ÿþ<!DOCTYPE HTML PUBLIC "-//W3C//DTD HTML 4.01 Transitional//EN"> <html> <head> <title> Radu Pantilie's Home Page </title> <style type="text/css"> h2 { margin-top: 2em; margin-bottom: 0em; } h3 { margin-top: 1em; margin-bottom:-0.5em } body { margin-left: 5%; margin-right: 10%; background: #C0C0C0; } :link { color: rgb(0, 0, 253); } :visited { color: rgb(150, 0, 33); } a.plain { text-decoration: none; } </style> </head> <body> <h2>Radu Pantilie<img src="02-11-2008.jpg" width="192" height="232" align="right" alt="me on 02.11.2008"></h2> <h3>Position</h3> <p>Senior Researcher II at the INSTITUTE OF MATHEMATICS "SIMION STOILOW"<br> OF THE ROMANIAN ACADEMY (I.M.A.R.)</p> <h3>Research Interests</h3> <p>Harmonic maps and morphisms, Twistor Theory, Einstein and self-dual manifolds, Weyl spaces, <br> Quaternionic Geometry, Generalized Complex Geometry</p> <h3>Education</h3> <p>1983 - 1988 Faculty of Mathematics, University of Bucharest, Diploma in Mathematics<br> 1997 - 2000 Department of Pure Mathematics, University of Leeds, PhD</p> <h3>Papers and Preprints</h3> <p> <ul> <li> A simple proof of the de Rham decomposition theorem, <br> <em>Bull. Math. Soc. Sci. Math. Roumanie (N.S.)</em>, <strong>36(84)</strong> (1992), no. 3, 341-343.</li> <li> On Yang-Mills connections and Riemannian submersions, <br> <em>Stud. Cerc. Mat.</em>, <strong>47</strong> (1995), no. 3-4, 333-335.</li> <li> Some remarks on harmonic Riemannian submersions, <br> <em>Bull. Math. Soc. Sci. Math. Roumanie (N.S.)</em>, <strong>40(88)</strong> (1997), no. 1, 21-25.</li> <li> On the fundamental equations of a Riemannian submersion, <br> <em>Rev. Roumaine Math. Pures Appl.</em>, <strong>43</strong> (1998), no. 7-8, 779-783.</li> <li> Harmonic morphisms with one-dimensional fibres, <br> <em>Internat. J. Math.</em>, <strong>10</strong> (1999), no. 4, 457-501.</li> <li>On submersive harmonic morphisms, <br> <em>Harmonic morphisms, harmonic maps, and related topics</em>, 23-29, <br> Chapman & Hall/CRC Research Notes in Mathematics, 413, CRC Press U.K., 2000.</li> <li>Isometric actions and harmonic morphisms, <br> <em>Michigan Math. J.</em>, <strong>47</strong> (2000), no. 3, 453-467.</li> <li>Conformal actions and harmonic morphisms, <br> <em>Math. Proc. Cambridge Philos. Soc.</em>, <strong>129</strong> (2000), no. 3, 527-547.</li> <li>New results on harmonic morphisms with one-dimensional fibres, (with J. C. Wood), <br> <em>Bull. Math. Soc. Sci. Math. Roumanie (N.S.), volume in the memory of G. Vranceanu</em>, <strong>43(93)</strong> (2000), no. 3-4, 355-365.</li> <li><em>Submersive harmonic maps and morphisms</em></a>, (under the supervision of J. C. Wood), <br> Ph.D. Thesis, University of Leeds, England, 2000.</li> <li>Harmonic morphisms with 1-dimensional fibres on 4-dimensional Einstein manifolds, <br> <em>Comm. Anal. Geom.</em>, <strong>10</strong> (2002), no. 4, 779-814.</li> <li>Harmonic morphisms with one-dimensional fibres on Einstein manifolds, (with J. C. Wood), <br> <em>Trans. Amer. Math. Soc.</em>, <strong>354</strong> (2002), no. 10, 4229-4243.</li> <li>A new construction of Einstein self-dual metrics, (with J. C. Wood), <br> <em>Asian. J. Math.</em>, <strong>6</strong> (2002), no. 2, 337-348.</li> <li>Topological restrictions for circle actions and harmonic morphisms, (with J. C. Wood), <br> <em>Manuscripta Math</em>, <strong>110</strong> (2003), no. 3, 351-364.</li> <li>Twistorial harmonic morphisms with one-dimensional fibres on self-dual four-manifolds, (with J. C. Wood), <br> <em>Q. J. Math.</em>, <strong>57</strong> (2006), no. 1, 105-132.</li> <li>Harmonic morphisms between Weyl spaces and twistorial maps, (with E. Loubeau), <br> <em>Comm. Anal. Geom.</em>, <strong>14</strong> (2006), no. 5, 847-881.</li> <li>Harmonic morphisms between Weyl spaces, <br> <em>Modern trends in geometry and topology</em>, 321-332, Cluj Univ. Press, 2006.</li> <li>On a class of twistorial maps, <br> <em>Differential Geom. Appl.</em>, <strong>26</strong> (2008), no. 4, 366-376.</li> <li>Harmonic morphisms with one-dimensional fibres on conformally-flat Riemannian manifolds, <br> <em>Math. Proc. Cambridge Philos. Soc.</em>, <strong>145</strong> (2008), no. 1, 141-151.</li> <li>Harmonic morphisms on heaven spaces</a>, (with P. Baird), <br> <em>Bull. London Math. Soc.</em>, <strong>41</strong> (2009), no. 2, 198-204. </li> <li>On the local structure of generalized Kaehler manifolds, (with L. Ornea), <br> <em>Bull. Math. Soc. Sci. Math. Roumanie</em>, <strong>52(100)</strong> (2009), no. 3, 347-353. </li> <li>Harmonic morphisms between Weyl spaces and twistorial maps II, (with E. Loubeau), <br> <em>Ann. Inst. Fourier (Grenoble)</em>, (to appear). </li> <li>Twistorial maps between quaternionic manifolds, (with S. Ianus, S. Marchiafava, and L. Ornea), <br> <em>Ann. Sc. Norm. Super. Pisa Cl. Sci. (5)</em>, (to appear). </li> <li><a class="plain" href="http://arxiv.org/abs/0810.1865">Holomorphic maps between generalized complex manifolds</a>, (with L. Ornea), <br> Preprint, IMAR, Bucharest, 2008 (arXiv:0810.1865). </li> <li><a class="plain" href="http://arxiv.org/abs/0905.1455">Twistor Theory for CR quaternionic manifolds and related structures</a>, (with S. Marchiafava, and L. Ornea), <br> Preprint, IMAR, Bucharest, 2009 (arXiv:0905.1455). </li> </ul> </p> <h3>Books</h3> <p> <ul> <li><em>Submersive harmonic maps and morphisms</em></a>, <br> Editura Academiei Române, Bucureti, 2009. </li> <li><em>Introduction to harmonic morphisms between Weyl spaces and twistorial maps</em></a>, (with S. Marchiafava), <br> (in preparation). </li> </ul> </p> <h3>Current Research Project</h3> <p><a class="plain" href="http://www.imar.ro/~pantilie/pn2.html">Twistor Theory for harmonic maps and morphisms between Riemannian symmetric spaces</a></p> <h3>Contact</h3> <p>Postal Address: I.M.A.R., Bucharest, P.O. Box 1-764, RO-014700, ROMANIA<br> E-Mail: Radu <em>dot</em> Pantilie <em>at</em> imar <em>dot</em> ro </p> </body> </html>