G. A. Edgar Department of Mathematics The Ohio State University Columbus, OH 43210 U.S.A.edgar@math.ohio-state.edu
Fractional iteration of series and transseries Trans. Amer. Math. Soc. 365 (2013) 5805--5832
Transseries: ratios, grids, and witnesses
Transseries: composition, recursion, and convergence
Transseries for beginners Real Analysis Exchange 35 (2010) 253--310
Fractals and Universal Spaces in Dimension Theory by Stephen Leon Lipscomb (review) Bull. Amer. Math. Soc. 47 (2010) 163--170
Weak separation in self-similar fractals Topology Proceedings 34 (2009) 245-282 [with Manav Das]
Eigenvalues of a self-differential operator International Journal of Pure and Applied Mathematics 52 (2009) 87--115 [with Yuri Dimitrov]
Solutions of self-differential functional equations Real Analysis Exchange 32 (2007) 29-54 [with Yuri Dimitrov]
Centered densities and fractal measures New York Journal of Mathematics 13 (2007) 33-87
Separation Properties for Graph-Directed Self-Similar Fractals Topology and its Applications 152 (2005) 138-156 [with Manav Das]
Borel subrings of the reals Proc. Amer. Math. Soc. 131 (2003) 1121-1129 [with Chris Miller]
Hausdorff dimension, analytic sets and transcendence Real Analysis Exchange 27 (2002) 335-339 [with Chris Miller]
Packing measure in general metric space. Real Analysis Exchange 26 (2001) 831-852
The forest fractal puzzle. Computers & Graphics 24 (2000) 133-141
A fractal dimension estimate for a graph-directed IFS of non-similarities. [with J. Golds] Indiana Univ. Math. J. 48 (1999) 429-448 [ errata]
Fine variation and fractal measures. Real Analysis Exchange 20 (1995) 256-280 MR 96a:28012
Packing measure as a gauge variation. Proc. Amer. Math. Soc. 122 (1994) 167-174 MR 94k:28009 [ errata]
Multifractal decompositions of digraph recursive fractals. Proc. London Math. Soc. 65 (1992) 604--628. [with R. D. Mauldin] MR 93h:28010 [ errata]
Fractal dimension of self-affine sets: some examples. In: Measure Theory 1990, D. Kölzow (editor). Suppl. ai Rendiconti del Circolo Matematico di Palermo, Ser. II, no. 28, 1992. pp. 341--358. MR 94a:28019
Three IFS programs for Macintosh. Amygdala #24 (June 29, 1991) pp. 3--8. [ errata]
Complex martingale convergence In: Banach Spaces, N. Kalton and E. Saab (editors), Lecture Notes in Mathematics 1166, Springer-Verlag, 1985. pp. 38-59.
Realcompactness and measure-compactness of the unit ball in a Banach space In: Measure Theory, Oberwolfach 1983, D. Kölzow and D. Maharam-Stone (editors), Lecture Notes in Mathematics 1089, Springer-Verlag, 1984. pp. 232-240.
Two integral representations In: Measure Theory and Its Applications, J. Belley, J. Dubois, P. Morales (editors), Lecture Notes in Mathematics 1033, Springer-Verlag, 1983. pp. 193-198.
On pointwise-compact sets of measurable functions In: Measure Theory, Oberwolfach 1981, D. Kölzow and D. Maharam-Stone (editors), Lecture Notes in Mathematics 945, Springer-Verlag, 1982. pp. 24-28.
On compactness and optimality of stopping times In: Martingale Theory in Harmonic Analysis and Banach Spaces, J.-A. Chao and W. A. Woyczynski (editors), Lecture Notes in Mathematics 939, Springer-Verlag, 1982. pp. 36--61. [with A. Millet and L. Sucheston]
A long James space. In: Measure Theory, Oberwolfach 1979, D. Kölzow (editor), Lecture Notes in Mathematics 749, Springer-Verlag, 1980. pp. 31-37.
On the Radon-Nikodym property and martingale convergence In: Vector Space Measures and Applications II, R. M. Aron and S. Dineen (editors), Lecture Notes in Mathematics 645, Springer-Verlag, 1978. pp. 62-76.