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Alexander Rand
Researcher at CD-adapco
Publications - 32
Citations - 838
Alexander Rand is an academic researcher from CD-adapco. The author has contributed to research in topics: Regular polygon & Ruppert's algorithm. The author has an hindex of 15, co-authored 31 publications receiving 769 citations. Previous affiliations of Alexander Rand include New Mexico Institute of Mining and Technology & Carnegie Mellon University.
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Development of multimarker panel for early detection of endometrial cancer. High diagnostic power of prolactin
Zoya R. Yurkovetsky,Shlomo Ta'asan,S Skates,Alexander Rand,Aleksey Lomakin,Faina Linkov,Adele Marrangoni,Lyudmila Velikokhatnaya,Matthew Winans,Elieser Gorelik,G. Larry Maxwell,Karen H. Lu,Anna Lokshin +12 more
TL;DR: The ability of prolactin to accurately discriminate between cancer and control groups indicates that this biomarker could potentially be used for development of blood-based test for the early detection of endometrial cancer in high-risk populations.
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Multiplex Assessment of Serum Biomarker Concentrations in Well-Appearing Children With Inflicted Traumatic Brain Injury
TL;DR: Using multiplex bead technology, significant changes in the serum biomarker profile after mild ITBI are suggested and future research is needed to determine whether these biomarkers can screen for brain injury in infants with nonspecific symptoms.
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Error estimates for generalized barycentric interpolation
TL;DR: It is proved that the optimal convergence estimate for first-order interpolants used in finite element methods based on three major approaches for generalizing barycentric interpolation functions to convex planar polygonal domains is correct.
Journal ArticleDOI
Quadratic serendipity finite elements on polygons using generalized barycentric coordinates.
TL;DR: A finite element construction for use on the class of convex, planar polygons and it is shown it obtains a quadratic error convergence estimate.
Posted Content
Quadratic Serendipity Finite Elements on Polygons Using Generalized Barycentric Coordinates
TL;DR: In this article, a finite element construction for use on the class of convex, planar polygons was introduced, which obtained a quadratic error convergence estimate on a convex n-gon satisfying simple geometric criteria.