@inproceedings{rajala_bottomley_parry_cohen_grant_thomas_doxey_perez_collins_spurlin_2004, title={The North Carolina State University women in science and engineering program: a community for living and learning}, booktitle={American Society for Engineering Education}, author={Rajala, S. A. and Bottomley, L.J. and Parry, E. A. and Cohen, J. D. and Grant, S. C. and Thomas, C. J. and Doxey, T. M. and Perez, G. and Collins, R. E. and Spurlin, J. E.}, year={2004} }
@article{cohen_berry_2000, title={Linearly compact rings having a simple group of units}, volume={28}, ISSN={["0092-7872"]}, DOI={10.1080/00927870008826826}, abstractNote={Those linearly compact rings with identity having a simple group of units and a transfinitely nilpotent Jacobson radical are identified. A consequence of this characterization is Cohen and Koh's classification theorem for compact rings with identity having a simple group of units.}, number={1}, journal={COMMUNICATIONS IN ALGEBRA}, author={Cohen, JA and Berry, E}, year={2000}, pages={33ā49} }
@article{cohen_koh_1997, title={Compact rings having a finite simple group of units}, volume={119}, ISSN={["0022-4049"]}, DOI={10.1016/S0022-4049(96)00128-4}, abstractNote={For a compact Hausdorff ring, one observes that the group of units is a totally disconnected compact topological group and is a finite simple group if and only if it possesses no nontrivial closed normal subgroups. Three classification theorems for compact rings are now given. First, those compact rings with identity having a finite simple group of units are identified. Second, a classification of all compact rings A with identity for which 2 is a unit in A, G modulo the center of G is a finite simple group and the length of W is less than or equal to 4 (or equivalently, W is a torsion group) is given where G is the group of units in A and W is the subgroup of G generated by {gā G: g2 = 1}. Finally, those compact rings with identity having 2 as a unit and for which W is a nilpotent group are identified.}, number={1}, journal={JOURNAL OF PURE AND APPLIED ALGEBRA}, author={Cohen, JA and Koh, K}, year={1997}, month={Jun}, pages={13ā26} }