½²×ùÎÊÌâ
Fractal geometry of the Markov and Lagrange spectra and their set difference
½²×ùʱ¼ä
6ÔÂ16ÈÕ 16£º00
½²×ùËùÔÚ
ѧԺ·УÇø 2ºÅÂ¥309
Ö÷½²ÈË
Carlos Gustavo Moreira
Ö÷Àíµ¥Î»
Êýѧ¿ÆѧѧԺ
¼ÓÈë·½·¨
±¾´ÎԺʿ´ó¿ÎÌýӴýÐֵܸßУ¼°È«Ð£Ê¦ÉúУÓѼÓÈë¼ÓÈë��£¬ÌîдÈçÏÂÎÊ¾í¼´¿É±¨Ãû¼ÓÈë
½²×ùÌáÒª
We will discuss some recent results on the fractal geometry of the Markov and Lagrange spectra, M and L which are classical objects from the theory of Diophantine approximations, and their set difference. In particular, we discuss recent results in collaboration with Erazo, Guti¨¦rrez-Romo and Roma?a, which give precise asymptotic estimates for the fractal dimensions of the Markov and Lagrange spectra near 3 (their smaller accumulation point) and other recent collaborations with Jeffreys, Matheus, Pollicott and Vytnova, in which we prove that the Hausdorff dimension of the complement of the Lagrange spectrum in the Markov spectrum has Hausdorff dimension between 0.594561 and 0.796445. Finally we will discuss a recent work in collaboration with H. Erazo, D. Lima, C. Matheus and S. Vieira in which we prove that inf(M\L)=3.
We will relate these results to symbolic dynamics, continued fractions and to the study of the fractal geometry of arithmetic sums of regular Cantor sets, a subject also important for the study of homoclinic bifurcations in Dynamical Systems.
Ö÷½²È˼ò½é
Carlos Gustavo Moreira��£¬ÏÖÈΰÍÎ÷´¿´âÓëÓ¦ÓÃÊýѧÑо¿Ëù£¨IMPA£©½ÌÊÚ�¡£Moreira½ÌÊÚÊÇ°ÍÎ÷¿ÆѧԺ£¨BAC£©ÔºÊ¿��£¬µÚÈýÌìÏ¿ÆѧԺ£¨TWAS£©ÔºÊ¿��£¬°ÍÎ÷Êýѧ°ÂÁÖÆ¥¿ËίԱ»á£¨BMOC£©³ÉÔ±�¡£Moreira ½ÌÊÚÖ÷ÒªÑо¿¶¯Á¦ÏµÍ³��£¬ÔÚ¶ª·¬Í¼ÆȽü��£¬·ÖÐμ¸ºÎѧµÈÏêϸÑо¿ÁìÓò×ö³öÁËÖ÷ҪТ˳�¡£ËûÔøÓÚ1989Äê»ñµÃ¹ú¼ÊÊýѧ°ÂÁÖÆ¥¿Ë£¨IMO)ÍÅÆ��£¬1990Äê»ñµÃÁ˹ú¼ÊÊýѧ°ÂÁÖÆ¥¿Ë£¨IMO£©½ðÅÆ��£¬2009Äê»ñµÃÁËUMALCA½±��£¬2010Äê»ñµÃÁËTWAS½±��£¬2018Äê»ñµÃ¹ú¼ÒÊýѧ¾ºÈüÌìÏÂͬÃË(WFNMC)½ÒÏþµÄ±£ÂÞ.¶ò¶à˹½±£¨Paul Erd?s Award£©�¡£ËûÊÇ2014ÄêÌìÏÂÊýѧ¼Ò´ó»á£¨ICM£©µÄ45·ÖÖÓ±¨¸æÈËÒÔ¼°2018ÄêÌìÏÂÊýѧ¼Ò´ó»á£¨ICM£©60·ÖÖÓ±¨¸æÈË�¡£
