Results 311 to 320 of about 956,090 (356)

The Born Rule-100 Years Ago and Today. [PDF]

Entropy (Basel)
Neumaier A.
europepmc   +1 more source

The Nullity of Compact Kahler Submanifolds in a Complex Projective Space (リーマン部分多様体の幾何学)

, 1976
良夫 木村
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The intrinsic dimension of gene expression during cell differentiation. [PDF]

Nucleic Acids Res
Biondo M, Cirone N, Valle F, Lazzardi S, Caselle M, Osella M.   +5 more
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Symmetries of complex projective spaces(Topology and Transformation Groups)

, 1985
Karl Heinz Dovermann
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Circles in a complex projective space

Circles in a complex projective space
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Trigonometric and Elliptic Ruijsenaars–Schneider Systems on the Complex Projective Space

, 2016
We present a direct construction of compact real forms of the trigonometric and elliptic $${n}$$n-particle Ruijsenaars–Schneider systems whose completed center-of-mass phase space is the complex projective space $${{\mathbb{CP}}^{n-1}}$$CPn-1 with the ...
L. Fehér, T. Görbe
semanticscholar   +1 more source

THE STABLE HOMOTOPY OF COMPLEX PROJECTIVE SPACE

The Quarterly Journal of Mathematics, 1973
G. Segal
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On Contact Submanifolds in Complex Projective Spaces

Mathematische Nachrichten, 1999
AbstractWe treat n‐dimensional real submanifolds of complex projective spaces in the case when the maximal holomorphic tangent subspace is (n ‐ 1)‐dimensional. In particular, we study the case when the induced almost contact structure on a submanifold is contact, we establish a few characteristics of the shape operator with respect to the distinguished
Djorić, Mirjana, Okumura, Masafumi
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The eigen functions of the complex projective space

Acta Mathematica Sinica, 1998
Let \(\lambda_0=0\leq \lambda_1\leq\ldots\leq \lambda_p\leq\dots,\) be the eigenvalues of the Laplace-Beltrami operator on complex projective space \(\mathbb{C} P^n\) and \({\mathcal H}_p\) be the space of eigenvectors corresponding to \(\lambda_p\).
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Calabi Product Lagrangian Immersions in Complex Projective Space and Complex Hyperbolic Space

, 2010
Starting from two Lagrangian immersions and a Legendre curve $${\tilde{\gamma}(t)}$$ in $${\mathbb{S}^3(1)}$$$$({\rm or\,in}\,{\mathbb{H}_1^3(-1)})$$, it is possible to construct a new Lagrangian immersion in $${\mathbb{CP}^n(4)}$$$$({\rm or\,in ...
Haizhong Li, Xianfeng Wang
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