St. Petersburg Mathematical Journal, 16. ciltAmerican Mathematical Society, 2005 |
Kitabın içinden
26 sonuçtan 1-3 arası sonuçlar
Sayfa 119
... Figure 1. The sectors Lk are presented in Figure 2 . Our goal in this section is to prove the following theorem . Theorem 4 ( The Sibuya theorem with a parameter ). FIGURE 2. The sectors Lk . FIGURE 3. The set + = C \ U1 = ON THE INVERSE ...
... Figure 1. The sectors Lk are presented in Figure 2 . Our goal in this section is to prove the following theorem . Theorem 4 ( The Sibuya theorem with a parameter ). FIGURE 2. The sectors Lk . FIGURE 3. The set + = C \ U1 = ON THE INVERSE ...
Sayfa 122
FIGURE 4. The set N = Uk1 . Let On be the boundary of .. Then ~ == Uk k = ank , k and we assume that each and is ... Figure 5. Observe that the properties of the sets + and N imply the following properties of the set No : • No = U1 = 1Wk ...
FIGURE 4. The set N = Uk1 . Let On be the boundary of .. Then ~ == Uk k = ank , k and we assume that each and is ... Figure 5. Observe that the properties of the sets + and N imply the following properties of the set No : • No = U1 = 1Wk ...
Sayfa 273
... FIGURE 2 y = Q1 ( x ) +7 ( x ) Q , ( x ) S2 y = Q2 ( x ) S1 y = Q , ( x ) x b FIGURE 3 Theorem 3. The pair ( S1 , S2 ) does not admit separation in C + . Remark . In [ 11 ] it was shown that if 41 , 42 € C1 + ε ( [ 0 , b ] ) , then the ...
... FIGURE 2 y = Q1 ( x ) +7 ( x ) Q , ( x ) S2 y = Q2 ( x ) S1 y = Q , ( x ) x b FIGURE 3 Theorem 3. The pair ( S1 , S2 ) does not admit separation in C + . Remark . In [ 11 ] it was shown that if 41 , 42 € C1 + ε ( [ 0 , b ] ) , then the ...
İçindekiler
ISOMETRIC EMBEDDINGS OF FINITEDIMENSIONAL pSPACES | 11 |
OVER THE QUATERNIONS | 104 |
1 Introduction | 117 |
Telif Hakkı | |
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analytic approximation assume asymptotic Birman BKN-equation bounded C(zIm coefficients cohomology classes compatible components constant corresponding defined denote diffeomorphism Dirac operator domain edge eigenvalues embedding English transl estimate Euler characteristic exists finite formula geodesic graph graph-manifold harmonic Hilbert space holomorphic implies inequality integral invertible isometric K₁ kernel Lemma length function linear Math matrix matrix-valued function maximal blocks meromorphic monodromy nonzero norm NPC-solution obtain oriented Painlevé equations pair paper polynomial positive potential problem proof of Theorem properties Proposition prove rational refinable function relation representation respect result Riemann-Hilbert Riemann-Hilbert problem Riemannian manifold S₁ satisfies Schrödinger operator Seifert fibered space self-affine selfadjoint selfadjoint operators singular Sobolev Sobolev spaces solution spectrum Subsection subspace supp Suppose symmetric Theorem Theorem 3.1 theory torus vector vertex vertices zero