St. Petersburg Mathematical Journal, 8. cilt,1-542. sayfalarAmerican Mathematical Society, 1997 |
Kitabın içinden
25 sonuçtan 1-3 arası sonuçlar
Sayfa 183
... torus : the Koopman operator on invariant lattices and pe- riodic orbits ; limits of atomic invariant measures supported on periodic orbits via Kloosterman sums ] §3 . Representations of the discrete Heisenberg group and quantiza- tion ...
... torus : the Koopman operator on invariant lattices and pe- riodic orbits ; limits of atomic invariant measures supported on periodic orbits via Kloosterman sums ] §3 . Representations of the discrete Heisenberg group and quantiza- tion ...
Sayfa 199
... torus . Now we generalize the above canonical quantization procedure to the case where the phase space is the torus T2 , so that the underlying Heisenberg group is a subgroup of H2 ( R ) denoted by Hɲ ( Z ) . First , we note that the ...
... torus . Now we generalize the above canonical quantization procedure to the case where the phase space is the torus T2 , so that the underlying Heisenberg group is a subgroup of H2 ( R ) denoted by Hɲ ( Z ) . First , we note that the ...
Sayfa 275
... torus with respect to 9H20 in R4 , ( because , obviously , A2 is compact ) , and A2 = ( P1,2,1,2 € Ã2 , p3 = x3 = 0 ) is an isotropic two - dimensional torus in Ro , invariant with respect to g ( see , e.g. , [ A ] ) . We are concerned ...
... torus with respect to 9H20 in R4 , ( because , obviously , A2 is compact ) , and A2 = ( P1,2,1,2 € Ã2 , p3 = x3 = 0 ) is an isotropic two - dimensional torus in Ro , invariant with respect to g ( see , e.g. , [ A ] ) . We are concerned ...
İçindekiler
REPRESENTATION OF A FORM | 17 |
10 The automorphism groups of discriminant forms | 59 |
12 A general formula for the weight of representations | 65 |
Telif Hakkı | |
5 diğer bölüm gösterilmiyor
Diğer baskılar - Tümünü görüntüle
Sık kullanılan terimler ve kelime öbekleri
2can a₁ arbitrary assume assumptions asymptotics b₁ boundary bounded classical coefficients compact condition congruence constant construction convex convex hull corresponding curvature curve decomposition defined definition denote differential dimension discrete domain eigenfunctions eigenvalues elliptic English transl equation ergodic estimate exists finite fixed formula function genus gradient flow Grassmannians H₁ Hilbert space implies inequality integral invariant inverse isometric isospectral labeled graph lattice Lemma linear M₁ manifolds Math Mathematics Subject Classification matrix Moreover Morse functions nonzero obtain orbifolds orthogonal parameter periodic orbits perturbation Phys positive potential problem Proposition prove quadratic forms quantization quantum relation respect result satisfies Schrödinger equation Schrödinger operator selfadjoint semiclassical solutions space spectral spectrum square free Subsection subspace symbol symmetric theory vector wavelet Wiener zero