61. Fun_People Archive - 25 Sep - Paul Erdos Obit From The Times (London) accompanied by a rhyme Chebyshev said it, and I say it again/There is always aprime between n and 2n. In 1949 he and atle selberg astounded the mathematics http://www.langston.com/Fun_People/1996/1996BSS.html

Fun_People Archive 25 Sep Paul Erdos Obit from The Times (London)

62. Untitled Translate this page 1936 Ahlfors, Lars Harvard University USA 1936 Douglas, Jesse MIT USA 1950 Schwartz,Laurent Universite de Nancy France 1950 selberg, atle Princeton/Inst. http://www.linux.ime.usp.br/~masaki/mat2.html

"Medalha Fields" Esclarecimentos Carta It is proposed to found two gold medals to be awarded at successive International Mathematical Congress for outstanding achievements in mathematics. Because of the multiplicity of the branches of mathematics and taking into account the fact that the interval between such congresses is four years it is felt that at least two medals should be available. The awards would be open to the whole world and would be made by an International Committee. The fund for the founding of the medals is constituted by balance left over after financing the Toronto congress held in 1924. This must be held in trust by the Government or by some body authorized by government to hold and invest such funds. It would seem that a dignified method for handling the matter and one which in this changing world should most nearly secure permanency would be for the Canadian Government to take over the fund and appoint as his custodian say the Prime Minister of the Dominion or the Prime Minister in association with the Minister of Finance. The medals would be struck at the Mint in Ottawa and the duty of the custodian would be simply to hand over the medals at the proper time to the accredited International Committee. As things are at present a practical course of procedure would seem to be for the Executive Committee of a Congress to appoint a small international committee authorized to add to its number and call into consultation other mathematicians as it might deem expedient. The Committee would be expected to decide on the ones to whom the awards should be made thirty months in advance of the following Congress. Its decisions would be communicated to the President and Secretary of the Organizing Committee of the Congress, this Committee having the duty of communicating to the Prime Minister of Canada the names of the recipients in order that the medal might be prepared in time and forwarded to the president of the Organizing Committee. Immediately on the appointment of the Executive Committee of the Congress the medals would be handed over to its President. The presentation of the medals would constitute a special feature at some general meeting of the Congress.

63. Paul Erdös {Love} proved it using complex analysis. In 1949 Erdös and atle selbergfound an elementary proof. selberg and Erdös agreed to publish http://www.ai.univie.ac.at/~stella/big/erdos/htm/21.htm

The contributions which Erdös made to mathematics were numerous and broad. However, basically Erdös was a solver of problems, not a builder of theories. The problems which attracted him most were problems in combinatorics, graph theory, and number theory. He did not just want to solve problems, however, he wanted to solve them in an elegant and elementary way. To Erdös the Bertrand conjectured that there was always at least one prime between n and 2n for n => 2. Chebyshev proved Bertrand's conjecture in 1850 but when Erdös was only an eighteen year old student in Budapest he found an elegant elementary proof of this result. This result on prime numbers associated with Erdös is the Prime Number Theorem, namely: the number of primes n tends to as n/loge n. The theorem was conjectured in the 18th century, Chebyshev himself came close to a proof, but it was not proved until 1896, when Hadamard and de la Vallée Poussin independently proved it using complex analysis. In 1949 Erdös and Atle Selberg found an elementary proof. Selberg and Erdös agreed to publish their work in back-to-back papers in the same journal, explaining the work each had done and sharing the credit. But at the last minute Selberg raced ahead with his proof and published first.The following year Selberg won the Fields Medal for this work.

64. Program: Number Theory And Physics, Conference On The Riemann Zeta-function 1600 1830, Chairman atle selberg, C. Deninger, Motivic and dynamical cohomologies.B. Julia, Physical parameters in zeta functions. Tuesday, September 22 http://www.esi.ac.at/activities/archive/zetaconf98.html

Conference on the Riemann zeta function This conference is part of the activity on Quantum Field Theory and the Statistical Distribution of Prime Numbers in the program Number Theory and Physics . It is sponsored by the ESI and the American Institute of Mathematics . The conference starts on September 20,1998 (arrival date). The talks at the Conference will be by invitation only; attendance, on the other hand, may be only restricted by the size of the lecture room. It is expected that most of the invited speakers will remain at ESI for one more week (either before or after the conference) to be able to interact more closely with interested mathematicians and mathematical physicists in Vienna during this period. Preliminary schedule of talks Monday, September 21: Chairman: Alain Connes S. Patterson The Riemann zeta function and Hamburger's theorem D. Zagier The Selberg zeta function, transfer operators, and periods of Maass wave forms Chairman: Atle Selberg C. Deninger Motivic and dynamical cohomologies B. Julia

65. Fields Medals 1950 of theoretical physics. atle selberg. born June 14, 1917, Langesund,Norway Institute for Advanced Study. Developed generalizations http://www.mathunion.org/medals/1950/

Fields Medals 1950 Laurent SCHWARTZ born March 5, 1915, Paris University of Nancy Developed the theory of distributions, a new notion of generalized function motivated by the Dirac delta-function of theoretical physics. Atle SELBERG born June 14, 1917, Langesund, Norway Institute for Advanced Study This document has been reproduced from Albers, Donald J.; Alexanderson, G. L.; Reid, Constance: International mathematical congresses. An illustrated history 1893 - 1986 Rev. ed. including ICM 1986. Springer-Verlag, New York, 1986 with friendly permission from Springer Verlag

66. Project Students - Sigurd Skogestad Stig selberg, Kristian Aas, Multivessel batch destillasjon (eksperimenter). LindaRemseth, Kristian Tangen, atle Valland, Cecilie Aarskog Gjenvinning av http://www.chemeng.ntnu.no/~skoge/proj_stud.html

Project students (4th and 5th year students) Supervisor: Sigurd Skogestad The spring projects are design projects (``prosjektering 4.klasse''), whereas the autumn projects are research projects (``prosjekt fordypningsemne 5. klasse''). Diverse tips Autumn 2002 Christian Trudvang [trudvang@stud.ntnu.no]. Ustabil flerfase (medveileder Espen Storkaas) Kristian Svendsen [krissv@stud.ntnu.no]. Modeller flerfase (medveileder Espen Storkaas) Chema R. Pujals [chemita3@hotmail.com]. Modelling av gasskraftverk i Hysys og Matlab (medveileder Marius Govatsmark) Morten Søndrol [sondrol@stud.ntnu.no]. Regulering trykktank (medveileder Vidar Alstad) Knut Arne R. Munkebye [knutarmu@stud.ntnu.no]. Regulering trykktank (våren 2003) (medveileder Vidar Alstad) Autumn 2001 Kristian Kjæstad [kjastad@stud.ntnu.no]. Optimalisering av offshore produksjonssystem (medveileder Vidar Alstad) Kjetil Meyer [meyer@stud.ntnu.no]. Multivariabel regulering av trykktank- prosess (eksperimentell) (medveileder Vidar Alstad) Magnus Hildershavn Nilsen [magnushi@stud.ntnu.no]. Regulering av multi-effekt kolonne (medveileder Hilde Engelien)

67. Untitled students graduated from the group in 1997, but atle and Kjetil 3. Stig Ludvig selberg, Modellering av absorbsjonstårn for formalinproduksjon (utført ved http://www.chemeng.ntnu.no/research/Process_Control/Annual_Reports/annual-97.htm

PROCESS CONTROL GROUP Department of Chemical Engineering, NTNU, Trondheim Head of group: Professor Sigurd Skogestad ANNUAL REPORT 1997. At the end of 1997 the following persons were associated with the group: Sigurd Skogestad (Professor) Atle Christer Christiansen (dr.ing. student) Audun Faanes (dr.ing. student) Ivar Halvorsen (dr.ing. student) Kjetil Havre (dr.ing. student) Eva-Katrine Hilmen (dr.ing. student) Truls Larsson (dr.ing. student) Bernd Wittgens (dr.ing. student) Tove Krokstad (secretary) Valeri Kiva and Jens Erik Hansen were with the group during the spring of 1997. In addition, was associated with the group in the same period since Terje Hertzberg was on sabattical leave. Morten Hovd at Fantoft Prosess and at SINTEF kjemi also participated actively at many group meetings. Two new dr.ing. students are starting in January 1998 working in the field of model-based optimization and control; Marius Govatsmark and Tore Lid . On the other hand, Atle Christiansen and Kjetil Havre have completed their thesis work and will defend their theses in January 1998 and February 1998,respectively. (Statoil) still has to finish up his dr. ing, thesis.

68. Nat'l Academies Press, Biographical Memoirs V.79 (2001), Samuel Eilenberg wolf prize, henri cartan, ri cartan, norman steenroci, category theory, singularhomology, algebraic topology, spectral sequences, atle selberg, sammy en http://www.nap.edu/books/0309075726/html/106.html

Biographical Memoirs V.79 National Academy of Sciences ( NAS Related Books Openbook Linked Table of Contents Front Matter, pp. i-iv Table of Contents, pp. v-vi Preface, pp. vii-viii Title Page, pp. 1-1 Henry G. Booker, pp. 2-13 George Hermann Buchi, pp. 14-31 Horace Robert Byers, pp. 32-49 Gerald M. Clemence, pp. 50-65 Julius H. Comroe, Jr., pp. 66-83 Rafael Lorente De No, pp. 84-105 Samuel Eilenberg, pp. 106-133 Jordi Folch-Pi, pp. 134-157 Robert Hofstadter, pp. 158-181 Mary Ellen Jones, pp. 182-201 Simon S. Kuznets, pp. 202-231 Franklin Asbury Long, pp. 232-245 Hans Joachim Muller-Eberhard, pp. 246-261 Daniel Nathans, pp. 262-279 William Harrison Riker, pp. 280-301 Richard C. Starr, pp. 302-315 Dean Stanley Tarbell, pp. 316-335 Howard M. Temin, pp. 336-375 Benton J. Underwood, pp. 376-395 Oliver Reynolds Wulf, pp. 396-412 THIS PAGE You may want to explore these Related Books Openbook Linked Table of Contents Front Matter, pp. i-iv Table of Contents, pp. v-vi Preface, pp. vii-viii Title Page, pp. 1-1 Henry G. Booker, pp. 2-13 George Hermann Buchi, pp. 14-31

69. Norwegian American Hall Of Fame Navigation Bar Pat Paulsen* Charles J. Pederson* Cleng Peerson* Sally Ride* Knute Rockne• OleRølvaag Finn Ronne Marta Sandal• Pete Sanstol atle selberg Eric Sevareid http://www.lawzone.com/half-nor/hallfame-nav.htm

Waldemar Ager Arthur Andersen Andrews Sisters Christian Anfinsen ... Vera Zorina Link to a page on this website Link to a page on the "Great Norwegians" website There are, of course, many who should be added to this page. To nominate a person for admission to the Norwegian American Hall of Fame, please e-mail us. We ask that you understand, however, that at present, our efforts are being directed to replacing links to outside sites with links to material that is on our own site (to avoid dead links). There is also a considerable backlog of persons already nominated for, and fully deserving of, inclusion here. Tusen takk!

70. Byens Fornyelse - "Bukta" I Stavern, Et Nytt Byområde Bukta i Stavern, et nytt byområde Av Knut atle selberg, selbergarkitektkontor As, høsten 2002. Bukta i Stavern, med sine 75 http://www.byen.org/stavern/stavern.html

Bebyggelsesplan og bilder: Bakgrunn Nettverket Arkitektur Byplan ... International

71. Henrik Kragh On Mathematics 1996 new 'simpler' proof of 4CT. I have developed an interest in the Prime NumberTheorem (PNT), and in particular in atle selberg's elementary proof of it. http://www.henrikkragh.dk/math/

Last modification: document.write(document.lastModified) Webmaster Validate html My interests in math 'proper' Although now a Ph.D. student in the history of mathematics I remain very interested in mathematics proper. My main field of interest lies in discrete mathematics (parts of which are also known as combinatorics ). Main interests in combinatorics include Ramsey theory and links between Ramsey theory and complexity theory. The hexagon on the right represents one of the simplest yet very beautiful results in Ramsey theory, a result which is completely elementary. It says, that no matter how you color the edges of the complete hexagon (all vertices joined by an edge) in two colors (red and blue), a monochromatic triangle (three vertices joined by edges colored the same color) will emerge. The proof indicated in the picture is a simple combinatorial argument. Choose any vertex V with blue degree at least 3 (such a vertex exists...). The edges which join the three vertices adjacent to V cannot be colored blue without producing a blue triangle together with V. Thus, these edges must be red to avoid a blue triangle, thereby producing a red one instead! Of course, this argument can be generalized. For instance, in order to see that every 3-coloring of a complete 16-gon must produce a monochromatic triangle, pick a vertex of 1-degree at least 6. Take six 1-adjacent vertices; if any two of them are joined by a 1-edge, a monochromatic triangle is found. Otherwise, we have a two-coloring of a complete 6-gon, and the result proved above applies.

72. UNIVERSITETET I BERGEN Estetiske fag atle Kittang, LiLi (leiar), Hans Weisethaunet, Institutt for musikk,Siri Skjold Lexau, IKK. Kultur og samfunnsfag Torunn selberg, IKK (leiar http://www.hf.uib.no/i/sekretariatet/utval/fu/2002/protokoll/2002-02-21.html

UNIVERSITETET I BERGEN DET HISTORISK-FILOSOFISKE FAKULTET Bergen,21.02.2002 PROTOKOLL Forskningsutvalget, Til stede: Fra gruppe A: Akselberg, Selberg, Kittang, Mikaelsson, Johansen (vara) Fra gruppe B: Bakke, Moi (vara) Fra gruppe D: Fra administrasjonen: I GODKJENNING AV INNKALLING OG SAKSLISTE Ingen merknader til innkalling og saksliste. II III REFERATSAKER – ORIENTERINGER a) l Tilsetting i stipendiat- og postdoktorstillinger med finansiering fra NFR Ingen merknader til referert sak FU 01/02 OPPNEMNING AV STIPENDIATKOMITEAR Vedtak: Estetiske fag: Atle Kittang, LiLi (leiar), Hans Weisethaunet, Institutt for musikk, Siri Skjold Lexau, IKK Kultur- og samfunnsfag: Torunn Selberg, IKK (leiar), Christhard Hoffmann, Historisk,institutt, Lisbeth Mikaelsson, IKRR FU 02/02 Vedtak: FU 03/02 Vedtak: Prosjekttittel: Joseph Bell: Utgivelse av bind 1,2,3 Journal of Arabic and Islamic Studies og 2 monografier i tidsskriftets mongrafiserie Kr. 18000 Oddleif Leirbukt, Germanistisk institutt Kr. 25000 Torunn Selberg, IKK – seksjon for kulturvitenskap Kr. 30000

73. The Hindu : Ramanujan's Mentor So Ramanujan was indeed correct in surmising that a similar exact formula would existfor p(n).. Professor atle selberg of the Institute for Advanced Study in http://www.hinduonnet.com/thehindu/mag/2002/12/22/stories/2002122200040400.htm

Online edition of India's National Newspaper Sunday, Dec 22, 2002 Group Publications Business Line The Sportstar Frontline The Hindu About Us Contact Us Magazine Published on Sundays Features: Magazine Literary Review Life Metro Plus ... Magazine Ramanujan's mentor Today is Ramanujan's 115th birth anniversary. To mark the occasion, KRISHNASWAMI ALLADI describes the life and contributions of the British mathematician Hardy, and discusses his collaboration with Ramanujan. Ramanujan... Ranked 100 on a scale of 1-100 by Hardy. G. H. HARDY, a towering figure in analysis and number theory, had written several important research papers and influential textbooks on these subjects. When Ramanujan wanted to get the opinion of British mathematicians to evaluate his discoveries which lay at the interface between analysis and number theory, it was only natural that he close to write to Hardy. Actually Ramanujan communicated his remarkable findings to several British mathematicians, but it was only Hardy who responded. Realising that Ramanujan was a genius of the first magnitude who would profit immensely by contact with professional research mathematicians, Hardy invited Ramanujan to Cambridge University, England. The rest is history. The collaboration between Hardy and Ramanujan, the influence they had on each other, and the impact their work had over mathematicians of their generation and those succeeding them, was immense.

74. Mathem_abbrev Ibn al Savasorda (A bar Hiyya) Schoenberg, Isaac Schrödinger, Erwin Schwartz,Laurent Schwarz, Stefan Scott, Sheila (Macintyre) selberg, atle Serenus Serre http://www.pbcc.cc.fl.us/faculty/domnitcj/mgf1107/mathrep1.htm

Mathematician Report Index Below is a list of mathematicians. You may choose from this list or report on a mathematician not listed here. In either case, you must discuss with me the mathematician you have chosen prior to starting your report. No two students may write a report on the same mathematician. I would advise you to go to the library before choosing your topic as there might not be much information on the mathematician you have chosen. Also, you should determine the topic early in the term so that you can "lock-in" your report topic!! The report must include: 1. The name of the mathematician. 2. The years the mathematician was alive. 3. A biography. 4. The mathematician's major contribution(s) to mathematics and an explanation of the importance. 5. A historical perspective during the time the mathematician was alive. Some suggestions on the historical perspective might be: (a) Any wars etc. (b) Scientific breakthroughs of the time (c) Major discoveries of the time (d) How did this mathematician change history etc.

75. Collected Works In Mathematics And Statistics atle selberg, JeanPierre Serre, Carl Ludwig Siegel, Waclaw Sierpinski, ThoralfSkolem, HJS Smith. selberg, atle, 1917-, Collected papers, 1, QA 300 S3932 1989,Killam. http://www.mathstat.dal.ca/~dilcher/collwks.html

Collected Works in Mathematics and Statistics This is a list of Mathematics and Statistics collected works that can be found at Dalhousie University and at other Halifax universities. The vast majority of these works are located in the Killam Library on the Dalhousie campus. A guide to other locations is given at the end of this list. If a title is owned by both Dalhousie and another university, only the Dalhousie site is listed. For all locations, and for full bibliographic details, see the NOVANET library catalogue This list was compiled, and the collection is being enlarged, with the invaluable help of the Bibliography of Collected Works maintained by the Cornell University Mathematics Library. The thumbnail sketches of mathematicians were taken from the MacTutor History of Mathematics Archive at the University of St. Andrews. For correction, comments, or questions, write to Karl Dilcher ( dilcher@mscs.dal.ca You can scroll through this list, or jump to the beginning of the letter: A B C D ... X-Y-Z A [On to B] [Back to Top] N.H. Abel

76. Paul Erdös In 1949 Erdös and atle selberg produced a brilliant elementary proof of thePrime Number Theorem, which describes the distribution of prime numbers. http://www.mth.uct.ac.za/~digest/erdos.html

The Times on September 25 1996. n there is a prime number between n and 2 n Back Up Next Home ... Place an order

77. AMCA: On Exceptional Eigenvalues Of The Laplacian For Congruence Subgroups Prese congruence subgroup. In 1965, atle selberg conjectured that thereis no exceptional eigenvalues for congruence subgroups. In this http://at.yorku.ca/cgi-bin/amca/cadx-08

AMCA Document # cadx-08 Millennial Conference on Number Theory May 21-26, 2000 University of Illinois Urbana, IL, USA Organizers B.C. Berndt, N. Boston, H.G. Diamond, A.J. Hildebrand, W. Philipp View Abstracts Conference Homepage On exceptional eigenvalues of the Laplacian for congruence subgroups by Xian-Jin Li Brigham Young University j , j = 1,2, ... , h, be the exceptional eigenvalues of the Laplacian for the congruence subgroup. In 1965, Atle Selberg conjectured that there is no exceptional eigenvalues for congruence subgroups. In this talk, an explicit Dirichlet series L N j j j Date received: January 3, 2000 Atlas Mathematical Conference Abstracts

78. Korttiongelma Norjalaiset vaalivat kunniakasta matemaattista perintöään (Niels Henrik Abel,Marius Sophus Lie, atle selberg, ) järjestämällä vuosittain tasokkaan http://www.mantta.fi/~hamlet/math/abel/

Korttiongelma Abel-kilpailusta Norjalaiset vaalivat kunniakasta matemaattista perintöään ( Niels Henrik Abel Marius Sophus Lie Atle Selberg , ...) järjestämällä vuosittain tasokkaan Niels Henrik Abel-matematiikkakilpailun lukiolaisille. Kilpatehtävät julkaistaan pohjoismaisessa matemaattisessa aikakauskirjassa Normatissa. Vuonna 1984 oli kuusitehtäväisen kilvan kolmantena kysymyksenä seuraava mielenkiintoinen matemaattis-fysikaalinen probleema: Asetetaan identtisiä, suorakulmion mallisia kortteja päällekkäin pöydän reunalle kuvan osoittamalla tavalla. Ylempi kortti tulee aina ulommas kuin alempi kortti. 1. Mikä on pienin määrä kortteja, joilla päästään enemmän kuin yhden kortin pituuden verran pöydän reunan ulkopuolelle? Tämä kysymys ei sisältynyt alkuperäiseen kilpaan. Voit tutkia tätä empiirisesti. 2. Kuinka pitkälle päästään n:llä kortilla? 3. Kuinka pitkälle päästään äärettömän monella kortilla? Linkki ratkaisuun on tällä sivulla. 110496 M.H.

79. Guradution Support The summary for this Chinese (Simplified) page contains characters that cannot be correctly displayed in this language/character set. http://www.icm2002.org.cn/Chinese/Wolf/Selberg.htm

ICM¼ò½é Àú½ìICM Selberg£¬Atle SelbergÖ÷Òª¹±Ï×ÓÚÊýÂÛ£¬ÀëÉ¢×ÓȺºÍ×ÔÊØÐÎʽµÈÁìÓò£®ËûÔçÆÚÑо¿Riemann ¦Æº¯ÊýÂÛ£®ÂÊÏÈÖ¤÷¦Æº¯ÊýµÄ·Çƽ·²ÁãµãÓÐÕýÜÂÊ£¬ËûÊ×ÏÈÒý½øSelberg²»µÈʽ£¬²¢Ó¦ÓËü¶ÀÁ¢¸ø³öËØÊý¶¨ÀíµÄ³õµÈÖ¤÷£®1946ÄêÆð£¬ËûÍƹãBrunɸ·¨£¬½¨Á¢Selbersɸ·¨£¬´ó´ó¸Ä½øɸº¯ÊýµÄÉϽç.¶ÔһϵÁÐÊýÂÛÎÊÌ⣬¡¢Ïñ±ðÊǶÔGoldbach²ÂÏëµÄÑо¿ÒÔÓÐÁ¦µÄ¸Ä½ø£®1951ÄêÆð£¬ËûתÏòÑо¿×ÔÊغ¯ÊýÂÛ£¬µ³öÖøûµÄSelberg¼£¹«Ê½.ÆäºóÑо¿LieȺµÄÀëÉ¢×ÓȺ£¬Õâµ¼Ïò·Ç½»»»µ÷ºÍ·ÖÎö¼°Langlands¸ÙÁ죬ÓÖµ¼ÏòA£®WeilµÈÈ˹ØÓÚËãÊõ×ÓȺµÄÑо¿ÒÔ¼°Óë±éÀúÀíÂÛÓйصÄÑо¿·½Ïò£® SelbergÊÇŲÍþ¿ÆѧԺԺʿ.À¹úÎÄÀí¿ÆѧԺԺʿ£¬1950Äê»ñFields½±£¬1956ÄêÒò¡°ÊýÂÛºÍÀëÉ¢¼°×ÔÊغ¯ÊýÂÛ·½æÉî¿Ì¼°¿ª´´ÐԵŤ×÷¡±·ÖÏíWolf½±. Back home Please send your suggestions and comment to: icmsec@beijing.icm2002.org.cn Last modified: June 12, 2002

80. Hovedfagsstudiet Ved Matematisk Institutt - Matematisk Institutt, Universitetet I etterkrigstiden har vi hatt W.Ljunggren, Sigmund selberg, Atleselberg og Ernst Selmer innen tallteori og algebraisk geometri. http://www.math.uio.no/academics/hovedfagshefte.shtml

UiO - nettsider UiO - personer BIBSYS - forfatter BIBSYS - tittel WWW - HotBot WWW - AltaVista WWW - Google Om UiO Studier Studentliv Forskning ... Student - Hovedfagsstudiet ved Matematisk institutt Hovedfagsstudiet ved Matematisk institutt En liten orientering FORORD INNHOLDSFORTEGNELSE 1. GENERELT 1.1 Innledning 1.2 Matematisk institutt 1.3 Hva denne informasjonen ikke omfatter ... 7.1 Regler for avvikling av hovedfagseksamen ved Matematisk institutt 1. GENERELT 1.1 Innledning 1.2 Matematisk institutt Matematisk institutt Postboks 1053, Blindern 0316 Oslo. 1.3 Hva denne informasjonen ikke omfatter I Reglement for cand. mag.-graden ved Det matematisk-naturvitenskapelige fakultet Mulige studieretninger i matematikk, mekanikk, statistikk og AIM Emnebeskrivelser av alle laveregradsemner i matematikk, mekanikk og statistikk Alle mulige kombinasjoner og sammensetninger av emner, emnegrupper og studieretningsgrupper mot et hovedfag i matematikk, mekanikk, statistikk eller AIM. Meldingsgrunnlag, melding til hovedfag og opptakskriterier Aktiv eller passiv student: Rettigheter og forpliktelser Overordnet om oppgavetyper, pensum og eksamen

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