symmetric product of a Riemann surfacegeometric quantizationholomorphic Euler characteristicsIn this paper, we calculate the dimension of the Hilbert space of Kahler quantization of the moduli space of vortices on a Riemann surface. This dimension is given by the holomorphic Euler...
9.dimension of Hilbert space希尔伯特空间的维数 10.A one - dimensional array.矢量,矢径一维数组 11.The Hausdorff Dimension of a Class of Sub-cookie-cutter Sets;一类子切饼集的Hausdorff维数 12.Hausdorff Dimension of Some Reduced Homogeneous Moran Sets;裁元齐次Moran集的Hausdorff维数 13.The Hausdorff ...
the Hilbert Space-Filling Curve:希尔伯特空间填充曲线 热度: 相关推荐 ONTHEDIMENSIONOFTHEHILBERTSCHEMEOFCURVES DAWEICHEN Abstract.ConsideranirreduciblecomponentoftheHilbertschemewhose generalpointparameterizesadegreedgenusgsmoothirreducibleandnon- degeneratecurveinaprojectivevarietyX.Wegivelowerboundsforthe dimensionof...
We find a chirality-reversal phenomenon in a ring cavity where the radiation field reveals the missing dimension of the Hilbert space, known as the Jordan vector. This phenomenon demonstrates that the radiation field of an emitter can become fully decoupled from the eigenstates of its environment....
The dimension of the Hilbert space is found to depend on the `Barbero-Immirzi' like parameter in an interesting fashion. Comparative study of this ... SKP Rudranil Basu - arXiv 被引量: 12发表: 2009年 加载更多来源期刊 Chinese Science Bulletin 1992 站内活动 ...
K. Borsuk, “On the k-independent subsets of the Euclidean space and of the Hilbert space,” Bull. Acad. Pol. Sci., Cl. 3,5, No. 4, 351–356 (1957). Google Scholar K. Borsuk, “Concerning the dimension of ANR-sets,” Bull. Acad. Pol. Sci., Ser. Sci. Math., Astron, Phys...
Let H be a Hilbert space. If Ed ⊂ H is a d-dimensional linear subspace, then a linear operator L maps a d-dimensional ellipsoid Bd ⊂ Ed into a d-dimensional ellipsoid L (Bd) ⊂ L (Ed). In a Hilbert space, a volume vold(Bd) of a d-dimensional ellipsoid is well-defined....
On the Dimension of Hilbert Space Remainders A remainder of the Hilbert space is the complement of the Hilbert space in its metrizable compactification. We prove that for any remainder K of the Hilbert space, every non-one-point closed image of K is either uncountable-dimensional o... DJV...
the generalization of this property tovector spacesand toHilbert space. the generalization of this property to fractals, which can have dimensions that are nonintegerreal numbers. extension in time: Space-time has three dimensions of space and one of time. ...
p-ADIC HILBERT SPACE REPRESENTATION OF QUANTUM SYSTEMS WITH AN INFINITE NUMBER OF DEGREES OF FREEDOM Gaussian measures on infinite-dimensional p-adic spaces are introduced and the corresponding L2-spaces of p-adic valued square integrable functions are con... S Albeverio,A Khrennikov - 《Internati...