An Extension of the Lefschetz Intersection Theory |
From inside the book
Results 1-3 of 17
Page 5
Madeline Levin. This same property holds for the chains Cp and F ( Cq ) , for F ( Cp ) and Cq , and for F ( C ) and F ( C ) with different va- lues depending e , d1 ′ ( e ) , d1⁄2 ′ ( € ) , d ′′ ( e ) respectively , and 8 " L di Lô , i ...
Madeline Levin. This same property holds for the chains Cp and F ( Cq ) , for F ( Cp ) and Cq , and for F ( C ) and F ( C ) with different va- lues depending e , d1 ′ ( e ) , d1⁄2 ′ ( € ) , d ′′ ( e ) respectively , and 8 " L di Lô , i ...
Page 10
... chains of F ( Cp ) first into F ( C ) then into ra and the difference between the deformation chains of F ( Cq ) first into F ( C ) then into T - 1 , onto Ka - L and Ka ' + Da ' respec- tively , into the chains . P - 1 10 -- ( 5 ) : α x ...
... chains of F ( Cp ) first into F ( C ) then into ra and the difference between the deformation chains of F ( Cq ) first into F ( C ) then into T - 1 , onto Ka - L and Ka ' + Da ' respec- tively , into the chains . P - 1 10 -- ( 5 ) : α x ...
Page 12
... chains lie in the neighborhoods indicated , as follows : The deformations of F ( Cp ) into F ( C ) and Tp - 1 α are 6 , ( see ( 2 ' ) N. ° 8 ) , so that the difference between the deformation chains is within 6μ of F ( Cp ) . The ...
... chains lie in the neighborhoods indicated , as follows : The deformations of F ( Cp ) into F ( C ) and Tp - 1 α are 6 , ( see ( 2 ' ) N. ° 8 ) , so that the difference between the deformation chains is within 6μ of F ( Cp ) . The ...
Common terms and phrases
1.h.f. about G another's boundaries approximations ARBITRARY CHAINS boundaries on K-L boundary relation C₁ call the point cells chains Cp chains not meeting concordantly oriented Cp and C₁ Cp and Ca Cp F Cq Cp.F(Cq Cp₁ Cp₂ Cq on K-L cycles mod cycles on K-L d₁ Definition deformation chains Denote distance on K-N dual of K-L F Cp F(C₁ F(Cp F(Cp.Cq F(Cpk F(Cq families of cycles G to K-N G+ G₂ G₁ h. f. mod h. f. on K-L homologous Hẞ infinite sequence KB-L L₁ L₂ Lefschetz intersection theory manifold meeting one another's mesh of K mesh of KY mod L mod N+N N₁ N₂ Pj-1 Pr point set common PRINCIPAL THEOREM respectively singular chains subcomplexes Topology Us-1 mod α α α κα αγ αβ βγ Διαγ κα α κα αγ καγ