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KAIST 수리과학과 세미나 



[해외석학 특별강연 시리즈] Finite time blowup constructions for supercritical equations 

Fusion Hall(1F), KI Bldg.(#E4) 
Many basic PDE of physical interest, such as the threedimensional NavierStokes equations, are "supercritical" in that the known conserved or bounded quantities for these equations allow the nonlinear components of the PDE to dominate the linear ones at fine scales. Because of this, almost none of the known methods for establishing global regularity for such equations can work, and global regularity for NavierStokes in particular is a notorious open problem. We present here some ways to show that if one allows some modifications to these supercritical PDE, one can in fact construct solutions that blow up in finite time (while still obeying conservation laws such as conservation of energy). This does not directly impact the global regularity question for the unmodified equations, but it does rule out some potential approaches to establish such regularity. 







