1) Lip n-bundle
Lip n-丛
1.
Assume that (E ,j,X) is a Lip n-microbundle, {U1,U2} is an open cover of X,ξ= (E1, j, U1) a Lip n-bundle and ξ2 = (E2 = U2×Rn,P1,U2) is the standard trivial Lip n-bundle.
设μ=(E’,j,X)是Lip n-丛,{U1,U2}是X的开复盖,ξ1=(E1,j1,U1)是Lip n-丛,且ξ2=(E2=U2×Rn,P1,U2)是标准平凡Lip n-丛。
2) Lip index
Lip指数
3) uniformly Lipschitz
一致Lip
4) ELIP
峨眉山LIP
1.
Here we present Re-Os abundances and Os isotopic compositions of 12 picrites and 6 associated basalts collected from Daju and Shiman sections,Lijiang area,western part of Emeishan large igneous province(ELIP Zhang et al,2006).
苦橄岩的Re-Os同位素特征表明,形成峨眉山LIP的地幔柱可能来自对流上地幔而不是深部的核-幔界面。
5) LIP immersion
LIP浸入
1.
if f: Δ n×U→Δ n×Q is a LIP immersion and P 1f=P 1, we call f an n dimensional simplex.
如f:Δn×U→Δn×Q是一个LIP浸入且P1f =P1,称f是一个n维单形 。
6) Lip bundle embedding
Lip嵌入
1.
This paper proves that if Fi:Ei →E | Ui,i = 1,2, are Lip bundle embeddings from ξi to μ |Ui | , there is a Lip n-bundle ξ: = (E, π, X ) satisfying ξ |U1-U2)=ξ1 |((U1-U2), and there is a Lip bundle embedding F from ξ to μ satisfying F|(E|(U1-U2))=F1| (E1|(U1-U2)).
本文证明了如Fi:Ei→E’|Ui,i=1,2,是由ξi到μ|Ui的Lip丛嵌入,则存在Lipn-从ξ=(E,π,X)满足ξ|(U1-U2)=ξ1|(U1-U2)|且存在由ξ到μ的Lip嵌入F满足F|(E|(U1-U2)=F1|(E1|(U1-U2))。
补充资料:丛丛
1.形容人或物聚集的样子。
说明:补充资料仅用于学习参考,请勿用于其它任何用途。
参考词条