21. Citation Taa Harish Chandra Award Dr. A. Raghuram is selected for the TAA harish-chandra Memorial Award forMathematics and Computer Science for his Ph.D. thesis titled Some Topics in http://www.tifr.res.in/~endowment/HTML/Write-ups/citation_raghuram.html

TATA INSTITUTE OF FUNDAMENTAL RESEARCH Homi Bhabha Road, Mumbai 400 005 TAA - HARISH-CHANDRA MEMORIAL AWARD 2000-2001 CITATION Dr. A. Raghuram is selected for the TAA- Harish-Chandra Memorial Award for Mathematics and Computer Science for his Ph.D. thesis titled "Some Topics in Algebraic Groups". Representation theory of Lie Groups, a deep and central area of Mathematics is essentially the creation of Harish-Chandra. Dr. Raghuram's Ph.D. thesis is an excellent recent contribution to this theory. Dr. Raghuram's thesis takes the first steps towards our understanding of representations of the p-adic group GL(2,D), where D is a finite dimensional central division algebra over a p-adic field. The central theme is the development of a Kirillov theory for these groups along the lines of Jaquet and Langlands for GL (2) over the p-adic field. The thesis contains many interesting new results and ideas and the back-ground information used is very impressive. Many of the results in the thesis have recently appeared in the prestigious Duke Mathematics Journal in a joint paper with D. Prasad. PROFILE A Raghuram (b: 1971): Obtained B.Tech. in Computer Science and Engineering from I.I.T. Kanpur in 1992. Had earlier secured 5th rank in Indian National Mathematics Olympiad (1987) and 2nd rank in All India IIT-JEE (1988). Joined School of Mathematics, TIFR in August, 1992 and worked for his Ph.D. thesis under the supervision of Prof. Dipendra Prasad and Prof. M.S. Raghunathan. Spent two years (July 1999 to July 2001) on a post-doctoral assignment at University of Toronto, Toronto, Canada. Since August, 2001, a Visiting Fellow in School of Mathematics, TIFR.

22. Dirac, Harish-Chandra And The Unitary Representations Of The harishchandra was born in Kanpur in Northern India on October 11, harish-chandraworked as a postgraduate research fellow on problems in theoretical http://eprints.iisc.ernet.in/archive/00000950/

23. Expansors And Expinors Dirac, Harish-Chandra And The Lorentz Mukunda, N (1995) Expansors and expinors Dirac, harishchandra and the Lorentzgroup, in Adhikari, SD, Eds. Current trends in Mathematics and Physics, http://eprints.iisc.ernet.in/archive/00000958/

24. Zaadz Quotes By Author - Harish-Chandra Quotes Grow with us! We are passionate about inspiring and empowering you to reach yourpotential by providing powerful technology tools, supportive communities, http://zaadz.com/quotes/authors/harish-chandra/

what's a zaad? bookmark us send feedback quotes ... about You are here: Home Quotes Authors Quotes by Author - Harish-Chandra Quotes Quote Size: All Short Tall Grande Venti Famous Quotes by Harish-Chandra Page of Results of Rob Costlow Following dreams with music Friedrich Nietzsche said, “Without music life would be a mistake” and Walt Disney once said, "If you can dream it, you can do it." Our own Rob Costlow is an example of following one’s dreams. From melodies sweet and simple to the complex and symphonic, Rob delivers heartfelt and harmonious music that is both original and inspiring. Visit Rob's Website Listen to Rob's Music Grow With Us Join our community. Chat about life, philosophy and anything else you're in the mood for with a cool group of passionate people from around the world. Check out our boards today! Free Inspirational Newsletter Get inspired every morning. You'll dig it. Sign up for our free inspirational quote newsletters and join thousands who are waking up to their dose of wisdom every morning. 1. "I have often pondered over the roles of knowledge or experience, on the one hand, and imagination or intuition, on the other, in the process of discovery. I believe that there is a certain fundamental conflict between the two, and knowledge, by advocating caution, tends to inhibit the flight of imagination. Therefore, a certain naivete, unburdened by conventional wisdom, can sometimes be a positive asset."

25. American Mathematical Monthly, The Mathematical Legacy Of Harish Full text of the article, Mathematical Legacy of harishchandra A Celebrationof Representation Theory and Harmonic Analysis, The from American http://www.findarticles.com/p/articles/mi_qa3742/is_200203/ai_n9036114

26. Ashoke Sen, Harish-Chandra Institute, Tachyons And Open Strings II Ashoke Sen, harishchandra Institute. The first few minutes of audio were lost.We apologize for any inconvenience. Audio for this talk requires sound http://online.itp.ucsb.edu/online/mtheory01/sen1/

Schedule Apr 24, 2001 Tachyons and Open Strings II Ashoke Sen, Harish-Chandra Institute The first few minutes of audio were lost. We apologize for any inconvenience. Audio for this talk requires sound hardware, and RealPlayer or RealAudio by RealNetworks. Audio for this talk requires sound hardware, and RealPlayer or RealAudio by RealNetworks. Begin WebCam and audio for the whole talk: high bandwidth or medium bandwidth Or, begin audio only for the whole talk: high bandwidth or low bandwidth . (Or, right-click to download the whole audio file The first part of the talk was lost. We apologize for any inconvenience. To begin viewing slides, click on the first slide below. (Or, view as pdf Author entry (protected)

27. A Capelli Harish-Chandra Homomorphism In terms of the harishchandra isomorphism, this map involves a rho-shift .We view a dual pair as a Lie supergroup and offer a construction of the http://crystal.ou.edu/~tprzebin/chch.html

A Capelli Harish-Chandra Homomorphism For a real reductive dual pair the Capelli identities define a homomorphism "C" from the center of the universal enveloping algebra of the larger group to the center of the universal enveloping algebra of the smaller group. In terms of the Harish-Chandra isomorphism, this map involves a "rho-shift". We view a dual pair as a Lie supergroup and offer a construction of the homomorphism "C" based solely on the Harish-Chandra's radial component maps.. Appeared in Transactions of the AMS. 356, 11211154 (2003).

28. Gregg Zuckerman At MSRI - A Generalization Of Harish-Chandra S Gregg Zuckerman A generalization of harish-chandra s discrete series to Liesuperalgebras. http://www.msri.org/publications/ln/msri/2002/ssymmetry/zuckerman/1/

29. A Harish-Chandra Homomorphism For Reductive Group Actions. A harishchandra Homomorphism for Reductive Group Actions. Let G be a connectedreductive group and Xa smooth G-variety. Theorem Assume that X is either http://www.math.rutgers.edu/~knop/papers/HC.html

A Harish-Chandra Homomorphism for Reductive Group Actions. Let G be a connected reductive group and X a smooth G-variety. Theorem : Assume that X is either spherical or affine. Then the center Z(X) of the ring of G-invariant differential operators on X is a polynomial ring. More precisely, Z(X) is isomorphic to the ring of invariants of a finite reflection group. Appeared in: Annals of Mathematics, Series II Available files: DVI-file (needs the symbol font Postscript file Pdf-file Original article (Jstor) Index Last updated: October 26, 2000

30. INIS Internet Directory: Harish-Chandra Research Institute The harishchandra Research Institute (Mehta Research Institute till 11 Oct.2000) is an autonomous institute, funded by the Department of Atomic Energy. http://www.iaea.org/inis/ws/d3/r2808.html

About IAEA Publications Meetings Jobs You are in : IAEA.org Internet Directory Find-an-Expert Facility Nuclear Knowledge Desk Nuclear Reactors Knowledge Base IAEA Web Resources ... World's Nuclear Literature IAEA Data Centre Statistics Databases Scientific Networks Programme Sites see also: INIS HOME INIS Bibliographic Database IAEA Nuclear Knowledge Management HOME Contact INIS Internet Directory of Nuclear Resources Harish-Chandra Research Institute external URL: http://www.mri.ernet.in/ The Harish-Chandra Research Institute (Mehta Research Institute till 11 Oct. 2000) is an autonomous institute, funded by the Department of Atomic Energy. It is the North Indian link of a chain of institutes aided by the DAE for conducting research in fundamental sciences. HRI concentrates on Mathematics and Theoretical Physics. Formerly known as the Mehta Research Institute of Mathematics and Mathematical Physics URL: http://www.mri.ernet.in/ language: English originator: university, laboratory or research organisation country: India access: open to the general public type of data: textual information type of site: non-commercial site related sites: Department of Atomic Energy subject category: INIS/ETDE category: keywords: general physics Telephone (+43) 1 2600-0; Facsimile (+43) 1 2600-7; E-mail:

31. Acausality In The Harish-Chandra Equations For Composite Particles With Spins 1/ Equations given by harishchandra (1947) describing fields having both spins 1/2and 3/2 One of the harish-chandra equations is a particular case of the http://www.iop.org/EJ/abstract/0305-4470/10/8/019

@import url(http://ej.iop.org/style/nu/EJ.css); Quick guide Site map Athens login IOP login: Password: Create account Alerts Contact us Journals Home ... This issue W Cox 1977 J. Phys. A: Math. Gen. Acausality in the Harish-Chandra equations for composite particles with spins and W Cox Dept. of Math., Univ. of Aston, Birmingham, UK Print publication: Issue 8 (August 1977) Abstract. Equations given by Harish-Chandra (1947) describing fields having both spins and are minimally coupled to an external homogeneous magnetic field, and found to exhibit the usual acausality problems. One of the Harish-Chandra equations is a particular case of the Bhabha-Gupta equation and has similar acausality problems. The other is more complicated and this is reflected in additional acausal modes. The composite nature of the Harish-Chandra particles is used to discuss suggestions that high-spin problems may be resolved by regarding high-spin particles as composite. doi:10.1088/0305-4470/10/8/019 URL: http://stacks.iop.org/0305-4470/10/1409 PDF (678 KB) References Articles citing this article Full text PDF (678 KB) References Articles citing this article Article options E-mail abstract Download to citation manager Link to this article Information about Filing Cabinet Find related articles By author W Cox IOP CrossRef Search Recommend Recommend this article Recommend this journal Author services NEW ... Submit referee report Reasons to login Set up an E-mail alert Use your Filing Cabinet Login Previous article ... Help Biomedical Materials

32. Acausality Of All Standard Relativistic Wave Equations With Harish-Chandra Degre of acceptable standard relativistic wave equations for particles of spinss or=3/2 is proven, for all cases with harishchandra degree four. http://www.iop.org/EJ/abstract/0305-4470/16/12/006

@import url(http://ej.iop.org/style/nu/EJ.css); Quick guide Site map Athens login IOP login: Password: Create account Alerts Contact us Journals Home ... This issue G Labonte 1983 J. Phys. A: Math. Gen. Acausality of all standard relativistic wave equations with Harish-Chandra degree four G Labonte Dept. of Phys., Princeton Univ., Princeton, NJ, USA Print publication: Issue 12 (21 August 1983) Abstract. is proven, for all cases with Harish-Chandra degree four. This is an important step toward the general proof since the only remaining candidate equations have higher HC degrees and therefore are expected to exhibit still worse pathologies. doi:10.1088/0305-4470/16/12/006 URL: http://stacks.iop.org/0305-4470/16/L427 PDF (175 KB) References Full text PDF (175 KB) References Article options E-mail abstract Download to citation manager Link to this article Information about Filing Cabinet Find related articles By author G Labonte IOP CrossRef Search Recommend Recommend this article Recommend this journal Author services NEW ... Submit referee report Reasons to login Set up an E-mail alert Use your Filing Cabinet Login Previous article ... Help Biomedical Materials British Journal of Applied Physics (1950-1967) Chinese Physics Chinese Physics Letters Classical and Quantum Gravity Clinical Physics and Physiological Measurement (1980-1992) Combustion Theory and Modelling (1997-2004) Distributed Systems Engineering (1994-1999) European Journal of Physics Inverse Problems Journal of Cosmology and Astroparticle Physics Journal of Geophysics and Engineering

33. On The Algebraic Construction And Classification Of Harish-Chandra Modules -- En On the Algebraic Construction and Classification of harishchandra Modules.Thomas J. Enright. Let G be a connected real semisimple Lie group. http://www.pnas.org/cgi/content/abstract/75/3/1063

This Article Full Text (PDF) Alert me when this article is cited Alert me if a correction is posted Services Similar articles in this journal Alert me to new issues of the journal Add to My File Cabinet Download to citation manager PubMed Articles by Enright, T. J. March 1, 1978 On the Algebraic Construction and Classification of Harish-Chandra Modules Thomas J. Enright Let G be a connected real semisimple Lie group. In this article a functor is defined which assigns to each irreducible finite dimensional representation of a Cartan subgroup of G a Harish-Chandra module for G. This functor is described by an explicit construction of modules and a sufficient condition is given for the image module to be irreducible. In the case when G is a linear group, this functor is used to exhibit all irreducible Harish-Chandra modules of G. Current Issue Archives Online Submission Info for Authors ... Site Map

34. Characters Of Irreducible Harish-Chandra Modules And Goldie Ranks Of Their Annih If X is an irreducible harishchandra module with infinitesimal character lambdain h*, one can associate to Xa family { theta (µ ) µ in lambda + P} of http://www.pnas.org/cgi/content/abstract/77/10/5616

This Article Full Text (PDF) Alert me when this article is cited Alert me if a correction is posted Services Similar articles in this journal Alert me to new issues of the journal Add to My File Cabinet Download to citation manager PubMed Articles by King, D. R. October 1, 1980 Characters of Irreducible Harish-Chandra Modules and Goldie Ranks of Their Annihilators Donald R. King Assume that G C is a simply connected complex semi-simple Lie group with Lie algebra g. Let G G C be a real form, H G be a maximally split Cartan subgroup with Lie algebra h , h = h R C, and P h be the weight lattice. If X is an irreducible Harish-Chandra module with infinitesimal character h ) = X. , a certain positive ``Weyl'' chamber containing . In this case let Ann h d of degree (dim G - dim H) - d; (iii) up to a constant, c = the polynomial extending p to h . c is said to be the character polynomial of Ann X. Current Issue Archives Online Submission Info for Authors ... Site Map

35. [math/9508203] Cohomological Properties Of The Smooth Globalization Of A Harish- Cohomological properties of the smooth globalization of a harishchandra module.Authors U. Bunke, M. Olbrich Comments 32 pages, Latex http://arxiv.org/abs/math.RT/9508203

Mathematics, abstract math.RT/9508203 From: Ulrich Bunke [ view email ] Date: Fri, 18 Aug 1995 17:17:53 GMT (29kb) Cohomological properties of the smooth globalization of a Harish-Chandra module Authors: U. Bunke M. Olbrich Comments: 32 pages, Latex Report-no: SFB288, Berlin, Nr. 177, and formerly auto-fms/9508002 Subj-class: Representation Theory; Differential Geometry We prove the finiteness of the cohomology of torsion-free lattices in a semisimple Lie group of real rank one with coefficients in the distribution vector globalization of Harish-Chandra modules. The cohomology is expressed in terms of automorphic and cusp forms. We also consider the Lie-algebra cohomology of these globalizations for the nilpotent part of the Iwasawa decomposition of the group. Full-text: PostScript PDF , or Other formats References and citations for this submission: CiteBase (autonomous citation navigation and analysis) Which authors of this paper are endorsers? Links to: arXiv math find abs

36. [q-alg/9706010] Inverse Harish-Chandra Transform And Difference Operators Inverse harishchandra Transform and Difference Operators. Authors Ivan CherednikComments AMSTeX Subj-class Quantum Algebra http://arxiv.org/abs/q-alg/9706010

Quantum Algebra and Topology, abstract q-alg/9706010 From: Ivan Cherednik [ view email ] Date: Thu, 12 Jun 1997 08:23:28 GMT (29kb) Date (revised): Fri, 13 Jun 1997 06:21:05 GMT Inverse Harish-Chandra Transform and Difference Operators Authors: Ivan Cherednik Comments: AMSTeX Subj-class: Quantum Algebra We apply a new technique based on double affine Hecke algebras to the Harish-Chandra theory of spherical zonal functions. The formulas for the Fourier transforms of the multiplications by the coordinates are obtained as well as a simple proof of the Harish-Chandra inversion theorem using the Opdam transform. Full-text: PostScript PDF , or Other formats References and citations for this submission: CiteBase (autonomous citation navigation and analysis) Which authors of this paper are endorsers? Links to: arXiv q-alg find abs

37. Harish-Chandra Université Montpellier II harishchandra I have often pondered over the roles of ( ) R. Langlands, «harish-chandra, » Biographical Memoirs of Fellows of the Royal Society 31 http://ens.math.univ-montp2.fr/SPIP/article.php3?id_article=2559

38. Combinatorics Of Harish-Chandra Modules Combinatorics of harishchandra modules. These lectures (given at a NATO-workshop1997 in Montreal) survey recent work on the combinatorics of certain http://home.mathematik.uni-freiburg.de/soergel/PReprints/Mon.html

Combinatorics of Harish-Chandra modules These lectures (given at a NATO-workshop 1997 in Montreal) survey recent work on the combinatorics of certain infinite dimensional representations of complex semisimple Lie algebras. Their focus is not on understanding the irreducible objects but rather on understanding the structure of suitable representation categories. They concentrate on the relation of these representation categories with categories of modules over the coinvariant algebra associated to the action of the Weyl group on a Cartan subalgebra. We also discuss conjectural generalizations to the representation theory of real Lie groups.

39. Twisted Harish-Chandra Sheaves And Whittaker Modules: The Non-degenerate Case Twisted harishchandra sheaves and Whittaker modules The non-degenerate case (withD. Milicic). In this paper we develop a geometric approach to the study http://home.mathematik.uni-freiburg.de/soergel/PReprints/whittaker.html

Twisted Harish-Chandra sheaves and Whittaker modules: The non-degenerate case (with D. Milicic) In this paper we develop a geometric approach to the study of the category of Whittaker modules. As an application, we reprove a well-known result of B. Kostant on the structure of the category of non-degenerate Whittaker modules.

40. National Academy Of Sciences - Deceased Member 3 Testing 1 .. 2 .. 3 Advanced Search. harishchandra. Date of Birth,October 11, 1923. Elected to NAS, 1981. Date of Death, October 12, 1983. http://www4.nationalacademies.org/nas/nasdece.nsf/(urllinks)/NAS-58MVSX?opendocu

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