St. Petersburg Mathematical Journal, 7. cilt,1-3. sayılarAmerican Mathematical Society, 1996 |
Kitabın içinden
63 sonuçtan 1-3 arası sonuçlar
Sayfa 224
... belong to the space Crt respect to the variables ≈ and t and to the space C1 + ( △ × ̄ ” ) with respect to the variables p and q . The coefficient Am ( x , t , q ) belongs to the space C2 + 1 + 1 / 2 respect to the variables x and t ...
... belong to the space Crt respect to the variables ≈ and t and to the space C1 + ( △ × ̄ ” ) with respect to the variables p and q . The coefficient Am ( x , t , q ) belongs to the space C2 + 1 + 1 / 2 respect to the variables x and t ...
Sayfa 253
... belongs to the image of the map H1 ( F [ t ] , G1 ) → H1 ( F ( t ) , G1 ) . By the theorem of Raghunathan ... belongs to the image of the map H1 ( F , G1 ) H1 ( F ( t ) , G1 ) . Finally , using the commutative H1 ( F , G1 ) ...
... belongs to the image of the map H1 ( F [ t ] , G1 ) → H1 ( F ( t ) , G1 ) . By the theorem of Raghunathan ... belongs to the image of the map H1 ( F , G1 ) H1 ( F ( t ) , G1 ) . Finally , using the commutative H1 ( F , G1 ) ...
Sayfa 305
... belongs to A2 and ƒ / 0 || af | a . So , the following statement is true ( for simplicity , we assume that f ( 0 ) 0 ) . = Theorem 2.6 . Let a € ( -1,1 ] . Iƒ ƒ € A2 , ƒ ( 0 ) 0 , then ƒ admits the factorization f = 0F , where " the ...
... belongs to A2 and ƒ / 0 || af | a . So , the following statement is true ( for simplicity , we assume that f ( 0 ) 0 ) . = Theorem 2.6 . Let a € ( -1,1 ] . Iƒ ƒ € A2 , ƒ ( 0 ) 0 , then ƒ admits the factorization f = 0F , where " the ...
İçindekiler
S Ya Khavinson Annihilator of linear superpositions | 307 |
A A Borichev and A L Volberg Finiteness of the set of limit cycles | 343 |
Burago and V A Zalgaller Isometric piecewise linear immersions | 369 |
Telif Hakkı | |
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approximation arbitrary assume automorphism b₁ boundary Brauer group charge vector coalgebra cocharacter coefficients commutative comodule condition conformal consider const Corollary corresponding defined definition denote diagram dipole edge element elliptic curve embedding English transl Eo(k equal equation equivalent estimate exact sequence exists field F finite formula functions group G homomorphism Hopf algebras implies inequality integral invariant involution isometric isometric geometrization isomorphic k₁ K₂ labeled graph Lemma manifold Math Mathematical matrix maximal block Moreover morphism multiplicative nontrivial nonzero norm obtain operator orientation polynomial problem proof of Theorem properties Proposition prove quadratic forms reduction relation representation respectively satisfies skew field space Stefan problem subgroup subspace symmetric group T₁ tableau Theorem 1.1 torus transformation triangles unramified variables vertex vertices W-structure Weierstrass equation zero σΕΣ