Proof of Wahl's Conjecture on Surjectivity of the Gaussian Map for Flag Varieties

Shrawan Kumar

doi:10.2307/2374759

Proof of Wahl's Conjecture on Surjectivity of the Gaussian Map for Flag Varieties

American Journal of Mathematics ◽

10.2307/2374759 ◽

1992 ◽

Vol 114 (6) ◽

pp. 1201 ◽

Cited By ~ 6

Author(s):

Shrawan Kumar

Keyword(s):

Flag Varieties ◽

Gaussian Map ◽

Wahl’S Conjecture

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Tropical flag varieties

Advances in Mathematics ◽

10.1016/j.aim.2021.107695 ◽

2021 ◽

Vol 384 ◽

pp. 107695

Author(s):

Madeline Brandt ◽

Christopher Eur ◽

Leon Zhang

Keyword(s):

Flag Varieties

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Projective normality of torus quotients of flag varieties

Journal of Pure and Applied Algebra ◽

10.1016/j.jpaa.2020.106389 ◽

2020 ◽

Vol 224 (10) ◽

pp. 106389

Author(s):

Arpita Nayek ◽

S.K. Pattanayak ◽

Shivang Jindal

Keyword(s):

Flag Varieties ◽

Projective Normality

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Euler characteristics in the quantum K-theory of flag varieties

Selecta Mathematica ◽

10.1007/s00029-020-00557-7 ◽

2020 ◽

Vol 26 (2) ◽

Author(s):

Anders S. Buch ◽

Sjuvon Chung ◽

Changzheng Li ◽

Leonardo C. Mihalcea

Keyword(s):

Flag Varieties ◽

Euler Characteristics ◽

K Theory

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Gaussian map based acoustic model adaptation using untranscribed data for speech recognition in severely adverse environments

10.21437/interspeech.2012-481 ◽

2012 ◽

Author(s):

Wooil Kim ◽

John H. L. Hansen

Keyword(s):

Speech Recognition ◽

Acoustic Model ◽

Model Adaptation ◽

Gaussian Map ◽

Adverse Environments

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Chaotic Itinerancy Observed in Mutually Coupled Gaussian Maps

International Journal of Bifurcation and Chaos ◽

10.1142/s0218127418300112 ◽

2018 ◽

Vol 28 (04) ◽

pp. 1830011

Author(s):

Mio Kobayashi ◽

Tetsuya Yoshinaga

Keyword(s):

Dynamical System ◽

Fixed Point ◽

Chaotic Behavior ◽

Periodic Points ◽

Two Dimensional ◽

Stable Fixed Point ◽

Bifurcation Structure ◽

Unstable Fixed Point ◽

Gaussian Map ◽

Gaussian Maps

A one-dimensional Gaussian map defined by a Gaussian function describes a discrete-time dynamical system. Chaotic behavior can be observed in both Gaussian and logistic maps. This study analyzes the bifurcation structure corresponding to the fixed and periodic points of a coupled system comprising two Gaussian maps. The bifurcation structure of a mutually coupled Gaussian map is more complex than that of a mutually coupled logistic map. In a coupled Gaussian map, it was confirmed that after a stable fixed point or stable periodic points became unstable through the bifurcation, the points were able to recover their stability while the system parameters were changing. Moreover, we investigated a parameter region in which symmetric and asymmetric stable fixed points coexisted. Asymmetric unstable fixed point was generated by the [Formula: see text]-type branching of a symmetric stable fixed point. The stability of the unstable fixed point could be recovered through period-doubling and tangent bifurcations. Furthermore, a homoclinic structure related to the occurrence of chaotic behavior and invariant closed curves caused by two-periodic points was observed. The mutually coupled Gaussian map was merely a two-dimensional dynamical system; however, chaotic itinerancy, known to be a characteristic property associated with high-dimensional dynamical systems, was observed. The bifurcation structure of the mutually coupled Gaussian map clearly elucidates the mechanism of chaotic itinerancy generation in the two-dimensional coupled map. We discussed this mechanism by comparing the bifurcation structures of the Gaussian and logistic maps.

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Chow groups of some generically twisted flag varieties

Annals of K-Theory ◽

10.2140/akt.2017.2.341 ◽

2017 ◽

Vol 2 (2) ◽

pp. 341-356 ◽

Cited By ~ 5

Author(s):

Nikita Karpenko

Keyword(s):

Chow Groups ◽

Flag Varieties

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Inversions Within Restricted Fillings of Young Tableaux

The Electronic Journal of Combinatorics ◽

10.37236/1030 ◽

2006 ◽

Vol 13 (1) ◽

Cited By ~ 3

Author(s):

Sarah Iveson

Keyword(s):

Upper Bound ◽

Exact Expression ◽

Flag Varieties ◽

Young Tableaux ◽

Geometric Properties ◽

Number Of Components ◽

Hessenberg Varieties ◽

Special Cases

In this paper we study inversions within restricted fillings of Young tableaux. These restricted fillings are of interest because they describe geometric properties of certain subvarieties, called Hessenberg varieties, of flag varieties. We give answers and partial answers to some conjectures posed by Tymoczko. In particular, we find the number of components of these varieties, give an upper bound on the dimensions of the varieties, and give an exact expression for the dimension in some special cases. The proofs given are all combinatorial.

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