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Publications of Richard E. Hodel    :chronological  alphabetical  combined  bibtex listing:

Books

  1. with Donald W. Loveland, Richard E. Hodel, S.G. Sterrett, Three Views of Logic: Mathematics, Philosophy, Computer Science (2016)

Papers Published

  1. R.E. Hodel, Restricted versions of the Tukey-Teichmuller Theorem that are equivalent to the Boolean prime ideal theorem, Archive for Mathematical Logic 44, 459 - 472 (2005) [pdf]
  2. Hodel, RE, Book review: G. Tourlakis, Lectures in Logic and Set Theory (Volume 2), 592 pages., Review of Modern Logic, vol. 10 (2004), pp. 155-159
  3. Hodel, RE; Vaughan, JE, Reflection theorems for cardinal functions, Topology and its Applications, vol. 100 no. 1 (2000), pp. 47-66, ISSN 0166-8641 [Gateway.cgi], [doi]
  4. Hodel, R, Book review: The Mathematical Legacy of Edward Cech, edited by Katetov and Simon, 441 pages., Modern Logic, vol. 6 (1996), pp. 333-339
  5. R.E. Hodel and J. E. Vaughan, Reflection theorems for cardinal functions, Topology and Its Applications 100(2000), 47-66
  6. R. E. Hodel, Neighborhood systems and cardinal functions: a unified aproach to metrization a, Topology and Its Applications 90 (1998), 31-56
  7. Richard E Hodel, History of generalized metrizable spaces, Handbook of the History of General Topology (volume II), edited by C. Aull and R. Lowen, Kluwer Academic Publishers (1998), 541-576
  8. Richard E Hodel, Metrizability of spaces satisfying Nagata's condition, Mathematica Japonica 47 (1998), 287-293
  9. R.E. Hodel and J.E. Vaughan, In memory of John Henderson Roberts (1906-1997), Topology Proceedings 23 (1998), 201-219
  10. Richard E Hodel, An Introduction to Mathematical Logic, PWS Publishing Company, 1995
  11. Richard E Hodel, k-structures and topology, Annals of New York Academy of Sciences, 728 (1994), 50-63

Papers Submitted

  1. R.E. Hodel, Arhangel skii's Solution to Alexandroff's Problem: A Survey, Topology and Its Applications 153, 2199-2217 (2006) [pdf]

Preprints

  1. R.E. Hodel, Classical metrization theorems, in Encyclopedia of General Topology, edited by Hart, Nagata, Vaughan (2003), pp. 239-241, Elsevier
  2. R.E. Hodel, Modern metrization theorems, in Encyclopedia of General Topology, edited by Hart, Nagata, Vaughan (2003), pp. 242-246, Elsevier

 

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