On The Maps Of An N-sphere Into Another N-sphere On the maps of an nsphere into another n-sphere euclid.dmj/1077489916 Citation Duke Math. J. 3 (1937), no. 1, 46-50 whitney, hassler hassler whitney http://rdre1.inktomi.com/click?u=http://ProjectEuclid.org/getRecord?id=euclid.dm
Harvard University Tygar, Doug (1986); Udin, David (1977); Wegbreit, Ben (unknown year); whitney,hassler (1932); Willard, Dan (1978); Wrathall, Celia (1976); Yao, Andy (1972). http://sigact.acm.org/genealogy/index-Harvard.html
The Maps Of An N-complex Into An N-sphere The maps of an ncomplex into an n-sphere euclid.dmj/1077489917 Citation Duke Math. J. 3 (1937), no. 1, 51-55 whitney, hassler hassler whitney http://rdre1.inktomi.com/click?u=http://ProjectEuclid.org/getRecord?id=euclid.dm
AIM Reprint Library: Listing for whitney, hassler. Viewing Page 110 11-20 21-23 NEXT . 1. MathNotes. whitney, hassler. 2. The Mathematics of Physical Quantities Part II. http://www.aimath.org/library/library.cgi?database=reprints;mode=display;BrowseT
Extractions: Analysis of Regular Isotopies on Torus Knots Based on Projections in 3-Space Mark Branson with Dr. Andrew Miller Abstract: This project focuses on graphical analysis of projections of torus knots using the program Mathematica. The primary effort centers on finding regular isotopy classes by examining analytically the points on the curve where the first Reidemeister move occurs. Since the first Reidemeister move involves untwisting a single loop, cusps (points where the curvature of the graph is undefined) form as the projections continuously move from a projection with a loop to one without a loop. The goal of this project is to determine the points at which these cusps occur for an arbitrary torus knot and to prove that the resulting curve on the viewing sphere (each projection can be identified with the viewpoint that it is viewed from) divides the set of projections into regular isotopy classes. Contents I. Torus Knots II. Diagrams and Isotopies III. Invariants IV. Projections and the Viewing Sphere V. Regions of Regular Isotopies VI.
AIM Reprint Library: Translate this page Tamsen Whiteman, Albert Whitenead, JHC Whitley, E. whitney R. whitney, A. whitney,AM whitney, Anne whitney, EL whitney, H. whitney, hassler Whittle, G. Whittle http://www.aimath.org/library/library.cgi?database=reprints;mode=display;BrowseL
National Academy Of Sciences Whiting, John W. Whitman, CO. Whitmore, Frank Clifford. whitney, hassler. whitney,Willis R. Whittaker, Robert H. Whyburn, Gordon T. Wick, GianCarlo. http://www4.nationalacademies.org/nas/nasdece.nsf/urllinks/$$AlphaListW?OpenDocu
Hassler Whitney (1907-1989) hassler whitney. Who Was Who in America, vol. X, pp. 385386 whitney,hassler, mathematician; b. NYC, Mar. 23, 1907; s. Edward http://www.whitneygen.org/archives/biography/hassler.html
Extractions: Who Was Who in America , vol. X, pp. 385-386: WHITNEY, HASSLER, For a mathematical biography, see the one at the MacTutor History of Mathematics Archive at St. Andrews University, Scotland. His collected papers have been published, and can be purchased on-line at Amazon.com In addition to an illustrious career as a mathematician, culminating with the Wolf Prize in 1982 and the Steele Prize in 1985 , he was also an avid mountain-climber. The Whitney-Gilman Ridge in New Hampshire was named for him and a cousin, who were the first to climb it. For more on that aspect of his life, see a rock climbing web page created by his grandson. His lineage: Hassler WHITNEY (Edward Baldwin , William Dwight , Josiah Dwight , Abel , Aaron , Moses , Moses , Richard , John Back to Biography Home Group List ... The Whitney Research Group
Auteur - Whitney, Hassler Translate this page Auteur whitney, hassler, 3 documents trouvés. Ajouter au panier, Imprimer, Envoyerpar mail, Liste détaillée. Ouvrage hassler Witney collected papers. Vol. http://bibli.cirm.univ-mrs.fr/Auteur.htm?numrec=061029913920170
The Mathematics Genealogy Project - Hassler Whitney hassler whitney Biography Ph.D. Harvard University 1932. According to our currentonline database, hassler whitney has 6 students and 303 descendants. http://www.genealogy.ams.org/html/id.phtml?id=4956
List Of Mathematical Topics (V-Z) prime Wilson s theorem Winding number Window function Wishart distribution White noise Whitehead problem whitney, hassler Witch of http://www.sciencedaily.com/encyclopedia/list_of_mathematical_topics__v_z_
Extractions: A-C D-F G-I ... Mathematicians Vallée-Poussin, Charles de la Valuation (mathematics) Value distribution theory of holomorphic functions van der Waerden, Bartel Leendert Van der Waerden's theorem ... Variance Variational inequality VC diagram Vector (spatial) Vector bundle Vector calculus Vector field ... Vierbein Viete, Francois Vietoris, Leopold Vigenère Cipher Vigesimal Virasoro algebra ... Voxel Vries, Gustav de Vulgar fraction Wall-Sun-Sun prime Wallpaper group Wallis, John
[HM] Hassler Whitney (1907 - 1989) a topic from historia HM hassler whitney (1907 1989). post amessage on this topic post a message on a new topic 24 Aug 2001 http://mathforum.org/epigone/historia/skandboxyul
James And Jennifer's Climbing Web My grandfather was hassler whitney, mathematician and mountaineer, who made thefirst ascent of the whitney Gilman ridge (5.7) on Cannon cliff, New Hampshire http://melhuish.org/climb/
Extractions: Home Introduction Photos Basement Gym ... Yosemite Jennifer on Social Outcast, 12a, Rumney. We get good weather information from The Weather Channel My grandfather took me (James) rock climbing at the age of 7 (in 1971) in the Sierra Nevada mountains. My grandfather was Hassler Whitney, mathematician and mountaineer, who made the first ascent of the Whitney Gilman ridge (5.7) on Cannon cliff, New Hampshire in 1929 with his cousin Bradley Gilman. This knife edge ridge is 700 feet high and is one of the most beautiful climbs on the east coast. Here is someone else's web page on climbing that features the Whitney Gilman ridge including photo. Notes on
Detailed Record metric spaces.Eilenberg, Samuel. Extension and classification of continuousmappings.whitney, hassler. On the topology of differentiable http://worldcatlibraries.org/wcpa/ow/7ac1c0a5fc27599d.html
Whitney Numbers numbers to refer to the sizes of each of the ranklevels of a geometric latticeL, in honor of the combinatorialist and topologist hassler whitney, who more http://math.ucsd.edu/~jcooper/graph.html
Extractions: I recently wrote a short C program to calculate the Whitney numbers of a graphical matroid very quickly. Below is the source, the executable (for a Win98 DOS console), and some sample graphs. To run, simply double-click the executable, and give it the name of a graph file in the same directory as the executable when it asks for the filename. Sorry about the lack of annotation and the somewhat sloppy coding: it was written in haste. Feel free to clean it up and/or improve on my algorithms. Graph files are text files containing the adjacency matrix of a graph. Click here to download everything zipped up together (19K). Let me know if you see something interesting or make any significant improvements. So, what are Whitney numbers? The late Gian-Carlo Rota coined the term "Whitney numbers" to refer to the sizes of each of the rank-levels of a geometric lattice L , in honor of the combinatorialist and topologist Hassler Whitney, who more or less discovered/invented matroids. That is, the n th Whitney number is the number of flats in L with rank n . Don't know what a matroid or a geometric lattice is? No sweat, I'll describe the concept for graphs, and you can go read more if you think it's interesting.
Extractions: Lieven Smits Israel Journal of Mathematics , volume 75 (1991), pages 257-271. We consider the approximation of a differential operator on forms by combinatorial objects via the correspondences of Whitney and de Rham. We prove that the Hilbert space dual of the combinatorial coboundary is an L approximation to the codifferential of one-forms on a two-dimensional Riemannian manifold. The author has some reprints left. If your library does not have this particular journal issue, ask for a reprint by emailing him your postal address. Remove "unwanted" from the address below. lieven@sterunwanted.be Albeverio, Sergio and Zegarlinski, Boguslaw , Construction of Convergent Simplicial Approximations of Quantum Fields on Riemannian Manifolds, University of Bochum preprint SFB 237, 1989. Cheeger, J., Analytic Torsion and Reidemeister Torsion, Proc. Nat. Acad. Sci. USA Schrader, Robert , On the Curvature of Piecewise Flat Spaces, Comm. Math. Phys.
Extractions: Pre-Registered Persons ... Konstanz, Lake Mail to BF. Debug This page presents scaned versions of some papers which are of historic interest to reasearchers working in geometric algebra. You can download and print out these works. However, be aware that the files are extraordinary large! There are ps-files included in tgz-archives or tiff pictures in zip-archives available. If you have scaned versions of importand historic papers, you are welcome to send them as email (attached) to be incorporated into this list. How to unpack:
Parapluie De Whitney Translate this page PARAPLUIE DE whitney whitney umbrella, whitneyscher Regenschirm. hassler whitney(1907 - 1989) mathématicien américain. Équation cartésienne . http://www.mathcurve.com/surfaces/whitney/whitney.shtml
The Mathematics Genealogy Project - Index Of WH Whitnall, Gordon, University of California, Santa Barbara, 1971. whitney,hassler, Harvard University, 1932. whitney, Eoin, Harvard University, 1955. http://genealogy.impa.br/html/letter.phtml?letter=WH
