Comment on "Novel Convective Instabilities in a Magnetic Fluid"

Comment on the paper "Novel Convective Instabilities in a Magnetic Fluid" by W. Luo, T. Du, and J. Huang, Phys. Rev. Lett., v.82, p.4134 (1999).Comment: 1 page, 1 figure, To appear in Phys. Rev. Lett. (2001

Universality in ultradilute liquid Bose-Bose mixtures

We have studied dilute Bose-Bose mixtures of atoms with attractive interspecies and repulsive intraspecies interactions using quantum Monte Carlo methods at T=0. Using a number of models for interactions, we determine the range of validity of the universal equation of state of the symmetric liquid mixture as a function of two parameters: the s-wave scattering length and the effective range of the interaction potential. It is shown that the Lee-Huang-Yang correction is sufficient only for extremely dilute liquids with the additional restriction that the range of the potential is small enough. Based on the quantum Monte Carlo equation of state we develop a density functional which goes beyond the Lee-Huang-Yang term and use it together with the local density approximation to determine density profiles of realistic self-bound drops.Postprint (published version

Anatomic variations of intrahepatic bile ducts in the general adult Egyptian population: 3.0-T MR cholangiography and clinical importance

AbstractObjectiveTo describe the anatomical variations occurring in intrahepatic bile ducts (IHDs) and their frequencies in general adult Egyptian population using 3.0-T MR cholangiography (MRC) as well as its clinical importance to reduce the biliary complications of hepatobiliary surgery.Materials and methodsMRC was applied to a study group of 106 subjects (26 potential liver donors and 80 volunteers). Anatomical variations in IHDs were classified based on the variable insertion of right posterior hepatic bile duct (RPHD) using Huang classification.ResultsAccording to this classification, the frequencies of each type were as follows: Huang A1 (typical pattern): 63.2% (n=67), Huang A2: 10.4% (n=11), Huang A3: 17% (n=18), Huang A4, 7.5% (n=8), and Huang A5: 1.9% (n=2). Total frequency for atypical types (i.e. A2, A3, A4 and A5) was 36.8%. No significant difference was detected in the distance between RPHD insertion to the junction of right and left hepatic duct in-between these Huang types. This distance was short (<1cm) in 21 of subjects under Huang A classification. Twenty-one donors underwent intraoperative cholangiograms, of which twenty (95.2%) had similar classification in both intraoperative and MRC findings.ConclusionThe incidence of variant biliary anatomy in general Egyptian population (36.8%) as well as the presence of Huang type A with short distance (<1cm) between RPHD insertion and junction of right and left hepatic duct (19.8%) enhance the importance of MRC as a pre-operative tool before hepato-biliary surgical procedures to reduce post-operative biliary complications

MS 223 Guide to Charles T. L. Huang, PhD Papers, 1973-2002

The Charles T. L. Huang, PhD papers contain notebooks, experiment lab data, professional papers of Dr. Huang that detail his career at Baylor College of Medicine and Texas Children\u27s Hospital. The collection consists of 5 boxes and loose materials (binders, notebooks) equaling 5 cubic feet. See more at https://archives.library.tmc.edu/ms-223

The colourful simplicial depth conjecture

Given $d+1$ sets of points, or colours, $S_1,\ldots,S_{d+1}$ in $\mathbb R^d$, a colourful simplex is a set $T\subseteq\bigcup_{i=1}^{d+1}S_i$ such that $|T\cap S_i|\leq 1$, for all $i\in\{1,\ldots,d+1\}$. The colourful Carath\'eodory theorem states that, if $\mathbf 0$ is in the convex hull of each $S_i$, then there exists a colourful simplex $T$ containing $\mathbf 0$ in its convex hull. Deza, Huang, Stephen, and Terlaky (Colourful simplicial depth, Discrete Comput. Geom., 35, 597--604 (2006)) conjectured that, when $|S_i|=d+1$ for all $i\in\{1,\ldots,d+1\}$, there are always at least $d^2+1$ colourful simplices containing $\mathbf 0$ in their convex hulls. We prove this conjecture via a combinatorial approach

On Nekrasov matrices

AbstractIn this paper we investigate nonsingularity of a generalized Nekrasov matrix and present some sufficient conditions for this matrix to be nonsingular on one hand. On the other hand, we also establish some sufficient and necessary conditions for a diagonally dominant matrix or a generalized Nekrasov matrix to be a generalized diagonally dominant matrix. All results in this presentation improve and generalize the corresponding results of Huang (T. Huang, Linear Algebra Appl. 225 (1995) 237) and Szulc (T. Szulc, Linear Algebra Appl. 225 (1995) 221)

Hsiao T. Huang v. Atty Gen USA

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