I am running late this month. There are 3 new papers this time, fron BrownR, Muro, and SmithL. Mark Hovey New papers appearing on hopf between 2/3/07 and 3/19/07 1. http://hopf.math.purdue.edu/cgi-bin/generate?/BrownR/glob-gpds2 AUTHOR: Ronald Brown AUTHOR ADDRESS: School of Computer Science, University of Wales, Dean St., Bangor, Gwynedd, LL57 1UT, UK; TITLE: A new higher homotopy groupoid: the fundamental globular omega-groupoid of a filtered space MSC Classification:18D10, 18G30, 18G50, 20L05, 55N10, 55N25. KEY WORDS: filtered space, higher homotopy van Kampen theorem, cubical singular complex, free globular groupoid xxxLANL archive: math.AT/0702677 2 eps files, 19 pages ABSTRACT: We show that the graded set of filter homotopy classes rel vertices of maps from the n-globe to a filtered space may be given the structure of globular omega--groupoid. The proofs use an analogous fundamental cubical omega--groupoid due to the author and Philip Higgins. This method also relates the construction to the fundamental crossed complex of a filtered space, and this relation allows the proof that the crossed complex associated to the free globular omega-groupoid on one element of dimension n is the fundamental crossed complex of the n-globe. 2. http://hopf.math.purdue.edu/cgi-bin/generate?/Muro/tcwm6 Title: A triangulated category without models Author(s): Fernando Muro Author's mailing address: Universitat de Barcelona, Facultat de Matemàtiques, Departament d'Àlgebra i Geometria, Gran Via de les Corts Catalanes 585, 08007 Barcelona, Spain AMS classification number: 18E30, 55P42, 16E40 Abstract: We exhibit a triangulated category which is neither the stable category of a Frobenius category nor a full triangulated subcategory of the homotopy category of a stable model category. 3. http://hopf.math.purdue.edu/cgi-bin/generate?/SmithL/13a50 (This abstract was written by Mark) Reference list on Invariant Theory Author: Larry Smith AMS Code: 13A50 Invariant Theory Address: Mathematisches Institut Bunsenstrasse 3--5 D 37073 Goettingen Federal republic of germany Abstract: This is a list of references in invariant theory. The .tex file is included so that one can import references into a document. The journals.tex file includes macros for journals. ----------------