例句與造句

1. A class of lattice - subspace in regular operator space
   正則算子空間上的一類格子空間
2. The main purpose of the thesis is to study the existence of strongly non - regular operators between classical banach lattices
   最后，本文的主要目的是研究經(jīng)典banach格上強非正則算子的存在性。
3. Chapter 4 is mainly about the properties of regular operators . we give two examples to show that regular norm and operator norm may not equal to each other and the module for operator on banach lattice may not exist firstly
   第四章研究了一類正則算子的性質，首先行出例子說明正則范數(shù)與算子范數(shù)一般不相等，而且對任意算子不一定有模存在
4. Then the relation of regular operators , bounded operators and linear operators on banach lattices are given , that is lr ( e , f ) lb ( e , f ) l ( e , f ) ; order dual , operator dual and algebra dual are related , i . e . e " c e * c e #
   然后給出banach格空問上正則算子，有界算子和線性算子的關系： lve ； f ） of 。 ef ） clp ， f ） ；給出了序對偶，算子對偶和代數(shù)對偶的關系： e ’ ce ” ce個然后引入賦值映射人證明了j是保格運算的格同態(tài)
5. Then the order bound norm imposed on the order bounded operators between two banach lattices is fully studied . the results include the relationships between the order bound norm and the other two types of norms of a regular operator ; respectively , and a condition under which the space of order bounded operators is a dedekind complete banach lattice
   接著討論了banach格間序有界算子的序有界范數(shù)，詳細論證了正則算子的(一致)算子范數(shù)、正則范數(shù)和序有界范數(shù)三者之間的關系，并得到了序有界算子空間在序有界范數(shù)之下是dedekind完備banach格的一個條件。
6. It's difficult to find regular operator in a sentence. 用regular operator造句挺難的
7. Alternatively , we investigate the relationships between the space of bounded operators and its regular operator subspace with respect to the operator norm topology , thereby answering partially the question of how big the regular operator subspace is and discussing the existence of strongly non - regular operators between some classical banach lattices
   這里把這一問題轉化為考察有界線性算子空間與它的正則算子子空間在(一致)算子拓撲之下的關系，從而部分的回答了正則算子集合在有界線性算子空間中有多大的問題，解決了經(jīng)典banach格上強非正則算子的存在性。