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Coarse obstructions to positive scalar curvature metrics in noncompact quotients of symmetric spaces /by Stanley S. Chang.Chang, Stanley S. January 1999 (has links)
Thesis (Ph. D.)--University of Chicago, Dept. of Mathematics, June 1999. / Includes bibliographical references. Also available on the Internet.
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Index and stability in bimatrix games a geometric-combinatorial approach /Schemde, Arndt von. January 1900 (has links)
Thesis (Ph. D.)--School of Economics and Political Science, London. / In: MyiLibrary. Visionné le 1er mai 2009. Description based on print version record. Comprend des références bibliographiques.
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Index and stability in bimatrix games a geometric-combinatorial approach /Schemde, Arndt von. January 1900 (has links)
Thesis (Ph. D.)--School of Economics and Political Science, London.
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Index and stability in bimatrix games a geometric-combinatorial approach /Schemde, Arndt von. January 1900 (has links)
Thesis (Ph. D.)--School of Economics and Political Science, London. / Includes bibliographical references and indexes.
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Index and stability in bimatrix games a geometric-combinatorial approach /Schemde, Arndt von. January 1900 (has links)
Thesis (Ph. D.)--School of Economics and Political Science, London. / Title from e-book title screen (viewed November 16, 2007). Includes bibliographical references and indexes.
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Index pairs : from dynamics to combinatorics and backSyzmczak, Andrzej 05 1900 (has links)
No description available.
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An Embedded Toeplitz ProblemOrdonez-Delgado, Bartleby 05 October 2010 (has links)
In this work we investigate multi-variable Toeplitz operators and their relationship with KK-theory in order to apply this relationship to define and analyze embedded Toeplitz problems. In particular, we study the embedded Toeplitz problem of the unit disk into the unit ball in C^2. The embedding of Toeplitz problems suggests a way to define Toeplitz operators over singular spaces. / Ph. D.
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Equivariant index theory and non-positively curved manifoldsShan, Lin. January 2007 (has links)
Thesis (Ph. D. in Mathematics)--Vanderbilt University, May 2007. / Title from title screen. Includes bibliographical references.
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Almost CR Quantization via the Index of Transversally Elliptic Dirac OperatorsFitzpatrick, Daniel 18 February 2010 (has links)
Let $M$ be a smooth compact manifold equipped with a co-oriented subbundle
$E\subset TM$. We suppose that a compact Lie group $G$ acts on $M$ preserving $E$, such that the $G$-orbits are transverse to $E$.
If the fibres of $E$ are equipped with a complex structure then it is possible to construct a $G$-invariant Dirac operator $\dirac$ in terms of the resulting almost CR structure.
We show that there is a canonical equivariant differential form with generalized coefficients $\mathcal{J}(E,X)$ defined on $M$ that depends only on the $G$-action and the co-oriented subbundle $E$. Moreover, the group action is such that $\dirac$ is a $G$-transversally elliptic
operator in the sense of Atiyah \cite{AT}. Its index is thus defined as a generalized function on $G$. Beginning with the equivariant index formula of Paradan and
Vergne \cite{PV3}, we obtain an index
formula for $\dirac$ computed as an integral over $M$ that is free of choices and growth conditions. This formula necessarily involves equivariant differential forms
with generalized coefficients and we show that the only such form required is the
canonical form $\mathcal{J}(E,X)$.
In certain cases the index of $\dirac$ can be interpreted
in terms of a CR analogue of the space of holomorphic sections, allowing us to
view our index formula as a character formula for the $G$-equivariant quantization of the almost CR manifold $(M,E)$. In particular, we obtain the ``almost CR'' quantization of a contact manifold, in a manner directly analogous to the almost complex quantization of a symplectic manifold.
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Almost CR Quantization via the Index of Transversally Elliptic Dirac OperatorsFitzpatrick, Daniel 18 February 2010 (has links)
Let $M$ be a smooth compact manifold equipped with a co-oriented subbundle
$E\subset TM$. We suppose that a compact Lie group $G$ acts on $M$ preserving $E$, such that the $G$-orbits are transverse to $E$.
If the fibres of $E$ are equipped with a complex structure then it is possible to construct a $G$-invariant Dirac operator $\dirac$ in terms of the resulting almost CR structure.
We show that there is a canonical equivariant differential form with generalized coefficients $\mathcal{J}(E,X)$ defined on $M$ that depends only on the $G$-action and the co-oriented subbundle $E$. Moreover, the group action is such that $\dirac$ is a $G$-transversally elliptic
operator in the sense of Atiyah \cite{AT}. Its index is thus defined as a generalized function on $G$. Beginning with the equivariant index formula of Paradan and
Vergne \cite{PV3}, we obtain an index
formula for $\dirac$ computed as an integral over $M$ that is free of choices and growth conditions. This formula necessarily involves equivariant differential forms
with generalized coefficients and we show that the only such form required is the
canonical form $\mathcal{J}(E,X)$.
In certain cases the index of $\dirac$ can be interpreted
in terms of a CR analogue of the space of holomorphic sections, allowing us to
view our index formula as a character formula for the $G$-equivariant quantization of the almost CR manifold $(M,E)$. In particular, we obtain the ``almost CR'' quantization of a contact manifold, in a manner directly analogous to the almost complex quantization of a symplectic manifold.
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