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Sayfa 106
( 4 ) where the complex numbers u , v , w , y , and x form a parameter set for the
class of linear systems considered . We shall denote this set by A = { ( u , v , w , y ,
x ) } , and , as in ( 24 ) , we shall call it the set of singular data of system ( 1 ) .
( 4 ) where the complex numbers u , v , w , y , and x form a parameter set for the
class of linear systems considered . We shall denote this set by A = { ( u , v , w , y ,
x ) } , and , as in ( 24 ) , we shall call it the set of singular data of system ( 1 ) .
Sayfa 142
MR0948427 ( 90d : 34016 ) [ 24 ] M . Jimbo , T . Miwa , and K . Ueno ,
Monodromy preserving deformation of linear ordinary differential equations with
rational coefficients . I , Phys . D 2 ( 1981 ) , 306 – 352 . MR0630674 ( 83k :
34010a ) [ 25 ] ...
MR0948427 ( 90d : 34016 ) [ 24 ] M . Jimbo , T . Miwa , and K . Ueno ,
Monodromy preserving deformation of linear ordinary differential equations with
rational coefficients . I , Phys . D 2 ( 1981 ) , 306 – 352 . MR0630674 ( 83k :
34010a ) [ 25 ] ...
Sayfa 142
MR0948427 ( 900 : 34016 ) [ 24 ] M . Jimbo , T . Miwa , and K . Ueno ,
Monodromy preserving deformation of linear ordinary differential equations with
rational coefficients . I , Phys . D 2 ( 1981 ) , 306 – 352 . MR0630674 ( 83k :
34010a ) [ 25 ] ...
MR0948427 ( 900 : 34016 ) [ 24 ] M . Jimbo , T . Miwa , and K . Ueno ,
Monodromy preserving deformation of linear ordinary differential equations with
rational coefficients . I , Phys . D 2 ( 1981 ) , 306 – 352 . MR0630674 ( 83k :
34010a ) [ 25 ] ...
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İçindekiler
ISOMETRIC EMBEDDINGS OF FINITEDIMENSIONAL loSPACES | 23 |
Dedicated to M Sh Birman on the occasion of his 75th birthday | 285 |
ABSTRACT The nonexistence of isometric embeddings em line with p q is proved | 296 |
Telif Hakkı | |
4 diğer bölüm gösterilmiyor
Diğer baskılar - Tümünü görüntüle
Sık kullanılan terimler ve kelime öbekleri
analytic apply approximation assume asymptotic belongs BKN-equation block boundary bounded called closed coefficients collection compatible complete components condition Consequently consider constant construction contains continuous corresponding covering defined definition denote differential domain edge eigenvalues embedding English equal equation estimate example exists extension fact fibers field finite fixed formula function given graph harmonic identity implies inequality integral introduce invertible Lemma linear manifold Math Mathematical matrix monodromy Moreover norm obtain operator oriented pair particular periodic polynomial positive potential present problem proof properties Proposition prove rational relation Remark representation respect result satisfies selfadjoint separation singular smooth solution space spectral spectrum statement Subsection sufficiently Suppose surface symmetric Theorem theory transformation transl true unique values vector vertex vertices zero