Hog-Angeloni, Cynthia (ed.); Metzler, Wolfgang (ed.); Sieradski, Allan J. (ed.) Two-dimensional homotopy and combinatorial group theory. (English) Zbl 0788.00031 London Mathematical Society Lecture Note Series. 197. Cambridge: Cambridge University Press. xi, 412 p. (1993). Show indexed articles as search result. The articles of this volume will be reviewed individually.Indexed articles:Hog-Angeloni, Cynthia; Metzler, Wolfgang, Geometric aspects of two-dimensional complexes, 1-50, 381-407 [Zbl 0811.57001]Sieradski, Allan J., Algebraic topology for two dimensional complexes, 51-96, 381-407 [Zbl 0811.57002]Latiolais, M. Paul, Homotopy and homology classification of 2-complexes, 97-124, 381-407 [Zbl 0811.57003]Dyer, Micheal N., Crossed modules and \(\Pi_ 2\) homotopy modules, 125-156, 381-407 [Zbl 0811.57004]Bogley, William A.; Pride, Steve J., Calculating generators of \(\pi_ 2\), 157-188, 381-407 [Zbl 0811.57005]Huck, Günther; Rosebrock, Stephan, Applications of diagrams to decision problems, 189-216, 381-407 [Zbl 0815.20024]Lustig, Martin, Fox ideals, \({\mathcal N}\)-torsion and applications to groups and \(3\)- manifolds, 219-249, 381-407 [Zbl 0815.20022]Hog-Angeloni, Cynthia; Sieradski, Allan J., (Singular) 3-manifolds, 251-280, 381-407 [Zbl 0811.57006]Hambleton, Ian; Kreck, Matthias, Cancellation results for 2-complexes and 4-manifolds and some applications, 281-308, 381-407 [Zbl 0811.57007]Bogley, William A., J. H. C. Whitehead’s asphericity question, 309-334, 381-407 [Zbl 0811.57008]Matveev, Sergei; Rolfsen, Dale, Zeeman’s collapsing conjecture, 335-364, 381-407 [Zbl 0811.57009]Hog-Angeloni, Cynthia; Metzler, Wolfgang, The Andrews-Curtis conjecture and its generalizations, 365-380, 381-407 [Zbl 0814.57002] Cited in 29 Documents MSC: 00B15 Collections of articles of miscellaneous specific interest 55-06 Proceedings, conferences, collections, etc. pertaining to algebraic topology Keywords:Two-dimensional homotopy; Combinatorial group theory PDFBibTeX XMLCite \textit{C. Hog-Angeloni} (ed.) et al., Two-dimensional homotopy and combinatorial group theory. Cambridge: Cambridge University Press (1993; Zbl 0788.00031)