Adámek, Ji˘rí, Rosický, Ji˘rí, Vitale, Enrico Maria, What are sifted colimits? Theory Appl. Categ. 23 (2010), 251–260. (2)Google Scholar

Frank, J. Adams, On the cobar construction, Proc. Nat. Acad. Sci. U.S.A. 42 (1956), 409–412. 10.4.1Google Scholar

Frank Adams, J., Stable homotopy and generalised homology, Reprint of the 1974 original. Chicago Lectures in Mathematics. University of Chicago Press, Chicago, IL (1995), x+373 pp. 2.2Google Scholar

Frank Adams, J., Infinite loop spaces, Annals of Mathematics Studies, 90. Princeton University Press, Princeton, NJ (1978), x+214 pp. 13.1CrossRefGoogle Scholar

Aguiar, Marcelo, Mahajan, Swapneel, Monoidal functors, species and Hopf algebras, With forewords by Kenneth Brown and Stephen Chase and André Joyal. CRM Monograph Series, 29. American Mathematical Society, Providence, RI (2010), lii+784 pp. 9.7.1, 12.4.4CrossRefGoogle Scholar

Baas, Nils A., Ian Dundas, Bjørn, Rognes, John, Two-vector bundles and forms of elliptic cohomology, in: Topology, geometry and quantum field theory, London Mathematical Society Lecture Note Series, 308, Cambridge University Press, Cambridge (2004), 18–45. 9.1.2, 11.7Google Scholar

Balteanu, Cornel, Fiedorowicz, Roland Schwänzl, Zbigniew, Vogt, Rainer M., Iterated monoidal categories, Adv. Math. 176 (2003), no. 2, 277–349. 14.7, 14.7.2Google Scholar

Barr, Michael, Wells, Charles, Toposes, triples and theories, Corrected reprint of the 1985 original, Repr. Theory Appl. Categ. 12 (2005), x+288 pp. 6.2, 6.4, 6.6Google Scholar

Barratt, Michael G., Eccles, Peter J., ⁺-structures: I. A free group functor for stable homotopy theory, Topology 13 (1974), 25–45. 12.3.9, 14.5.3Google Scholar

Barratt, Michael, Priddy, Steward, On the homology of non-connected monoids and their associated groups, Comment. Math. Helv. 47 (1972), 1–14. 13.2.6Google Scholar

Basterra, Maria, Richter, Birgit, (Co-)homology theories for commutative (S-)algebras, in: Structured ring spectra, London Mathematical Society Lecture Note Series 315, Cambridge University Press (2004), 115–131. 15.5Google Scholar

Michael, A. Batanin, The Eckmann–Hilton argument and higher operads, Adv. Math. 217 (2008), no. 1, 334–385. 14.8, 14.8.11Google Scholar

Baues, Hans Joachim, Wirsching, Günther, Cohomology of small categories, J. Pure Appl. Algebra 38 (1985), no. 2–3, 187–211. 16.4Google Scholar

Beck, Jon, On H-spaces and infinite loop spaces, in: Category theory, homology theory and their applications, III (Battelle Institute Conference, Seattle, Washington, 1968, Vol. 3), Springer, Berlin (1969), 139–153. 10.4.1, 10.5.4Google Scholar

Bénabou, Jean, Introduction to bicategories, Reports of the Midwest Category Seminar, Springer, Berlin (1967), 1–77. 9.6, 9.6.1Google Scholar

Berest, Yuri, Ramadoss, Ajay C., Yeung, Wai-Kit, Representation homology of spaces and higher Hochschild homology, preprint arXiv:1703.03505. 14.1Google Scholar

Berger, Clemens, Combinatorial models for real configuration spaces and E_n-operads, Operads: Proceedings of Renaissance Conferences (Hartford, CT/Luminy, 1995), Contemporary Mathematics, 202. American Mathematical Society, Providence, RI (1997), 37–52. 12.3.9Google Scholar

Berger, Clemens, Double loop spaces, braided monoidal categories and algebraic 3-type of space, Higher homotopy structures in topology and mathematical physics (Poughkeepsie, NY, 1996). Contemporary Mathematics, 227, American Mathematical Society, Providence, RI (1999), 49–66. 14.6Google Scholar

Berger, Clemens, Iterated wreath product of the simplex category and iterated loop spaces, Adv. Math. 213 (2007), 230–270. 14.8, 14.8.1, 14.8.1, 14.8.2, 14.8.20Google Scholar

Bergner, Julia E., Simplicial monoids and Segal categories, Categories in algebra, geometry and mathematical physics, Contemporary Mathematics, 431. American Mathematical Society, Providence, RI (2007), 59–83. 10.14.4Google Scholar

Bergner, Julia E., The homotopy theory of (∞,1)-categories, London Mathematical Society Student Texts, 90. Cambridge University Press, Cambridge (2018), xiv+273 pp. (document), 14.8.3Google Scholar

Bergner, Julia E., A survey of models for (∞,n)-categories, in: Handbook of Homotopy Theory, edited by Haynes Miller, Chapman & Hall/CRC (2020), 263–295. 14.8.3Google Scholar

Bergner, Julia E., Rezk, Charles, Reedy categories and the construction, Math. Z. 274 (2013), no. 1–2, 499–514. 14.8Google Scholar

Bergner, Julia E., Rezk, Charles, Comparison of models for (∞,n)categories, I, Geom. Topol. 17 (2013), no. 4, 2163–2202. 14.8, 14.8.3Google Scholar

Bergner, Julia E., Rezk, Charles, Comparison of models for (∞,n)categories, II, preprint arXiv:1406.4182. 14.8, 14.8.3Google Scholar

Boardman, J. Michael, Vogt, Rainer M., Homotopy-everything H-spaces, Bull. Amer. Math. Soc. 74 (1968), 1117–1122. 12, 12.3.2Google Scholar

Boardman, J. Michael, Rainer M. Vogt, Homotopy invariant algebraic structures on topological spaces, Lecture Notes in Mathematics, Vol. 347, Springer-Verlag, Berlin and New York (1973), x+257 pp. 10.13, 12, 12.3.2Google Scholar

Bökstedt, Marcel, Topological Hochschild homology, preprint 1989. 9.7.1Google Scholar

Borceux, Francis, Handbook of Categorical Algebra 1, Basic Category Theory, Encyclopedia of Mathematics and Its Applications, Cambridge University Press (1994), xvi+345 pp. (document), 1.3, 4, 4.1Google Scholar

Borceux, Francis, Handbook of Categorical Algebra 2, Categories and Structures, Encyclopedia of Mathematics and Its Applications, Cambridge University Press (1994), xviii+443 pp. (document), 6.4, 6.6, 7.3, 9Google Scholar

Aldridge, K. Bousfield, On the homology spectral sequence of a cosimplicial space, Amer. J. Math. 109 (1987), no. 2, 361–394. 10.4.1Google Scholar

Bousfield, Aldridge K., Friedlander, Eric M., Homotopy theory of -spaces, spectra, and bisimplicial sets, Geometric applications of homotopy theory (Proc. Conf., Evanston, Ill., 1977), II, pp. 80–130, Lecture Notes in Mathematics, 658, Springer, Berlin (1978). 14.3CrossRefGoogle Scholar

Bousfield, Aldridge K., Kan, Daniel M., Homotopy limits, completions and localizations, Lecture Notes in Mathematics, Vol. 304, Springer-Verlag, Berlin and New York (1972), v+348 pp. 10.8.6, 10.10, 10.10.4, 11.4, 11.4, 11.4, 11.4.1Google Scholar

Browder, William, Homology operations and loop spaces, Illinois J. Math. 4 1960, 347–357. 12.3.3Google Scholar

Cartan, Henri, Eilenberg, Samuel, Homological algebra, With an appendix by David A. Buchsbaum. Reprint of the 1956 original. Princeton Landmarks in Mathematics. Princeton University Press, Princeton, NJ (1999), xvi+390 pp. 15.2.4Google Scholar

Church, Thomas, Ellenberg, Jordan S., Farb, Benson, FI-modules and stability for representations of symmetric groups, Duke Math. J. 164 (2015), no. 9, 1833–1910. 9.7.1Google Scholar

Peter, V. Z. Cobb, P_n-spaces and n-fold loop spaces, Bull. Amer. Math. Soc. 80 (1974), 910–914. 14.7, 14.8.2Google Scholar

Cohen, Frederick R., Lada, Thomas J., Peter May, J., The homology of iterated loop spaces, Lecture Notes in Mathematics, Vol. 533, Springer-Verlag, Berlin and New York (1976), vii+490 pp. 12.3.3, 12.3.3, 13.4.5Google Scholar

Davis, James F., Kirk, Paul, Lecture notes in algebraic topology, Graduate Studies in Mathematics, 35. American Mathematical Society, Providence, RI (2001), xvi+367 pp. 1.4.6, 13.4Google Scholar

Day, Brian, Construction of Biclosed Categories, PhD Thesis, University of New South Wales (1970), available at www.math.mq.edu.au/∼street/DayPhD.pdf. 9Google Scholar

Day, Brian, On closed categories of functors, 1970 Reports of the Midwest Category Seminar, IV pp. 1–38, Lecture Notes in Mathematics, Vol. 137, Springer, Berlin (1970). 9, 9.8Google Scholar

Djament, Aurélien, Décomposition de Hodge pour l’homologie stable des groupes d’automorphismes des groupes libres, preprint arXiv:1510.03546. 15.3Google Scholar

Dold, Albrecht, Homology of symmetric products and other functors of complexes, Ann. of Math. (2) 68 (1958), 54–80. 10.11, 10.11.2, 10.11Google Scholar

Eduardo, J. Dubuc, Kan extensions in enriched category theory, Lecture Notes in Mathematics, Vol. 145, Springer-Verlag, Berlin and New York (1970), xvi+173 pp. 4, 9Google Scholar

Dugger, Daniel, A primer on homotopy colimits, notes available at pages.uoregon.edu/ddugger 11.4, (4), 11.4.6Google Scholar

Dugger, Daniel, Shipley, Brooke, Topological equivalences for differential graded algebras, Adv. Math. 212 (2007), no. 1, 37–61. 8.1.15Google Scholar

Dundas, Bjørn Ian, Goodwillie, Thomas G., McCarthy, Randy, The local structure of algebraic K-theory, Algebra and Applications, 18. Springer-Verlag London, Ltd., London (2013), xvi+435 pp. (document), 14.3.15Google Scholar

William, G. Dwyer, Strong convergence of the Eilenberg–Moore spectral sequence, Topology 13 (1974), 255–265. 10.4.1Google Scholar

William, G. Dwyer, Hirschhorn, Philip S., Kan, Daniel M., Smith, Jeffrey H., Homotopy limit functors on model categories and homotopical categories, Mathematical Surveys and Monographs, 113. American Mathematical Society, Providence, RI (2004), viii+181 pp. 11.4.7Google Scholar

William, G. Dwyer, Spaliński,´, Jan Homotopy theories and model categories, Handbook of algebraic topology, North-Holland, Amsterdam (1995), 73–126. (document)Google Scholar

Dyer, Eldon, Lashof, Richard K., Homology of iterated loop spaces, Amer. J. Math. 84 (1962), 35–88. 12.3.3Google Scholar

Eckmann, Benno, Hilton, Peter J., Group-like structures in general categories: I. Multiplications and comultiplications, Math. Ann. 145 (1961/1962), 227–255. 8.1.3Google Scholar

Eilenberg, Samuel, Zilber, Joseph A., Semi-simplicial complexes and singular homology, Ann. of Math. (2) 51 (1950), 499–513. 10Google Scholar

Anthony, D. Elmendorf, Mandell, Michael A., Rings, modules, and algebras in infinite loop space theory, Adv. Math. 205 (2006), no. 1, 163–228. 14.4Google Scholar

Fiedorowicz, Zbigniew, The symmetric bar construction, preprint, available at https://people.math.osu.edu/fiedorowicz.1/14.6Google Scholar

Fiedorowicz, Zbigniew, Loday, Jean-Louis, Crossed simplicial groups and their associated homology, Trans. Amer. Math. Soc. 326 (1991), no. 1, 57–87. 14.6, 14.6.1, 15.4.3Google Scholar

Franjou, Vincent, Pirashvili, Teimuraz, On the Mac Lane cohomology for the ring of integers, Topology 37 (1998), no. 1, 109–114. 15.3Google Scholar

Franjou, Vincent, Friedlander, Eric M., Pirashvili, Teimuraz, Schwartz, Lionel, Rational representations, the Steenrod algebra and functor homology, Panoramas et Synthèses, 16. Société Mathématique de France, Paris (2003), xxii+132 pp. 15.2.4, 15.3, 15.6.2, 16.5Google Scholar

Fresse, Benoit, Modules over operads and functors, Lecture Notes in Mathematics, 1967, Springer-Verlag, Berlin (2009), x+308 pp. 12Google Scholar

Gabriel, Peter, Ulmer, Friedrich, Lokal Präsentierbare Kategorien, Lecture Notes in Mathematics, Vol. 221. Springer-Verlag, Berlin and New York (1971), v+200 pp. 5.3Google Scholar

Gabriel, Peter, Zisman, Michel, Calculus of fractions and homotopy theory, Ergebnisse der Mathematik und ihrer Grenzgebiete, Band 35, Springer-Verlag New York, Inc., New York (1967), x+168 pp. 10, 10.6.9, 11.5, 11.5, 11.5.4, 11.5, 16.5.8Google Scholar

Galvez-Carrillo, Imma, Neumann, Frank, Tonks, Andrew, Thomason cohomology of categories, J. Pure Appl. Algebra 217 (2013), no. 11, 2163–2179. 16.1, 16.4.2Google Scholar

Izrail, M. Gelfand, Kapranov, Mikhail M., Zelevinsky, Andrey V., Discriminants, resultants and multidimensional determinants, Reprint of the 1994 edition. Modern Birkhäuser Classics. Birkhäuser Boston, Inc., Boston, MA (2008), x+523 pp. 12.3.4Google Scholar

Paul, G. Goerss, Hopkins, Michael J., Moduli spaces of commutative ring spectra, Structured ring spectra, London Math. Soc. Lecture Note Ser., 315, Cambridge Univ. Press, Cambridge (2004), 151–200. 10.10.4, 15.5Google Scholar

Paul, G. Goerss, Jardine, John F., Simplicial homotopy theory, Reprint of the 1999 edition. Modern Birkhäuser Classics, Birkhäuser Verlag, Basel (2009), xvi+510 pp. 10, 10.4.1, 10.11, 10.12.12, 11.1, 11.7Google Scholar

Grayson, Daniel, Higher algebraic K-theory. II (after Daniel Quillen), Algebraic K-theory (Proc. Conf., Northwestern University, Evanston, Ill., 1976), Lecture Notes in Mathematics, Vol. 551, Springer, Berlin (1976), 217–240. (document), 13.3, 13.4.6Google Scholar

Groth, Moritz, A short course on ∞-categories, in: Handbook of Homotopy Theory, edited by Haynes Miller, Chapman & Hall/CRC (2020), 549–617. (document), 11.8.2, 11.8.3, 11.8.13, 11.8.3Google Scholar

Grothendieck, Alexander, Revêtements étales et groupe fondamental (SGA 1), Séminaire de géométrie algébrique du Bois Marie 1960–61. Directed by A. Grothendieck. With two papers by M. Raynaud, Updated and annotated reprint of the 1971 original (Lecture Notes in Mathematics, 224, Springer, Berlin. Documents Mathématiques (Paris), 3. Société Mathématique de France, Paris (2003), xviii+327 pp. 9.6.5, 11.6Google Scholar

Hatcher, Allen, Algebraic topology, Cambridge University Press, Cambridge (2002), xii+544 pp. 11.7, 13.1.2, 13.4Google Scholar

Hess, Kathryn, Tonks, Andrew, The loop group and the cobar construction, Proc. Amer. Math. Soc. 138 (2010), no. 5, 1861–1876. 10.4.1Google Scholar

Philip, S. Hirschhorn, Model categories and their localizations, Mathematical Surveys and Monographs, 99. American Mathematical Society, Providence, RI (2003), xvi+457. (document), 11.4.7, 11.4.1Google Scholar

Philip, S. Hirschhorn, Notes on homotopy colimits and homotopy limits, work in progress, available at www-math.mit.edu/∼psh/ notes/hocolim.pdf 11.4.10Google Scholar

Hoffbeck, Eric, Vespa, Christine, Leibniz homology of Lie algebras as functor homology, J. Pure Appl. Algebra 219 (2015), no. 9, 3721–3742. 15.3.3, 15.3.3Google Scholar

Karl, H. Hofmann, Morris, Sidney A., The structure of compact groups. A primer for the student – a handbook for the expert, Third edition, revised and augmented. De Gruyter Studies in Mathematics, 25. De Gruyter, Berlin (2013), xxii+924 pp.1.3Google Scholar

Hovey, Mark, Model categories, Mathematical Surveys and Monographs, 63. American Mathematical Society, Providence, RI (1999), xii+209 pp. (document)Google Scholar

Hovey, Mark, Spectra and symmetric spectra in general model categories, J. Pure Appl. Algebra 165 (2001), no. 1, 63–127. 10.15Google Scholar

Hovey, Mark, Palmieri, John H., Strickland, Neil P., Axiomatic stable homotopy theory, Mem. Amer. Math. Soc. 128 (1997), no. 610, x+114 pp. 8.4.7Google Scholar

Hovey, Mark, Shipley, Brooke, Smith, Jeffrey H., Symmetric spectra, J. Amer. Math. Soc. 13 (2000), no. 1, 149–208. 10.15, 10.15, 10.15Google Scholar

Jibladze, Mamuka, Pirashvili, Teimuraz, Cohomology of algebraic theories, J. Algebra 137 (1991), no. 2, 253–296. 16.5, 16.5.1, 16.5.2, 16.5.3, 16.5.4, 16.5.5Google Scholar

Joyal, André, Disks, duality and -categories, preprint, available on https://ncatlab.org/nlab/files/JoyalThetaCategories.pdf. 10.3, 10.3, 14.8, 14.8.1, 14.8.11, 14.8.1, 14.8.1Google Scholar

Joyal, André, Quasi-categories versus simplicial categories, preprint, available at www.math.uchicago.edu/∼may/IMA/Incoming/Joyal/QvsDJan9(2007).pdf 10.13Google Scholar

Joyal, André, The Theory of Quasi-categories and its Applications, book, available at www.mat.uab.cat/∼kock/crm/hocat/advanced-course/Quadern45-2.pdf. 5.1.2, 10.13, 11.1, 11.8.3, 11.8.11, 11.8.12, 11.8.3Google Scholar

Joyal, André, Quasi-categories and Kan complexes, Special volume celebrating the 70th birthday of Professor Max Kelly. J. Pure Appl. Algebra 175 (2002), no. 1-3, 207–222. 10.13Google Scholar

Joyal, André, Street, Ross, Braided tensor categories, Adv. Math. 102 (1993), no. 1, 20–78. 8.6Google Scholar

Daniel, M. Kan, On c. s. s. complexes, Amer. J. Math. 79 (1957), 449–476. 10Google Scholar

Daniel, M. Kan, Adjoint functors, Trans. Amer. Math. Soc. 87 (1958), 294–329. 2.4Google Scholar

Daniel, M. Kan, A combinatorial definition of homotopy groups, Ann. Math. 67 (1958), no. 2, 282–312. 10Google Scholar

Daniel, M. Kan, Thurston, William Paul, Every connected space has the homology of a K(π,1), Topology 15 (1976), no. 3, 253–258. 13.4.7Google Scholar

Mikhail, M. Kapranov, The permutoassociahedron, Mac Lane’s coherence theorem and asymptotic zones for the KZ equation, J. Pure Appl. Algebra 85 (1993), no. 2, 119–142. 12.3.4Google Scholar

Kashiwabara, Takuji, On the homotopy type of configuration complexes. Algebraic topology, (Oaxtepec, 1991), Contemp. Math., 146, Amer. Math. Soc., Providence, RI (1993), 159–170. 12.3.9Google Scholar

Kassel, Christian, Quantum groups, Graduate Texts in Mathematics, 155. Springer-Verlag, New York (1995), xii+531 pp. 8.6, 8.6.9CrossRefGoogle Scholar

Kelly, Gregory Maxwell, On MacLane’s conditions for coherence of natural associativities, commutativities, etc, J. Algebra 1 (1964), 397–402. 8.1Google Scholar

Kelly, Gregory Maxwell, Basic concepts of enriched category theory, London Mathematical Society Lecture Note Series, 64. Cambridge University Press, Cambridge-New York (1982), 245 pp. 8.1.13, 9Google Scholar

Kudo, Tatsuji; Araki, Shôrô, Topology of H_n-spaces and H-squaring operations, Mem. Fac. Sci. Kyūsyū Univ. Ser. A. 10 (1956), 85–120.¯ 12.3.3Google Scholar

Kudo, Tatsuji; Araki, Shôrô, On H, Proc. Japan Acad. 32 (1956), 333–335. 12.3.3Google Scholar

Latch, Dana May, Thomason, Robert W., Wilson, W. Stephen, Simplicial sets from categories, Math. Z. 164 (1979), no. 3, 195–214. 11.1.8Google Scholar

Lawson, Tyler, Commutative -rings do not model all commutative ring spectra, Homology, Homotopy Appl. 11 (2009), no. 2, 189–194. 14.3.15Google Scholar

Leinster, Tom, bicategories, Basic, notes available at the arxiv: math/9810017 9.6.5Google Scholar

Livernet, Muriel, Richter, Birgit, An interpretation of E_n-homology as functor homology, Math. Z. 269 (2011), no. 1-2, 193–219. 14.8.2, 15.3, 15.3.3, 15.3.3Google Scholar

Loday, Jean-Louis, La renaissance des opérades, Séminaire Bourbaki volume 1994/95, exposés 790–804, Astérisque no. 237 (1994–1995), Talk no. 792, p. 47–74. 12Google Scholar

Loday, Jean-Louis, Cyclic homology, Appendix E by María O. Ronco, Second edition. Chapter 13 by the author in collaboration with Teimuraz Pirashvili, Grundlehren der Mathematischen Wissenschaften 301, Springer-Verlag, Berlin (1998), xx+513 pp. 15, 15.3, 15.3, 15.3.10Google Scholar

Loday, Jean-Louis, Realization of the Stasheff polytope, Arch. Math. (Basel) 83 (2004), no. 3, 267–278. 12.3.4, 12.3.11, 12.3.4Google Scholar

Loday, Jean-Louis, Bruno Vallette, Algebraic operads, Grundlehren der Mathematischen Wissenschaften 346, Springer, Heidelberg (2012), xxiv+634 pp. 12Google Scholar

Lurie, Jacob, Higher topos theory, Annals of Mathematics Studies, 170. Princeton University Press, Princeton, NJ (2009), xviii+925 pp. (document), 4.6.2, 5.1.2, 9, 10.13, 10.13.5, 11.1.3, 11.8.3, 11.8.11, 11.8.3, 11.8.3, 14.8.3Google Scholar

Lurie, Jacob, Higher Algebra, book draft, available at www.math.harvard.edu/∼lurie/. (document), 5.1.2, 11.6, 11.8.2, 11.8.2, 11.8.3, 12.3.4 Google Scholar

Lydakis, Manos, Smash products and -spaces, Math. Proc. Cambridge Philos. Soc. 126 (1999), no. 2, 311–328. 14.3.15Google Scholar

MacDonald, John, Sobral, Manuela, Aspects of monads, in: Categorical foundations, Encyclopedia Math. Appl., 97, Cambridge Univ. Press, Cambridge (2004), 213–268.Google Scholar

Lane, Saunders Mac, Natural associativity and commutativity, Rice Univ. Studies 49 (1963), no. 4, 28–46. 8.1, 8.1.8Google Scholar

Lane, Saunders Mac, Categories for the working mathematician, Graduate Texts in Mathematics. 5, 2nd ed., Springer (1998), xii+314 pp. (document), 3.1, 4, 4.7, 6.6, 8.1.8, (1), 8.6, 8.6.7Google Scholar

Michael, A. Mandell, May, J. Peter, Schwede, Stefan, Shipley, Brooke, Model categories of diagram spectra. Proc. London Math. Soc. (3) 82 (2001), no. 2, 441–512. 9.8Google Scholar

Markl, Martin, Shnider, Steve, Stasheff, Jim, Operads in algebra, topology and physics, Mathematical Surveys and Monographs, 96, American Mathematical Society, Providence, RI (2002), x+349 pp. 12Google Scholar

Peter May, J., Simplicial objects in algebraic topology, Reprint of the 1967 original. Chicago Lectures in Mathematics, University of Chicago Press, Chicago, IL (1992), viii+161 pp. 10, 10.6.4, 10.12.12Google Scholar

Peter May, J., The geometry of iterated loop spaces, Lectures Notes in Mathematics, Vol. 271. Springer-Verlag, Berlin-New York (1972), viii+175 pp. 10.4.1, 10.4.1, 10.5.3, 10.5.4, 12, 12.3.2, 12.3.7Google Scholar

Peter May, J., E∞ spaces, group completions, and permutative categories, New developments in topology (Proc. Sympos. Algebraic Topology, Oxford, 1972), London Math. Soc. Lecture Note Ser., No. 11, Cambridge Univ. Press, London (1974), pp. 61–93. 8.3.6, 13.1.5, 13.1, 13.4.4, 13.4.5Google Scholar

Peter May, J., E∞ ring spaces and E∞ ring spectra, with contributions by Frank Quinn, Nigel Ray, and Jørgen Tornehave, Lecture Notes in Mathematics, Vol. 577. Springer-Verlag, Berlin-New York (1977), 268 pp. 14.4Google Scholar

Peter May, J., The spectra associated to permutative categories, Topology 17 (1978), no. 3, 225–228. 14.4Google Scholar

Peter May, J., A concise course in algebraic topology, Chicago Lectures in Mathematics. University of Chicago Press, Chicago, IL, (1999), x+243 pp. 8.5Google Scholar

Peter May, J., Thomason, Robert W., The uniqueness of infinite loop space machines, Topology 17 (1978), 205–224. 14.1, 14.1Google Scholar

McCleary, John, A user’s guide to spectral sequences, Second edition. Cambridge Studies in Advanced Mathematics, 58. Cambridge University Press, Cambridge (2001), xvi+561 pp. 10.4.1Google Scholar

Michael, C. McCord, Classifying spaces and infinite symmetric products, Trans. Amer. Math. Soc. 146 (1969), 273–298. 8.5Google Scholar

McDuff, Dusa, On the classifying spaces of discrete monoids, Topology 18 (1979), no. 4, 313–320. 13.4.7Google Scholar

James Milgram, R., Iterated loop spaces, Ann. of Math. (2) 84 (1966), 386–403. 12.3.3Google Scholar

Milnor, John, On the construction FK, notes from 1955, printed in J. Frank Adams, Algebraic Topology – A Student’s Guide, London Mathematical Society Lecture Note Series (4), Cambridge University Press (1972), 118–136. 12.3.9Google Scholar

Milnor, John, The geometric realization of a semi-simplicial complex, Ann. of Math. (2) 65 (1957), 357–362. 10.6, 10.6.4, 10.6Google Scholar

John, C. Moore, Homotopie des complexes monoïdaux, I. Séminaire Henri Cartan, 7 no. 2 (1954-1955), Exp. No. 18, 8 p. 10.11, 10.12.10Google Scholar

Nikolaus, Thomas, Sagave, Steffen, Presentably symmetric monoidal ∞-categories are represented by symmetric monoidal model categories, Algebr. Geom. Topol. 17 (2017), no. 5, 3189–3212. 11.8.3Google Scholar

Oury, David, On the duality between trees and disks, Theory Appl. Categ. 24 (2010), No. 16, 418–450. 10.3Google Scholar

Pedicchio, Maria Cristina, Solimini, Sergio, On a “good” dense class of topological spaces, J. Pure Appl. Algebra 42 (1986), no. 3, 287–295. 8.4.4Google Scholar

Pirashvili, Teimuraz, Hodge decomposition for higher order Hochschild homology, Ann. Sci. École Norm. Sup. (4) 33 (2000), 151–179. 15Google Scholar

Pirashvili, Teimuraz, Dold-Kan type theorem for -groups, Math. Ann. 318 (2000), no. 2, 277–298.Google Scholar

Pirashvili, Teimuraz, On the PROP corresponding to bialgebras, Cah. Topol. Géom. Différ. Catég. 43 (2002), no. 3, 221–239. 14.1.6Google Scholar

Pirashvili, Teimuraz, Richter, Birgit, Robinson-Whitehouse complex and stable homotopy, Topology 39 (2000), no. 3, 525–530. (4), 15, 15.3, 15.3.3, 15.5Google Scholar

Pirashvili, Teimuraz, Richter, Birgit, Hochschild and cyclic homology via functor homology, K-Theory 25 (2002), no. 1, 39–49. 15.3, 15.3.3, 15.3.9, 15.4.1, 15.4.3, 15.4Google Scholar

Daniel, G. Quillen, Homotopical algebra, Lecture Notes in Mathematics, No. 43 Springer-Verlag, Berlin-New York (1967), iv+156 pp. (document), 10Google Scholar

Daniel, G. Quillen, Rational homotopy theory, Ann. of Math. (2) 90 (1969), 205–295. 10.4.1Google Scholar

Daniel, G. Quillen, On the (co-)homology of commutative rings, Applications of Categorical Algebra (Proc. Sympos. Pure Math., Vol. XVII, New York, 1968), Amer. Math. Soc., Providence, R.I. (1970), pp. 65–87. 5.1Google Scholar

Daniel, G. Quillen, Higher algebraic K-theory: I, in: Algebraic Ktheory, I: Higher K-theories (Proc. Conf., Battelle Memorial Inst., Seattle, Wash., 1972), Lecture Notes in Math., Vol. 341, Springer, Berlin (1973), 85–147. (document), 10.8, 11.2, 11.5, 11.5, 11.5.6, 11.6, 11.7.2, 11.7, 11.7.7, 11.7.8, 16.2, 16.2.3Google Scholar

Daniel, G. Quillen, On the group completion of a simplicial monoid, Appendix Q in: Eric Friedlander, Barry Mazur, Filtrations on the homology of algebraic varieties, Mem. Amer. Math. Soc. 110 (1994), no. 529, x+110 pp. 13.4.2Google Scholar

Reedy, Christopher Leonard, Homotopy theory of model categories, unpublished preprint, available at www-math.mit.edu/~psh/ 10.8.6Google Scholar

Reutenauer, Christophe, Free Lie algebras, London Mathematical Society Monographs. New Series, 7. Oxford Science Publications. The Clarendon Press, Oxford University Press, New York (1993), xviii+269 pp. 2.4.2Google Scholar

Rezk, Charles, A Cartesian presentation of weak n-categories, Geom. Topol. 14 (2010), no. 1, 521–571. See also: Charles Rezk, Correction to ‘A Cartesian presentation of weak n-categories’, Geom. Topol. 14 (2010), no. 4, 2301–2304. 14.8, 14.8.3Google Scholar

Rezk, Charles, When are homotopy colimits compatible with homotopy pullbacks, note available at www.faculty.math.illinois.edu/∼rezk/i-hate-the-pi-star-kan-condition.pdf 11.4.10Google Scholar

Richter, Birgit, Symmetry properties of the Dold-Kan correspondence, Math. Proc. Cambridge Philos. Soc. 134 (2003), no. 1, 95–102. 9.3, 12.4, 12.4.2, 12.4.3, 12.4Google Scholar

Richter, Birgit, Robinson, Alan, Gamma homology of group algebras and of polynomial algebras, Homotopy theory: relations with algebraic geometry, group cohomology, and algebraic K-theory, Contemp. Math., 346, Amer. Math. Soc., Providence, RI (2004), 453–461. 15.5, 15.5.3Google Scholar

Richter, Birgit, Sagave, Steffen, A strictly commutative model for the cochain algebra of a space, preprint, arXiv:1801.01060. 11.4.7Google Scholar

Richter, Birgit, Shipley, Brooke, An algebraic model for commutative HZ-algebras, Algebraic and Geometric Topology 17 (2017), 2013–2038. 9.8.9, 10.15.3Google Scholar

Riehl, Emily, Categorical Homotopy Theory, New Mathematical Monographs, 24. Cambridge University Press, Cambridge (2014), xviii+352 pp. 4, 8.5, 9, 11.4.7Google Scholar

Riehl, Emily, Category theory in context, Aurora Dover Modern Math Originals, Mineola, NY: Dover Publications (2016), xvii, 234 p. (document), 6.3Google Scholar

Robinson, Alan, Gamma homology, Lie representations and E∞ multiplications, Invent. Math. 152 (2003), no. 2, 331–348. 15.5Google Scholar

Robinson, Alan, Whitehouse, Sarah, Operads and -homology of commutative rings, Math. Proc. Cambridge Philos. Soc. 132 (2002), 197–234. (4), 15.5Google Scholar

González, Beatriz Rodríguez, Simplicial descent categories, J. Pure Appl. Algebra 216 (2012), no. 4, 775–788. 11.4.7Google Scholar

González, Beatriz Rodríguez, Realizable homotopy colimits, Theory Appl. Categ. 29 (2014), No. 22, 609–634. 11.4.7Google Scholar

Rosický, Jiˇrí, On homotopy varieties, Adv. Math. 214 (2007), no. 2, 525–550. 11.4.1, 11.4.9Google Scholar

Sagave, Steffen, Schlichtkrull, Christian, Diagram spaces and symmetric spectra, Adv. Math. 231 (2012), no. 3-4, 2116–2193. 9.7.1, 9.8.9, 13.3.8, 14.5Google Scholar

Schlichtkrull, Christian, The homotopy infinite symmetric product represents stable homotopy, Algebr. Geom. Topol. 7 (2007), 1963–1977. 14.5.3Google Scholar

Schlichtkrull, Christian, Thom spectra that are symmetric spectra, Doc. Math. 14 (2009), 699–748. 14.5Google Scholar

Schlichtkrull, Christian, Solberg, Mirjam, Braided injections and double loop spaces, Trans. Amer. Math. Soc. 368 (2016), no. 10, 7305–7338. 8.6.8, 14.6, 14.6, 14.6.3, 14.6, 14.6.6Google Scholar

Schubert, Horst, Kategorien. I, II, Heidelberger Taschenbücher, Bände 65, 66, Springer (1970). (document), 1.4.5, 2.3.3Google Scholar

Schwede, Stefan, Stable homotopical algebra and -spaces, Math. Proc. Cambridge Philos. Soc. 126 (1999), no. 2, 329–356. 14.3.15Google Scholar

Schwede, Stefan, An untitled book project about symmtric spectra, file available at www.math.uni-bonn.de/people/schwede/SymSpec-v3.pdf 10.15Google Scholar

Segal, Graeme, Classifying spaces and spectral sequences, Inst. Hautes Études Sci. Publ. Math. No. 34 (1968), 105–112.Google Scholar

Segal, Graeme, Configuration-spaces and iterated loop-spaces, Invent. Math. 21 (1973), 213–221. 13.4.5Google Scholar

Segal, Graeme, Categories and cohomology theories, Topology 13 (1974), 293–312. 9.7.1, 10.6.10, 10.9.1, 10.9.2, 10.9.4, 10.9, 11.2, 14.2.3, 14.2, 14.3, (2), 14.3.13, 14.4Google Scholar

Brooke, E. Shipley, Convergence of the homology spectral sequence of a cosimplicial space, Amer. J. Math. 118 (1996), no. 1, 179–207. 10.4.1Google Scholar

Słominska, Jolanta,´ Decompositions of the category of noncommutative sets and Hochschild and cyclic homology, Cent. Eur. J. Math. 1 (2003), no. 3, 327–331. 15.3.10Google Scholar

Smith, Larry, Lectures on the Eilenberg-Moore spectral sequence, Lecture Notes in Mathematics, Vol. 134 Springer-Verlag, Berlin-New York (1970), vii+142 pp. 10.4.1Google Scholar

Smith, Jeffrey Henderson, Simplicial group models for ⁿSⁿ X, Israel J. Math. 66 (1989), no. 1-3, 330–350. 12.3.9Google Scholar

Srinivas, Vasudevan, Algebraic K-theory, Second edition. Progress in Mathematics, 90. Birkhäuser Boston, Inc., Boston, MA, 1996. xviii+341 pp. 11.7Google Scholar

Richard, P. Stanley, Enumerative combinatorics. Vol. 2, Cambridge Studies in Advanced Mathematics, 62. Cambridge University Press, Cambridge (1999), xii+581 pp. 12.3.4Google Scholar

James, D. Stasheff, Homotopy associativity of H-spaces. I, II, Trans. Amer. Math. Soc. 108 (1963), 275–292 and 293–312. 12.3.4, 12.3.4Google Scholar

James, D. Stasheff, Differential graded Lie algebras, quasi-Hopf algebras and higher homotopy algebras, Quantum groups (Leningrad, 1990), Lecture Notes in Math., 1510, Springer, Berlin (1992), 120–137. 14.6Google Scholar

Norman, E. Steenrod, Homology with local coefficients, Ann. of Math. (2) 44, (1943), 610–627. 1.4.6Google Scholar

Norman, E. Steenrod, A convenient category of topological spaces, Michigan Math. J. 14 (1967), 133–152. 8.5Google Scholar

Christopher, R. Stover, The equivalence of certain categories of twisted Lie and Hopf algebras over a commutative ring, J. Pure Appl. Algebra 86 (1993), no. 3, 289–326. 9.7.1Google Scholar

Sugawara, Masahiro, A condition that a space is group-like, Math. J. Okayama Univ. 7 (1957), 123–149. 12.3.4Google Scholar

Robert, M. Switzer, Algebraic topology – homotopy and homology, Reprint of the 1975 original; Classics in Mathematics. Springer-Verlag, Berlin (2002), xiv+526 pp. 2.2Google Scholar

Robert, W. Thomason, Homotopy colimits in CAT, with applications to algebraic K-theory and loop space theory, Thesis (Ph.D.) Princeton University. ProQuest LLC, Ann Arbor, MI (1977), 132 pp. 5.5.5Google Scholar

Robert, W. Thomason, Homotopy colimits in the category of small categories, Math. Proc. Cambridge Philos. Soc. 85 (1979), no. 1, 91–109. 5.5, 9.6.5Google Scholar

Robert, W. Thomason, First quadrant spectral sequences in algebraic K-theory via homotopy colimits, Comm. Algebra 10 (1982), no. 15, 1589–1668. 11.4Google Scholar

Dieck, Tammo tom, Algebraic topology, EMS Textbooks in Mathematics. European Mathematical Society (EMS), Zürich (2008), xii+567 pp. 8.5, 8.5, 8.5.8, 8.5.10, 8.5.17Google Scholar

Rainer, M. Vogt, Convenient categories of topological spaces for homotopy theory, Arch. Math. (Basel) 22 (1971), 545–555. 8.5Google Scholar

Rainer, M. Vogt, Commuting homotopy limits, Math. Z. 153 (1977), no. 1, 59–82. 11.4.10Google Scholar

Charles, A. Weibel, An introduction to homological algebra, Cambridge Studies in Advanced Mathematics, 38. Cambridge University Press, Cambridge (1994), xiv+450 pp. (document), 10.4.1, 10.11, 16.3, 16.5, 16.5Google Scholar

Charles, A. Weibel, The K-book. An introduction to algebraic K-theory, Graduate Studies in Mathematics, 145. American Mathematical Society, Providence, RI (2013), xii+618 pp. (document), 11.3.4Google Scholar

Weiss, Michael, What does the classifying space of a category classify?, Homology Homotopy Appl. 7 (2005), no. 1, 185–195. 10.9.2Google Scholar

George, W. Whitehead, Elements of homotopy theory, Graduate Texts in Mathematics, 61. Springer-Verlag, New York-Berlin (1978), xxi+744 pp. 1.4.6, 16.2Google Scholar

Ziegenhagen, Stephanie, E_n-cohomology with coefficients as functor cohomology, Algebr. Geom. Topol. 16 (2016), no. 5, 2981–3004. 15.3Google Scholar