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Sayfa 783
If H is a Harish - Chandra submodule of V , i . e . , H = ( Hn V ( A ) ) , then there
arises the collection of subspaces H ( a ) = Homp ... A vector & is said to be K -
finite if the subspace generated by the vectors 7 ( u ) for u € K is finite -
dimensional .
If H is a Harish - Chandra submodule of V , i . e . , H = ( Hn V ( A ) ) , then there
arises the collection of subspaces H ( a ) = Homp ... A vector & is said to be K -
finite if the subspace generated by the vectors 7 ( u ) for u € K is finite -
dimensional .
Sayfa 785
2 of [ 11 ] , we note that a closed subspace U CE ( 0 ) is a cell of some ISS if and
only if U is invariant with respect to the ... du The G . JK Such subspaces were
studied in [ 13 ] , and Theorem 1 with 1 = 0 follows from the results of that paper .
2 of [ 11 ] , we note that a closed subspace U CE ( 0 ) is a cell of some ISS if and
only if U is invariant with respect to the ... du The G . JK Such subspaces were
studied in [ 13 ] , and Theorem 1 with 1 = 0 follows from the results of that paper .
Sayfa 1138
Reversing the argument just used , we can show that the operator PL + , where P
is the projection onto the subspace orthogonal to 4 , also has a negative
eigenvalue E : PL + y = Ey , yle . Hence L + y = Ey + ag for some a . Consequently
, ( L ...
Reversing the argument just used , we can show that the operator PL + , where P
is the projection onto the subspace orthogonal to 4 , also has a negative
eigenvalue E : PL + y = Ey , yle . Hence L + y = Ey + ag for some a . Consequently
, ( L ...
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İçindekiler
HADAMARDS CONJECTURE | 634 |
Necessary facts about Sobolev spaces | 643 |
Elliptic differential inequalities | 655 |
Telif Hakkı | |
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According algebra analytic apply assertion assume asymptotic Banach space boundary bounded called closed complete condition cone connected Consequently consider const constant construction contains continuous corresponding cubes defined definition denote depend derivatives described determined differential direct domain eigenvalues element English transl equality equation equivalent estimate example exists extension fact field finite fixed follows formula function Further given gives hence holds implies inequality integral introduce lattice Lemma limit linear mapping Math Mathematical matrix means measure multiplicity norm obtained Obviously operator pair particular perturbation polynomial positive possible present principle problem Proof properties Proposition proved reduced relation remains Remark representation respect satisfies scattering side smooth solution space spectral spectrum subspace sufficiently Suppose Theorem theory unique valid vector zero