6,816 research outputs found
Level 1 Perfect Crystals and Path Realizations of Basic Representations at q=0
We present a uniform construction of level 1 perfect crystals
for all affine Lie algebras. We also introduce the notion of a crystal algebra
and give an explicit description of its multiplication. This allows us to
determine the energy function on completely and
thereby give a path realization of the basic representations at in the
homogeneous picture
MRI Visualization of Whole Brain Macro- and Microvascular Remodeling in a Rat Model of Ischemic Stroke: A Pilot Study
Using superparamagnetic iron oxide nanoparticles (SPION) as a single contrast agent, we investigated dual contrast cerebrovascular magnetic resonance imaging (MRI) for simultaneously monitoring macro- and microvasculature and their association with ischemic edema status (via apparent diffusion coefficient [ADC]) in transient middle cerebral artery occlusion (tMCAO) rat models. High-resolution T1-contrast based ultra-short echo time MR angiography (UTE-MRA) visualized size remodeling of pial arteries and veins whose mutual association with cortical ischemic edema status is rarely reported. ??R2?????R2*-MRI-derived vessel size index (VSI) and density indices (Q and MVD) mapped morphological changes of microvessels occurring in subcortical ischemic edema lesions. In cortical ischemic edema lesions, significantly dilated pial veins (p???=???0.0051) and thinned pial arteries (p???=???0.0096) of ipsilateral brains compared to those of contralateral brains were observed from UTE-MRAs. In subcortical regions, ischemic edema lesions had a significantly decreased Q and MVD values (p???<???0.001), as well as increased VSI values (p???<???0.001) than normal subcortical tissues in contralateral brains. This pilot study suggests that MR-based morphological vessel changes, including but not limited to venous blood vessels, are directly related to corresponding tissue edema status in ischemic stroke rat models
Crystal bases for quantum affine algebras and Young walls
AbstractWe provide a unified approach to the Young wall description of crystal graphs for arbitrary level irreducible highest weight representations over classical quantum affine algebras. The crystal graph is realized as the affine crystal consisting of all reduced Young walls built on a ground-state wall
Young Wall Realization of Crystal Bases for Classical Lie Algebras
In this paper, we give a new realization of crystal bases for finite
dimensional irreducible modules over classical Lie algebras. The basis vectors
are parameterized by certain Young walls lying between highest weight and
lowest weight vectors.Comment: 27page
Young wall realization of crystal graphs for U_q(C_n^{(1)})
We give a realization of crystal graphs for basic representations of the
quantum affine algebra U_q(C_n^{(1)}) using combinatorics of Young walls. The
notion of splitting blocks plays a crucial role in the construction of crystal
graphs
A COMBINATORIAL APPROACH TO ROOT MULTIPLICITIES OF RANK 2 HYPERBOLIC KAC-MOODY ALGEBRAS
In this paper we study root multiplicities of rank 2 hyperbolic Kac-Moody algebras using the combinatorics of Dyck paths
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