Rodriguez-Carrington, E. Lie groups associated to Kac--Moody Lie algebras, in "Infinite Dimensional Lie Algebras and Groups," Advanced Series in Mathematical Physics, vol. 7, World Scientific, 1989, pp. 57-70.

Natarajan, L., Rodriguez-Carrington, E. and Wolf, J. A., Differentiable structure for direct limit groups, Letters in Mathematical Physics, 23 (1991), pp. 99-110.

Natarajan, L., Rodriguez-Carrington, E. and Wolf, J. A., Locally convex Lie groups, in Nova Journal of Algebra and Geometry, vol. 2, no. 1 (1993), pp. 59--87.

Natarajan, L., Rodriguez-Carrington, E. and Wolf, J. A. New Classes of Infinite Dimensional Groups in ``Algebraic Groups and their Generalizations;'' Proceedings of Symposia in Pure Mathematics, vol.56, Part II, W. J. Haboush and B. J. Parshall, editors, (1994) pp. 377--392.

Natarajan, L., Rodriguez-Carrington, E. and Wolf, J. A., The Bott-Borel-Weil Theorem for direct limit groups, Transactions of the American Mathematical Society, vol. 353, Number 11, (2001) pp. 4583--4622.

Derderian, J.-C. and Rodriguez-Carrington, E., Undersampled sine waves; The College Mathematics Journal, MAA, vol. 29, no. 3, May 1998, pp. 2113--218.

Upon the zeroth day,
(so the sagest of the sages say)
God created mathematics.

He could proceed to that Universe
so long spelled out in chapter and verse
once the basic task was done.

But perhaps on day minus one,
wallowing in warm primeval soup,
He vaguely envisioned the first Lie group.

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