Biannual Report - Fachbereich Mathematik - Technische Universität ...
Biannual Report - Fachbereich Mathematik - Technische Universität ...
Biannual Report - Fachbereich Mathematik - Technische Universität ...
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[77] T. Ehrhardt, S. Roch, and B. Silbermann. A strong Szegö-Widom limit theorem for<br />
operators with almost periodic diagonal. J. Fctl. Anal., 260:30–75, 2011.<br />
[78] D. Fang, M. Hieber, and T. Zhang. Density-dependent incompressible viscous fluid<br />
flow subject to linearly growing initial data. Appl. Anal., 91:1477–1493, 2012.<br />
[79] D. Fang, M. Hieber, and R. Zi. Global existence results for oldroyd-b fluids in exterior<br />
domains: the case of non-small coupling parameters. Math. Ann., to appear.<br />
[80] R. Farwig, G. P. Galdi, and M. Kyed. Asymptotic structure of a Leray solution to the<br />
Navier-Stokes flow around a rotating body. Pacific Math. J., 253:367–382, 2011.<br />
[81] R. Farwig, R. B. Guenther, S. Necasova, and E. A. Thomann. The fundamental<br />
solution of linearized nonstationary Navier-Stokes equations of motion around a<br />
rotating and translating body. Discrete Contin. Dyn. Systems A, 2012.<br />
[82] R. Farwig and T. Hishida. Asymptotic profile of steady Stokes flow around a rotating<br />
obstacle. manuscripta mathematica, 136:315–338, 2011.<br />
[83] R. Farwig and T. Hishida. Leading term at infinity of steady Navier-Stokes flow<br />
around a rotating obstacle. Math. Nachr., 284:2065–2077, 2011.<br />
[84] R. Farwig and C. Komo. Optimal initial value conditions for strong solutions of the<br />
Navier-Stokes equations in an exterior domain. Analysis (Munich), 2012.<br />
[85] R. Farwig, H. Kozono, and H. Sohr. Global weak solutions of the Navier-Stokes<br />
equations with nonhomogeneous boundary data and divergence. Rend. Sem. Mat.<br />
Univ. Padova, 125:51–70, 2011.<br />
[86] R. Farwig, H. Kozono, and T. Yanagisawa. Leray’s inequality in general multiconnected<br />
domains in R n . Math. Ann., 354:137–145, 2012.<br />
[87] R. Farwig and H. Morimoto. Leray’s inequality for fluid flow in symmetric multiconnected<br />
two-dimensional domains. Tokyo J. Math., 35:63–70, 2012.<br />
[88] R. Farwig, S. Necasova, and J. Neustupa. Spectral analysis of a Stokes-type operator<br />
arising from flow around a rotating body. J. Math. Soc. Japan, 63:163–194, 2011.<br />
[89] R. Farwig, H. Sohr, and W. Varnhorn. Necessary and sufficient conditions on local<br />
strong solvability of the Navier-Stokes system. Appl. Anal., 90:47–58, 2011.<br />
[90] R. Farwig, H. Sohr, and W. Varnhorn. Extension of Serrin’s uniqueness and regularity<br />
conditions for the Navier-Stokes equations. J. Math. Fluid Mech., 14:529–540, 2012.<br />
[91] R. Farwig and Y. Taniuchi. On the uniqueness of almost periodic-in-time solutions<br />
to the Navier-Stokes equations in unbounded domains. J. Evolution Equations,<br />
11:485–508, 2011.<br />
[92] M. Fedel, K. Keimel, F. Montagna, and W. Roth. Imprecise probabilities, bets, and<br />
functional analytic methods in Lukasiewicz logic. Forum Mathematicum, to appear,<br />
2012. DOI 10.1515/FORM.2011.123.<br />
[93] A. Fischer and J. Saal. On instability of the Ekman spiral. Discrete Contin. Dyn. Syst.<br />
- Series S. to appear.<br />
[94] C. Focke and D. Bothe. Computational analysis of binary collisions of shear-thinning<br />
droplets. Journal of Non-Newtonian Fluid Mechanics, 166(14-15):799–810, 2011.<br />
[95] C. Focke and D. Bothe. Direct numerical simulation of binary off-center collision of<br />
shear thinning droplets at high weber numbers. Phys. Fluids, 24, 2012.<br />
[96] M. Frank, J. Lang, and M. Schäfer. Adaptive finite element simulation of the timedependent<br />
simplified PN equations. Journal of Scientific Computing, 49(3):332–350,<br />
2011.<br />
3.3 Publications in Journals and Proceedings 113