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Sayfa 104
Combinatorial polynomial of a face of a triangulation of A . Let A be as in
Subsection 1 . 1 , and let & be a regular triangulation of A ( see Subsection 2 . 1 )
. As in ( 1 ) , for any simplex t belonging to £ ( possibly , T = Ø ) we define the ...
Combinatorial polynomial of a face of a triangulation of A . Let A be as in
Subsection 1 . 1 , and let & be a regular triangulation of A ( see Subsection 2 . 1 )
. As in ( 1 ) , for any simplex t belonging to £ ( possibly , T = Ø ) we define the ...
Sayfa 106
+ | FIGURE 1 . Corollary ( see Subsection 3 . 4 ) . For any expression expr ( 7 ) ,
we have - ) = s ( t ) e ( + ) 2 + ( 7 ) expr ( 7 ) . 4 . 2 . Lemma . In the notation of
Subsection 2 . 3 , the set ( Et ] is a deformation retract of A + ( see Figure 1 ) .
Proof .
+ | FIGURE 1 . Corollary ( see Subsection 3 . 4 ) . For any expression expr ( 7 ) ,
we have - ) = s ( t ) e ( + ) 2 + ( 7 ) expr ( 7 ) . 4 . 2 . Lemma . In the notation of
Subsection 2 . 3 , the set ( Et ] is a deformation retract of A + ( see Figure 1 ) .
Proof .
Sayfa 226
Then sh(V,n) = (-l)J]e(W,n). Theorem 2.6 is proved in Subsection 6. A. 2.E. Odd-
dimensional real varieties. For even-dimensional armed varieties, the shade
number is a topological invariant. This is not the case in odd dimensions. As we
shall ...
Then sh(V,n) = (-l)J]e(W,n). Theorem 2.6 is proved in Subsection 6. A. 2.E. Odd-
dimensional real varieties. For even-dimensional armed varieties, the shade
number is a topological invariant. This is not the case in odd dimensions. As we
shall ...
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algebraic analytic apply assume basis boundary bounded called chain homotopy closed coefficients complex computation condition connection Consequently consider constant construction contains continuous convex corresponding defined definition deformation denote determined differential domain element equal equation equivalence estimate example exists extension fact field finite fixed formula function given identity implies inequality integral intersection introduce invariant inverse isomorphism Lemma linear Math Mathematical matrix measure metric Moreover natural normal Observe obtain Obviously operator orientation particular periodic positive present problem projective Proof properties Proposition prove regular relation Remark respectively result ring satisfies scheme sequence singular smooth solutions space standard statement Subsection suffices Suppose takes Theorem theory transformation true twists unique vector weight zero