makes a research of the space with - hereditarily closure - preserving pair - networks at the aspects of the yan pengfei ' s question of space with - hereditarily closure - preserving pair - networks and discusses the equivalent depiction of this space and the connection between this space and related generalized metric space and the topological properties of this space. at the same time, it make further consideration of the similar structure of space with - weakly hereditarily closure - preserving pair - networks

    本文圍繞燕鵬飛關于遺傳閉包保持雙網路空間的問題,藉助具有遺傳閉包保持cs ~ *雙網路空間和具有遺傳閉包保持偽基空間已取得的成功經驗,對具有遺傳閉包保持雙網路的空間進行研究,探索該空間的等價刻畫及與相關廣義度量空間的聯系,並由此討論這類空間的可加性、遺華南師范人學碩十學位論文傳性、可積性及映射性質等拓撲運算性質
  15. Yan pengfei proved that a space has point countable pair - networks if and only if it is cosmic space in 1999 further and put forword the question how we depict the space with - hereditarily closure - preserving pair - networks on the basis of acquirement of interested characteristics of the space with - hereditarily closure - preserving cs * - networks

    1999年燕鵬飛進一步證明了具有點可數雙網路的正則空間也等價于cosmic空間,並在獲得了具有遺傳閉包保持cs ~ *雙網路( cs ~ * - network )空間的有趣的內在特徵之後提出問題:如何刻畫具有遺傳閉包保持雙網路的正則空間
  16. In 1986, in the paper [ 1 ] junnila proved the result : a space is hereditarily metacompact iff its every scattered partion has a point finite open expansion. and in the paper [ 2 ], by the example 3. 2 zhu peiyong proved that the hereditarily paracompact spaces have no a similar characterization to junnila ' s

    Junnila在文[ 1 ]中證明了:一個空間是遺傳亞緊的當且僅當它的每個散射分解有一個點有限的開膨脹。而朱培勇在文[ 2 ]中用例3 . 2從反面證明了:遺傳仿緊空間不與空間的每個散射分解有局部有限的開膨脹等價。
  17. The paper has four parts. the first chapter, introduction, gives the origin of the problems and our main results. the second chapter proves that countable paracompact ( mesocompact, metacompact ) spaces have the characterization of junnila ' s and that hereditarily mesocompact spaces do n ' t have it. at last, we give the sufficient conditions for a space having the property that its every scattered partition has a compact - finite open expansion

    第二章詳細證明了可數仿緊(中緊、亞緊)空間有類似junnila的刻畫,遺傳中緊空間不具有類似junnila的刻畫,最後給出了正則空間的每個散射分解有緊有限的開膨脹的充要條。
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