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D O W N I N G C O ...
https://www.dow.cam.ac.uk/sites/default/files/accounts10.pdf5 Jan 2011: 2009). Burton, Dr Timothy JBurton TJ, Cope G, Wang J, Sim JC, Azizan EA, O’Shaughnessy KM, Brown MJ (2009). -
Bin BrookdraftLent2011.indd
https://www.robinson.cam.ac.uk/sites/default/files/alumni/binbrook/binbrook_lent11.pdf7 Apr 2011: 14. Opposite page: TJ & Pat (pilots), Peter and me. This page, starting at the top going clockwise: Maasai hut, view of Maasai settlement from the plane, the clinic room with examination -
Topics in Analysis: Example Sheet 3 Michaelmas 2011-12 N. ...
https://www.dpmms.cam.ac.uk/study/II/TopicsinAnalysis/2011-2012/11-12sheet3.pdf15 Nov 2011: 3) Let Tj be the jth Chebychev polynomial. Suppose γj is a sequence of non-negative numberswith. -
201019079 1..6
www.damtp.cam.ac.uk/user/gold/pdfs/PNAS-2011-Drescher-1019079108.pdf20 Jun 2011: Phys Rev E Stat Nonlin Soft Matter Phys 80:041922.22. Ishikawa T, Locsei JT, Pedley TJ (2008) Development of coherent structures in concen-. ... Science 325:487–490. 43. Pedley TJ, Kessler JO (1992) Hydrodynamic phenomena in suspensions of -
cond1.dvi
www.damtp.cam.ac.uk/user/na/people/Alexei/papers/cond1.pdf1 Sep 2011: More details on the problems relevant to k;p can befound in [1],[2],[5].Recall that Nj(t) := (tjk tj) [tj; tj1; : : :; tjk] ( t)k1+ ;so that suppNj = (tj; tjk); ... degree p such thatsuppMj;p = (tj; tjp1); Z tjp1tj Mj;p(x)dx = 1;and by! -
DAMTP 2010/NA04 Beyond symmetric Broyden for updating quadratic…
www.damtp.cam.ac.uk/user/na/NA_papers/NA2010_04.pdf13 Apr 2011: F(x) = 12xT{ n. j=1 100(j1)/(n1) vj v. Tj. }x, xRn. -
msq114 2284..2299
www.jiggins.gen.cam.ac.uk/pdfs/Juneja&Lazzaro2010.pdf12 Apr 2011: Haplotype Structure and Expression Divergence at theDrosophila Cellular Immune Gene eater. Punita Juneja and Brian P. LazzaroDepartment of Entomology, Cornell University, Ithaca, New York. Corresponding author: E-mail: pj46@cornell.edu. Associate -
Markov Chains, Computer Proofs, andAverage-Case Analysis of Best Fit…
https://www.statslab.cam.ac.uk/~rrw1/publications/Coffman%20-%20Johnson%20-%20Shor%20-%20Weber%201993%20Markov%20chains,%20computer%20proofs,%20and%20average-case%20analysis%20of%20best%20fit%20bin%20packing.pdf15 Sep 2011: chains Mj,K, t > 1,which have the same state space w MJ,K = (S,K, TJ,K ),but have product matrices J,K for transition functions, i.e.,chains in ... The tint is theta [ 1, an n(,K x. larray of integers,that is used as a sparse representation for the -
THE THEORY OF OPTIMAL STOPPING RICHARD Re WEBER DOWNING ...
https://www.statslab.cam.ac.uk/~rrw1/publications/The%20theory%20of%20optimal%20stopping%20(Part%20III%20essay).pdf21 Oct 2011: Then n= 22 and k(22)= 9. So we should marry. when, for the first tJ.me after our 26th bilhday, we meet a girl who. ... and ( iii ). N-oo mot ivate the defini.tj.ons giYen belmr. 3. 1 • 2 Defi nitions. -
201019079 7..12
www.damtp.cam.ac.uk/user/gold/pdfs/noise_SI.pdf6 Jul 2011: 1. Pedley TJ, Kessler JO (1992) Hydrodynamic phenomena in suspensions of swimmingmicroorganisms. -
cond2.dvi
www.damtp.cam.ac.uk/user/na/people/Alexei/papers/cond2.pdf1 Sep 2011: 2. Condition number and related constantsLet fN̂jg be the B-spline basis of order k on a knot sequence t = (tj), tj < tjk,normalized with respect to the Lp-norm (1 ... p 1), i.e.,N̂j(x) = (k=(tjk tj))1=pNj(x);where fNjg is the B-spline basis which -
PHYSICAL REVIEW E 83, 031306 (2011) Shallow granular flows ...
www.itg.cam.ac.uk/people/heh/Paper226.pdf13 Apr 2011: i. j. [h(xi ,tj ) f (xi ctj )]2, (2). where h represents the thickness recorded at discrete positionsxi and times tj. -
Generalized sampling and the stable and accuratereconstruction of…
www.damtp.cam.ac.uk/user/na/NA_papers/NA2011_12.pdf22 Nov 2011: Tj(x) = cos(j arccos x), j = 0, 1, 2,. ,. and c0 = 1π , cj =. 2π , j 6= 1. ... Given that the polynomials Tj are orthogonal with respect to the weight. -
MMB160.indd
www.damtp.cam.ac.uk/user/gold/pdfs/spirochete_review.pdf10 Apr 2011: Nature 2001; 413: 39–44. Wilson DR, Beveridge TJ: Bacterial f lagellar fila-ments and their component f lagellins. -
Effective Bandwidths for Stationary Sources
https://www.statslab.cam.ac.uk/~rrw1/publications/Courcoubetis%20-%20Weber%201995%20Effective%20bandwidths%20for%20stationary%20sources.pdf15 Sep 2011: P, = m, o(6). (3). PROOF: Suppose that we observe the contents of the buffer at the ends ofepochs (tj]1L_„, where t-, = / [ £ / £ ] , for some £ > 0. -
Pub lishe d by Man ey P ublis hing ...
www.phase-trans.msm.cam.ac.uk/2002/Widmanstatten.pdf6 Nov 2011: It follows that. fMs'La = v{}'L-M Tj v{T} dT. (20)Figure 1 of Ref. -
ON THE AUTOMORPHY OF l-ADIC GALOISREPRESENTATIONS WITH SMALL RESIDUAL …
https://www.dpmms.cam.ac.uk/~jat58/bigness.pdf29 Jul 2011: 1n1 00 αj. )m. ]. One computes easily that V j = qjn1/2t(Tj). ... Note that since t is analgebra homomorphism, the fact that the Tj commute implies that theoperators V j must also commute. -
ppat.1002260 1..9
www.jiggins.gen.cam.ac.uk/pdfs/longdon2011c.pdf26 Sep 2011: Host Phylogeny Determines Viral Persistence andReplication in Novel HostsBen Longdon1,2, Jarrod D. Hadfield1, Claire L. Webster1,2, Darren J. Obbard1,2., Francis M. Jiggins3. 1 Institute of Evolutionary Biology, University of Edinburgh, Ashworth Labs -
On the Optimality of LEPT and c Rules for Machines in Parallel
https://www.statslab.cam.ac.uk/~rrw1/publications/Chang%20...%20Weber%201992%20On%20the%20optimality%20of%20LEPT%20and%20cu%20rules%20for%20machines%20in%20parallel.pdf15 Sep 2011: Corollary 3.6 (minimization of the expected weighted sum ofjob tardinesses). The tardiness of job j, Tj, is defined as max(Zj - Dj, 0). ... Suppose (A 1) and (A 4) hold, and D, : D2 _? 5 D, a.s. Then n minimizes E[ I=1 cj Tj]. Proof. -
Representation Theory Lectured by S. Martin Lent Term 2009, ...
https://www.dpmms.cam.ac.uk/study/II/RepresentationTheory/2010-2011/Representation_Theory.pdf12 Jul 2011: Representation Theory. Lectured by S. Martin. Lent Term 2009, 2010, 2011. 1 Group Actions 1. 2 Linear Representations 3. 3 Complete Reducibility and Maschke’s Theorem 7. 4 Schur’s Lemma 10. 5 Character Theory 13. 6 Proofs and Orthogonality 17. 7
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