{"id":22,"date":"2012-09-05T11:22:33","date_gmt":"2012-09-05T15:22:33","guid":{"rendered":"https:\/\/people.clas.ufl.edu\/template\/?page_id=22"},"modified":"2026-03-19T08:10:56","modified_gmt":"2026-03-19T12:10:56","slug":"research","status":"publish","type":"page","link":"https:\/\/people.clas.ufl.edu\/sin\/research\/","title":{"rendered":"Papers and preprints"},"content":{"rendered":"\r\n<section class=\"fullwidth-text-block\">\r\n\t<div class=\"container px-0 pt-5\">\r\n\t\t<div class=\"row align-items-start\">\r\n\t\t\t<div class=\"col-12\">\r\n\t\t\t\t\n<h1 class=\"wp-block-heading\">Papers and preprints<\/h1>\n\n\n\n<ul class=\"wp-block-list\"><li>\n<a href=\"https:\/\/people.clas.ufl.edu\/sin\/content-removed\/\" rel=\"attachment wp-att-743\">List of publications<\/a>\n<\/li>\n<li>\nPerfect and multiple state transfer in oriented Cayley graphs,<br \/>\nAda Chan, Venkata Raghu Tej Pantangi, Andriaherimanana Sarobidy Razafimahatratra and Peter Sin,<br \/>\n<a href=\"https:\/\/arxiv.org\/abs\/2510.09873\">arxiv:2510.09873<\/a>\n<\/li>\n<li> Peter Sin, Uniform mixing in continuous-time quantum walks on oriented, nonabelian Cayley graphs,<br \/>\n<a href=\"https:\/\/arxiv.org\/abs\/2510.08376\">arxiv:2510.08376<\/a>\n<\/li>\n<li>\nPeter Sin, The Smith normal form of Hadamard matrices from Paley&#8217;s second construction, Electronic J. Linear Algebra 41 (2025), <a href=\"https:\/\/people.clas.ufl.edu\/sin\/content-removed\/\" rel=\"attachment wp-att-1387\">pdf<\/a><br \/>\n<a href=\"https:\/\/journals.uwyo.edu\/index.php\/ela\/article\/view\/9615\"> Journal page <\/a>\n<\/li>\n<li>Venkata Raghu Tej Pantangi, Peter Sin, Perfect state transfer in graphs related to linear groups in two dimensions, Algebraic Combinatorics.<br \/>\nVolume 9 (2026) no. 1 p. 261-287. <a href=\"https:\/\/alco.centre-mersenne.org\/articles\/10.5802\/alco.469\/\"> Journal page<\/a><br \/>\n<a href=\"https:\/\/arxiv.org\/abs\/2408.14807\"> arxiv:2408.14807 <\/a>\n<\/li>\n<li>Ada Chan,  Peter Sin, Pretty good state transfer among large sets of vertices, <a href=\"https:\/\/escholarship.org\/uc\/item\/7kk1z825\">Combinatorial Theory 4 (2) (2024)<\/a>.<br \/>\n<a href=\"http:\/\/arxiv.org\/abs\/2305.14276\">arxiv:2305.14276<\/a>\n<\/li>\n<li>Peter Sin, Large sets of strongly cospectral vertices in Cayley graphs,<br \/>\nVietnam J. of Mathematics 52 (2023), 411-420.<br \/>\n<a href=\"https:\/\/arxiv.org\/abs\/2207.05211\">arxiv:2207.05211<\/a>\n<\/li>\n<li> Peter Sin and Julien Sorci, Continuous-time quantum walks on Cayley graphs of extraspecial groups,<br \/>\n<a href=\"https:\/\/arxiv.org\/abs\/2011.07566\">arxiv:2011.07566<\/a>  Algebraic Combinatorics 5 (2022), 699-714.\n<\/li>\n<li>Karen Meagher and Peter Sin, All 2-transitive groups have the EKR-module property, J. Comb. Theory A  177 (2021) Article 105322,<br \/>\n<a href=\"https:\/\/arxiv.org\/abs\/1911.11252\">arXiv:1911.11252<\/a>\n<\/li>\n<li> Peter Sin, Julien Sorci and Qing Xiang, Linear representations of finite geometries and associated LDPC codes,  J. Comb. Theory A 173 (2020) Article 105238,<br \/>\n<a href=\"https:\/\/arxiv.org\/abs\/1908.06824\">arxiv:1908.06824<\/a>\n<\/li>\n<li> Joshua Ducey, Ian Hill and Peter Sin,<br \/>\nThe critical group of the Kneser graph on 2-element subsets of an n-element set,<br \/>\nLinear Algebra and its Applications (2018) Volume 546, Pages 154-168.<br \/>\n<a href=\"https:\/\/urldefense.proofpoint.com\/v2\/url?u=https-3A__authors.elsevier.com_a_1WbNE5YnCXp7r&amp;d=DwMFaQ&amp;c=eLbWYnpnzycBCgmb7vCI4uqNEB9RSjOdn_5nBEmmeq0&amp;r=a2R-vrmS4LlhNlgL-esMIA&amp;m=Ts-Uxrapfcn3deqYj0BQ4CweQCOFBRbJ3ieePlujkYQ&amp;s=gs9pobaIoYLBigAeUD5b5ab6pADqt_03gXpBqluyoD4&amp;e=\"> journal link<\/a><br \/>\n<a href=\"https:\/\/arxiv.org\/abs\/1707.09115\">arxiv.org:1707.09115<\/a>\n<\/li>\n<li> Venkata Raghu Tej Pantangi and  Peter Sin, Smith and Critical groups of Polar Graphs,  J. Comb. Theory A. 167 (2019), 460-498.<br \/>\n<a href=\"https:\/\/arxiv.org\/abs\/1706.08175\"> arxiv.org:1706.08175<\/a>\n<\/li>\n<li>Josh Ducey and Peter Sin, The Smith group and the critical group of the Grassmann graph of lines in finite projective space and of its complement,<br \/>\nBulletin of the Institute of Mathematics Academia Sinica 13 (4) (2018) 411-442.<br \/>\n<a href=\"https:\/\/arxiv.org\/abs\/1706.01294\">arxiv.org\/abs\/1706.01294<\/a>\n<\/li>\n<li>Ling Long, Rafael Plaza, Peter Sin, Qing Xiang, Characterization of intersecting families of maximum size in PSL(2,q),  J. Comb. Theory A. 157 (2018), 461-499.<br \/>\n<a href=\"http:\/\/arxiv.org\/abs\/1608.07304\">arXiv.org:1608.07304<\/a> \n<\/li>\n<li>P. Sin, The critical groups of the Peisert graphs P*(q), J. Alg. Combinatorics  48(2) (2018), 227-245 <a href=\"https:\/\/link.springer.com\/article\/10.1007\/s10801-017-0797-8?wt_mc=Internal.Event.1.SEM.ArticleAuthorOnlineFirst\">Journal link<\/a><br \/>\n<a href=\"http:\/\/arxiv.org\/abs\/1606.00870\"> arxiv.org:1606.00870<\/a><br \/>\n<a href=\"https:\/\/people.clas.ufl.edu\/sin\/content-removed\/\" rel=\"attachment wp-att-730\">pdf<\/a><br \/>\nUpdate: The question at the end of the paper on integral conjugacy has been answered in the affirmative by G. Nebe, in <a href=\"https:\/\/arxiv.org\/abs\/1910.05974\">On conjugacy of diagonalizable integral matrices, arXiv:1910.05974<\/a>\n<\/li>\n<li>F. Ihringer, P. Sin and Q. Xiang, New bounds for partial spreads in H(2d-1,q^2) and partial ovoids of the Ree-Tits octagon,<br \/>\nJ. Comb. Theory A 153 (2018) 46-53.<br \/>\n<a href=\"https:\/\/people.clas.ufl.edu\/sin\/content-removed\/\" rel=\"attachment wp-att-879\">pdf<\/a><br \/>\n<a href=\"http:\/\/arxiv.org\/abs\/1604.06172\"> arxiv:1604.06172<\/a>\n<\/li>\n<li>David Chandler, Peter Sin and Qing Xiang, The Smith group of the hypercube graph,<br \/>\nDesigns, Codes and Cryptography Volume 84, (2017)  Issue 1-2, pp 283-294.<br \/>\n<a href=\"http:\/\/arxiv.org\/abs\/1511.00272\">arXiv:1511.00272<\/a><br \/>\n<a href=\"http:\/\/link.springer.com\/article\/10.1007\/s10623-016-0291-7\">journal link<\/a><a><br \/>\n<\/a><\/li>\n<li>\nA note on point stabilizers in sharp permutation groups of type {0,k}, D. Brozovic and P. Sin,<br \/>\nCommunications in Algebra 44 (8)(2016) 3324-3339. <a href=\"https:\/\/people.clas.ufl.edu\/sin\/content-removed\/\" rel=\"attachment wp-att-627\">pdf<\/a>\n<\/li>\n<li>Alexander Kleshchev, Peter Sin and Pham Huu Tiep, Representations of the alternating group which are irreducible over subgroups. II,<br \/>\n Amer. J. Math. 138 (2016), no. 5, 1383\u20131423. <a href=\"http:\/\/arxiv.org\/abs\/1405.3324\">arXiv:1405.3324 <\/a>\n<\/li>\n<li>O. Arslan and P. Sin,<br \/>\nA Remark on Grassmann and Veronese embeddings of PG(3) in chracteristic 2,<br \/>\nInnovations in Incidence Geometry 14, (2015), 111-117.<br \/>\n<a href=\"https:\/\/people.clas.ufl.edu\/sin\/content-removed\/\">Journal<\/a><br \/>\n<a href=\"https:\/\/people.clas.ufl.edu\/sin\/content-removed\/\" rel=\"attachment wp-att-628\">pdf<\/a>\n<\/li>\n<li> D. B. Chandler, P. Sin, Q. Xiang, The Smith and critical groups of Paley graphs,<br \/>\nJournal of Algebraic Combinatorics: Volume 41, Issue 4 (2015), Page 1013-1022<br \/>\n<a href=\"https:\/\/people.clas.ufl.edu\/sin\/content-removed\/\">pdf<\/a>\n<\/li>\n<li>P. Sin, Some Weyl modules of the algebraic groups of type E6,<br \/>\n<a href=\"https:\/\/people.clas.ufl.edu\/sin\/content-removed\/\">pdf <\/a><br \/>\nChapter 15 in &#8220;Groups of Exceptional Type, Coxeter Groups and related Geometries&#8221; , Springer Proceedings in Mathematics and Statistics, vol. 82,<br \/>\n(N. Narasimha Sasstry ed.), (2014), 279-300.\n<\/li>\n<li>Peter Sin and John. G. Thompson, Some uniserial representations of certain special linear groups,  Journal of Algebra vol. 398 (2014) pp. 448-460<br \/>\n<a href=\"https:\/\/people.clas.ufl.edu\/sin\/content-removed\/\">pdf<\/a>\n<\/li>\n<li>P. Sin, Smith normal forms of incidence matrices<br \/>\n<a href=\"https:\/\/people.clas.ufl.edu\/sin\/content-removed\/\">pdf<\/a>,<br \/>\n<a href=\"http:\/\/link.springer.com\/article\/10.1007\/s11425-013-4643-8\"> Science China Mathematics,V56 (2013), No. 7, 1359-1371. <\/a>\n<\/li>\n<li>P. Sin, On codes that are invariant under the affine group,<br \/>\nElec. J. Combinatorics 19(4), #P20, (2012), 1-14.<br \/>\n<a href=\"http:\/\/www.combinatorics.org\/ojs\/index.php\/eljc\/article\/view\/v19i4p20\">pdf at EJC.<\/a><a><br \/>\n<\/a>\n<\/li>\n<li>Andries E. Brouwer, Joshua E. Ducey and Peter Sin, The Elementary Divisors of the Incidence Matrix of Skew<br \/>\nLines in PG(3,q),<br \/>\nProc. Amer. Math. Soc. 140 (2012) 2561-2573 <a href=\"http:\/\/arxiv.org\/abs\/1103.0062v2\">arxiv:math\/1103.0062v2<\/a><\/li>\n<li>P. Sin, Oppositeness in buildings and simple modules for finite groups<br \/>\nof Lie type,<br \/>\n<a href=\"https:\/\/people.clas.ufl.edu\/sin\/content-removed\/\" rel=\"attachment wp-att-588\">pdf<\/a>,<br \/>\n&#8220;Buildings, Finite Geometries and Groups&#8221;, Springer Proceedings in Mathematics Volume 10,(2011), 273&#8211;286.<a href=\"http:\/\/arxiv.org\/abs\/1102.5404v1\">arxiv:math\/1102.5404v1<\/a><\/li>\n<li>Ogul Arslan and Peter Sin, Some simple modules for classical groups and p-ranks of orthogonal<br \/>\nand Hermitian geometries,<br \/>\nJournal of Algebra 327 (2011) 141&#8211;169<br \/>\n<a href=\"http:\/\/arxiv.org\/abs\/0908.3035v3\">arXiv:math\/0908.3035<\/a>(2010)<\/li>\n<li>Peter Sin, Junhua Wu and Qing Xiang, Dimensions of Some Binary Codes Arising From A Conic in PG(2,q),<br \/>\n J. Comb. Theory A,<br \/>\n118, 853&#8211;878.<br \/>\n<a href=\"http:\/\/arxiv.org\/abs\/0911.2018\">arXiv:math\/0911.2018<\/a> (2011)<\/li>\n<li>Peter Sin and John G. Thompson, The Divisor Matrix, Dirichlet Series and SL(2,Z), II,<br \/>\n<a href=\"http:\/\/arxiv.org\/abs\/0803.1121\">arXiv:math\/0803.1121<\/a> (2010)<\/li>\n<li>Peter Sin and John G. Thompson, The Divisor Matrix, Dirichlet Series and SL(2,Z),<br \/>\n in &#8220;The legacy of Alladi Ramakrishnan in the mathematical sciences&#8221; (K. Alladi, J. Klauder, C.<br \/>\nR. Rao, Eds.), Developments in Mathematics, Springer (2010)<br \/>\n<a href=\"http:\/\/arxiv.org\/abs\/0712.0837\">arXiv:math\/0712.0837<\/a>\n\t<\/li>\n<li>Book Review of &#8220;Finite Group Theory&#8221; by I. Martin Isaacs<br \/>\n<a href=\"https:\/\/people.clas.ufl.edu\/sin\/content-removed\/\">American Mathematical<br \/>\nMonthly, Vol. 117, Number 7, August-September 2010<\/a><br \/>\n<a href=\"https:\/\/people.clas.ufl.edu\/sin\/content-removed\/\" rel=\"attachment wp-att-896\">pdf (corrected version)<\/a>\n<\/li>\n<li>Asoo J. Vakharia, Yuwen Chen, Janice E. Carrillo and Peter K. Sin, Fusion Product Planning: A Market Offering Perspective,<br \/>\nDecision Sciences Journal, Volume 41, Number 2, (2010), 235&#8211;253.<br \/>\n<a href=\"http:\/\/www.google.com\/url?sa=t&amp;rct=j&amp;q=fusion%20product%20planning%3A%20a%20market%20offering%20perspective&amp;source=web&amp;cd=2&amp;cad=rja&amp;sqi=2&amp;ved=0CDoQFjAB&amp;url=http%3A%2F%2Fonlinelibrary.wiley.com%2Fdoi%2F10.1111%2Fj.1540-5915.2010.00271.x%2Fpdf&amp;ei=mlAEUb7AHZHo8wT354CYAw&amp;usg=AFQjCNE3YyvvSge-ul19RQX8d8lc9yOTXg\">pdf at Decision Sciences<\/a><\/li>\n<li>David Chandler, Qing Xiang and Peter Sin, Incidence modules for symplectic spaces in characteristic two,  <a href=\"http:\/\/arxiv.org\/abs\/0801.4392\">arXiv:0801.4392v1<\/a> ,Journal of Algebra 323 (2010) 3157-3181.<\/li>\n<li>David Chandler, Qing Xiang and Peter Sin, The permutation action of finite symplectic groups of odd<br \/>\ncharacteristic on their Standard Modules ,  J. Algebra 318, (2007), 871-892. <a href=\"http:\/\/arxiv.org\/abs\/math\/0603100\"><br \/>\narXiv:math\/0603100<\/a><\/li>\n<li> Peter Sin and Qing Xiang,On the dimensions of certain LDPC codes based on q-regular bipartite<br \/>\ngraphs, IEEE Trans. Information Theory 52<br \/>\n(issue 8, 2006) 3735-3737.<br \/>\n<a href=\"http:\/\/arxiv.org\/abs\/cs\/0506011\"> arXiv:cs\/0506011<\/a><\/li>\n<li>David Chandler, Qing Xiang and Peter Sin, The invariant factors of incidence matrices of points and subspaces<br \/>\nin PG(n,q),<br \/>\nTrans. Amer. Math. Soc. 358 (2006) 3537-3559<br \/>\n<a href=\"http:\/\/www.ams.org\/journals\/tran\/2006-358-11\/\">AMS link<\/a><br \/>\n<a href=\"http:\/\/arxiv.org\/abs\/math\/0312506\"> arxiv:\/math\/0312506<\/a><\/li>\n<li> P. Sin and P. H. Tiep, Rank 3 permutation modules of the finite classical groups, J. Algebra 291 (2005) 551-606<br \/>\n<a href=\"https:\/\/people.clas.ufl.edu\/sin\/content-removed\/\">pdf<\/a>\n\t<\/li>\n<li>P. Sin, The p-rank of the incidence matrices of intersecting linear<br \/>\nsubspaces, Designs, Codes and Cryptography 31 (2004), 213-220<br \/>\n<a href=\"https:\/\/people.clas.ufl.edu\/sin\/content-removed\/\">pdf<\/a>\n\t<\/li>\n<li>J. M. Lataille, P. Sin and P. H. Tiep, The Modulo 2 Structure of rank 3 permutation modules for<br \/>\nodd characteristic symplectic groups ,<br \/>\nJ. Algebra 268 (2003),463-483.<br \/>\n<a href=\"https:\/\/people.clas.ufl.edu\/sin\/content-removed\/\">pdf<\/a><br \/>\n<a href=\"https:\/\/people.clas.ufl.edu\/sin\/content-removed\/\" rel=\"attachment wp-att-963\">erratum<\/a>\n<\/li>\n<li>N. S. N. Sastry and P. Sin, On the doubly transitive permutation representations<br \/>\nof the groups Sp(2n,2), J. Algebra 257 (2002), 509-527<br \/>\n<a href=\"https:\/\/people.clas.ufl.edu\/sin\/content-removed\/\">pdf<\/a>\n\t<\/li>\n<li>P. Sin, The permutation module of a symplectic vector space over<br \/>\na field of prime order, J. Algebra, 241, 578-591 (2001)<br \/>\n<a href=\"https:\/\/people.clas.ufl.edu\/sin\/content-removed\/\">pdf<\/a>\n<\/li>\n<li>\nN. S. N. Sastry and P. Sin, Codes associated with nondegenerate quadrics of a symplectic space of even order, J. Combinatorial Theory A, vol. 94, no. 1, pp. 1-14, 2001.<br \/>\n<a href=\"https:\/\/people.clas.ufl.edu\/sin\/content-removed\/\" rel=\"attachment wp-att-867\">pdf<\/a>\n<\/li>\n<li>P. Sin, The elementary divisors of the incidence matrices of points<br \/>\nand linear subspaces of projective space<br \/>\nover a field of prime order, J. Algebra 232, 76-85 (2000)<br \/>\n<a href=\"https:\/\/people.clas.ufl.edu\/sin\/content-removed\/\">pdf<\/a>\n<\/li>\n<li>\nM. Bardoe and P. Sin, The permutation modules for GL(n + 1;Fq)<br \/>\nacting on Pn(Fq) and (Fq)^n,  J. London Math. Soc. (2), vol. 61, no. 1, 58-80,<br \/>\n(2000).<br \/>\n<a href=\"https:\/\/people.clas.ufl.edu\/sin\/content-removed\/\" rel=\"attachment wp-att-845\">pdf<\/a>\n<\/li>\n<li> N. S. N. Sastry and P. Sin, The code of a regular generalized<br \/>\nquadrangle of even order, in Group representations: cohomology, group actions<br \/>\nand topology (Seattle, WA, 1996), vol. 63 of Proc. Sympos. Pure Math.,<br \/>\npp. 485-496, Providence, RI: Amer. Math. Soc., 1998<br \/>\n<a href=\"https:\/\/people.clas.ufl.edu\/sin\/content-removed\/\" rel=\"attachment wp-att-864\">pdf<\/a>\n<\/li>\n<li>\nP. Sin, Modular representations of the Hall-Janko group, Comm. Algebra, vol. 24, no. 14, pp. 4513-4547, 1996.<br \/>\n<a href=\"https:\/\/people.clas.ufl.edu\/sin\/content-removed\/\" rel=\"attachment wp-att-869\">pdf<\/a>\n<\/li>\n<li>\nM. F. Dowd and P. Sin, On representations of algebraic groups in<br \/>\ncharacteristic two, Comm. Algebra, vol. 24, no. 8, pp. 2597-2686, 1996.<br \/>\n<a href=\"https:\/\/people.clas.ufl.edu\/sin\/content-removed\/\" rel=\"attachment wp-att-863\">pdf<\/a>\n<\/li>\n<li>\nP. Sin, Extensions of simple modules for special algebraic groups, J.<br \/>\nAlgebra, vol. 170, no. 3, pp. 1011-1034, 1994.<br \/>\n<a href=\"https:\/\/people.clas.ufl.edu\/sin\/content-removed\/\" rel=\"attachment wp-att-856\">pdf<\/a>\n<\/li>\n<li> P. Sin, The cohomology in degree 1 of the group F4 in characteristic<br \/>\n2 with coeffcients in a simple module, J. Algebra, vol. 164, no. 3,<br \/>\npp. 695-717, 1994.<br \/>\n<a href=\"https:\/\/people.clas.ufl.edu\/sin\/content-removed\/\" rel=\"attachment wp-att-865\">pdf<\/a>\n<\/li>\n<li>\nG. R. Robinson and P. Sin, A note on Brauer&#8217;s induction theorem,<br \/>\nJ. Algebra, vol. 162, no. 1, pp. 92-94, 1993.<br \/>\n<a href=\"https:\/\/people.clas.ufl.edu\/sin\/content-removed\/\" rel=\"attachment wp-att-851\">pdf<\/a>\n<\/li>\n<li>\nP. Sin, Extensions of simple modules for G_2(3^n) and ^2G_2(3^m), Proc.<br \/>\nLondon Math. Soc. (3), vol. 66, no. 2, pp. 327-357, 1993.<br \/>\n<a href=\"https:\/\/people.clas.ufl.edu\/sin\/content-removed\/\" rel=\"attachment wp-att-853\">pdf<\/a>\n<\/li>\n<li>P. Sin, On the 1-cohomology of the groups G_2(2^n), Comm. Algebra,<br \/>\nvol. 20, no. 9, pp. 2653-2662, 1992.<br \/>\n<a href=\"https:\/\/people.clas.ufl.edu\/sin\/content-removed\/\" rel=\"attachment wp-att-860\">pdf<\/a><br \/>\n<a href=\"https:\/\/people.clas.ufl.edu\/sin\/content-removed\/\" rel=\"attachment wp-att-861\">erratum<\/a>\n<\/li>\n<li>\nP. Sin, Extensions of simple modules for SL_3(2^n) and SU_3(2^n),&#8221; Proc.<br \/>\nLondon Math. Soc. (3), vol. 65, no. 2, pp. 265-296, 1992.<br \/>\n<a href=\"https:\/\/people.clas.ufl.edu\/sin\/content-removed\/\" rel=\"attachment wp-att-854\">pdf<\/a>\n<\/li>\n<li>\nP. Sin, On the representation theory of modular Hecke algebras,<br \/>\nJ.Algebra, vol. 146, no. 2, pp. 267-277, 1992.<br \/>\n<a href=\"https:\/\/people.clas.ufl.edu\/sin\/content-removed\/\" rel=\"attachment wp-att-862\">pdf<\/a>\n<\/li>\n<li>\nP. Sin, Extensions of simple modules for Sp_4(2^n) and Suz(2^m),&#8221; Bull.<br \/>\nLondon Math. Soc., vol. 24, no. 2, pp. 159-164, 1992.<br \/>\n<a href=\"https:\/\/people.clas.ufl.edu\/sin\/content-removed\/\" rel=\"attachment wp-att-855\">pdf<\/a>\n<\/li>\n<li>\nP. Sin and W. Willems, G-invariant quadratic forms, J. Reine Angew.<br \/>\nMath., vol. 420, pp. 45-59, 1991.<br \/>\n<a href=\"https:\/\/people.clas.ufl.edu\/sin\/content-removed\/\" rel=\"attachment wp-att-857\">pdf<\/a>\n<\/li>\n<li>\nP. Sin, The Green ring and modular representations of finite groups of<br \/>\nLie type, J. Algebra, vol. 123, no. 1, pp. 185-192, 1989.<br \/>\n<a href=\"https:\/\/people.clas.ufl.edu\/sin\/content-removed\/\" rel=\"attachment wp-att-866\">pdf<\/a>\n<\/li>\n<li>P. Sin and W. Willems, On induced projective indecomposable modules, Proc. Amer. Math. Soc., vol. 105, no. 4, pp. 793-801, 1989.<br \/>\n<a href=\"https:\/\/people.clas.ufl.edu\/sin\/content-removed\/\" rel=\"attachment wp-att-858\">pdf<\/a>\n<\/li>\n<li>\nP. K. W. Sin, A Green ring version of the Brauer induction theorem,<br \/>\nJ. Algebra, vol. 111, no. 2, pp. 528-535, 1987.<br \/>\n<a href=\"https:\/\/people.clas.ufl.edu\/sin\/content-removed\/\" rel=\"attachment wp-att-850\">pdf<\/a>\n<\/li><\/ul>\n\n\n\n<address>\u00a0<\/address>\n\n\n\n<p><!-- hhmts start --> Last modified: Sun Apr 22 21:28:47 EDT 2012 <!-- hhmts end --><\/p>\n\n\n\r\n\t\t\t<\/div>\r\n\t\t<\/div>\r\n\t<\/div>\r\n<\/section>\r\n","protected":false},"excerpt":{"rendered":"","protected":false},"author":142,"featured_media":0,"parent":0,"menu_order":0,"comment_status":"closed","ping_status":"closed","template":"","meta":{"_acf_changed":false,"featured_post":"","footnotes":"","_links_to":"","_links_to_target":""},"class_list":["post-22","page","type-page","status-publish","hentry"],"acf":[],"_links":{"self":[{"href":"https:\/\/people.clas.ufl.edu\/sin\/wp-json\/wp\/v2\/pages\/22","targetHints":{"allow":["GET"]}}],"collection":[{"href":"https:\/\/people.clas.ufl.edu\/sin\/wp-json\/wp\/v2\/pages"}],"about":[{"href":"https:\/\/people.clas.ufl.edu\/sin\/wp-json\/wp\/v2\/types\/page"}],"author":[{"embeddable":true,"href":"https:\/\/people.clas.ufl.edu\/sin\/wp-json\/wp\/v2\/users\/142"}],"replies":[{"embeddable":true,"href":"https:\/\/people.clas.ufl.edu\/sin\/wp-json\/wp\/v2\/comments?post=22"}],"version-history":[{"count":11,"href":"https:\/\/people.clas.ufl.edu\/sin\/wp-json\/wp\/v2\/pages\/22\/revisions"}],"predecessor-version":[{"id":1583,"href":"https:\/\/people.clas.ufl.edu\/sin\/wp-json\/wp\/v2\/pages\/22\/revisions\/1583"}],"wp:attachment":[{"href":"https:\/\/people.clas.ufl.edu\/sin\/wp-json\/wp\/v2\/media?parent=22"}],"curies":[{"name":"wp","href":"https:\/\/api.w.org\/{rel}","templated":true}]}}