Search results for: Rui Wang
IEEE Robotics and Automation Letters > 2018 > 3 > 2 > 627 - 634
IEEE/ACM Transactions on Audio, Speech, and Language Processing > 2018 > 26 > 2 > 266 - 280
IEEE Signal Processing Letters > 2018 > 25 > 2 > 243 - 247
IEEE Transactions on Geoscience and Remote Sensing > 2018 > 56 > 1 > 35 - 48
IEEE Transactions on Medical Imaging > 2018 > 37 > 1 > 1 - 11
IEEE Journal of Photovoltaics > 2018 > 8 > 1 > 162 - 170
IEEE Electron Device Letters > 2017 > 38 > 11 > 1619 - 1620
- <list-item><label>1)</label>References [26] (by T. Alfrey et al.) and [32] in our paper should be <xref ref-type="bibr" rid="ref2">[2]</xref> (by R. M. Fuoss et al.) and <xref ref-type="bibr" rid="ref3">[3]</xref> as listed in this reply, respectively.</list-item><list-item><label>2)</label>We would also like to recognize the work of Paolucci et al. (<xref ref-type="bibr" rid="ref4">[4]</xref> of this reply), in particular, their introduction of two transformation variables (Eq. (4)) to solve the nonlinear cylindrical 1-D Poisson’s Equation. We were not aware of their work at the time of our paper publication. Actually, the involved transformation variables/method were first reported by Fuoss et al. <xref ref-type="bibr" rid="ref2">[2]</xref>, hereinafter referred to as Fuoss’ transformation variables/method. On the other hand, it should be pointed out that before the paper by Paolucci et al. was submitted for consideration of publication, we had been aware of the work of Fuoss et al. The related early work of our corresponding author (Chen) dates back to 2001 (e.g., [37] in our paper). All the research reports of our students, including the cited thesis ([38] in our paper) of Jun Zhou (one of our authors), have been well documented in the database and library of our university. Jun Zhou’s first report on Fuoss’ transformation variables was submitted in November of 2014 (the evidence material has been submitted to the editor for a review). In his report, Jun Zhou used Fuoss’ transformation variables to prove that the cylindrical nonlinear Poisson’s equation can be transformed to the Cartesian form. His thesis proposal <xref ref-type="bibr" rid="ref5">[5]</xref> was submitted in November of 2015 for an approval from his advisor and the thesis committee. The thesis was completed and officially signed (and documented in our university library) in May of 2016.</list-item>
IEEE Transactions on Wireless Communications > 2017 > 16 > 11 > 7264 - 7275
IEEE Transactions on Geoscience and Remote Sensing > 2017 > 55 > 11 > 6150 - 6169
IEEE Transactions on Circuits and Systems I: Regular Papers > 2017 > 64 > 11 > 2835 - 2843