@inproceedings{31370, author = {{Hoffmann, Max and Biehler, Rolf}}, booktitle = {{Beiträge zum Mathematikunterricht 2017}}, editor = {{Kortenkamp, Ulrich and Kuzle, Ana}}, pages = {{441--444}}, publisher = {{WTM-Verlag}}, title = {{{Schnittstellenaufgaben für die Analysis I – Konzept, Beispiele und Evaluationsergebnisse}}}, doi = {{10.17877/DE290R-18534}}, year = {{2017}}, } @inbook{31857, author = {{Häsel-Weide, Uta and Nührenbörger, M.}}, booktitle = {{Gemeinsam Mathematik lernen - mit allen Kindern rechnen.}}, editor = {{Häsel-Weide, Uta and Nührenbörger, M.}}, pages = {{8--21}}, publisher = {{Grundschulverband e. V.}}, title = {{{Grundzüge des inklusiven Mathematikunterrichts. Mit allen Kindern rechnen.}}}, year = {{2017}}, } @article{33336, abstract = {{The dipole approximation is employed to describe interactions between atoms and radiation. It essentially consists of neglecting the spatial variation of the external field over the atom. Heuristically, this is justified by arguing that the wavelength is considerably larger than the atomic length scale, which holds under usual experimental conditions. We prove the dipole approximation in the limit of infinite wavelengths compared to the atomic length scale and estimate the rate of convergence. Our results include N-body Coulomb potentials and experimentally relevant electromagnetic fields such as plane waves and laser pulses.}}, author = {{Boßmann, Lea and Grummt, Robert and Kolb, Martin}}, journal = {{Letters in Mathematical Physics}}, pages = {{185–193}}, title = {{{On the dipole approximation with error estimates}}}, doi = {{https://link.springer.com/article/10.1007/s11005-017-0999-y}}, volume = {{108}}, year = {{2017}}, } @article{33342, abstract = {{In this work we consider a one-dimensional Brownian motion with constant drift moving among a Poissonian cloud of obstacles. Our main result proves convergence of the law of processes conditional on survival up to time t as t converges to infinity in the critical case where the drift coincides with the intensity of the Poisson process. This complements a previous result of T. Povel, who considered the same question in the case where the drift is strictly smaller than the intensity. We also show that the end point of the process conditioned on survival up to time t rescaled by √t converges in distribution to a non-trivial random variable, as t tends to infinity, which is in fact invariant with respect to the drift h>0. We thus prove that it is sub-ballistic and estimate the speed of escape. The latter is in a sharp contrast with discrete models of dimension larger or equal to 2 when the behaviour at criticality is ballistic, see [7], and even to many one dimensional models which exhibit ballistic behaviour at criticality, see [8].}}, author = {{Savov, Mladen and Kolb, Martin}}, journal = {{Electronic Journal of Probability}}, publisher = {{ Institute of Mathematical Statistics & Bernoulli Society}}, title = {{{Conditional survival distributions of Brownian trajectories in a one dimensional Poissonian environment in the critical case}}}, doi = {{https://doi.org/10.1214/17-EJP4468}}, volume = {{22}}, year = {{2017}}, } @article{34631, author = {{Hesse, Kerstin and Sloan, Ian H. and Womersley, Robert S.}}, issn = {{0029-599X}}, journal = {{Numerische Mathematik}}, keywords = {{Applied Mathematics, Computational Mathematics}}, number = {{3}}, pages = {{579--605}}, publisher = {{Springer Science and Business Media LLC}}, title = {{{Radial basis function approximation of noisy scattered data on the sphere}}}, doi = {{10.1007/s00211-017-0886-6}}, volume = {{137}}, year = {{2017}}, } @inproceedings{45396, author = {{Dröse, Jennifer and Prediger, Susanne}}, booktitle = {{Beiträge zum Mathematikunterricht 2017 }}, editor = {{Kortenkamp, U. and Kuzle, A.}}, pages = {{183--186}}, publisher = {{WTM}}, title = {{{Strategieentwicklung für die Bearbeitung von Textaufgaben}}}, year = {{2017}}, } @article{31267, author = {{Guillarmou, Colin and Hilgert, Joachim and Weich, Tobias}}, issn = {{0025-5831}}, journal = {{Mathematische Annalen}}, keywords = {{General Mathematics}}, number = {{3-4}}, pages = {{1231--1275}}, publisher = {{Springer Science and Business Media LLC}}, title = {{{Classical and quantum resonances for hyperbolic surfaces}}}, doi = {{10.1007/s00208-017-1576-5}}, volume = {{370}}, year = {{2017}}, } @article{51390, author = {{Hilgert, Joachim and Przebinda, T. and Pasquale, A.}}, journal = {{Representation Theory}}, pages = {{416–457}}, title = {{{Resonances for the Laplacian on Riemannian symmetric spaces: the case of SL(3,R)/SO(3)}}}, doi = {{10.1090/ert/506}}, volume = {{21}}, year = {{2017}}, } @article{51392, author = {{Hilgert, Joachim and Martens, J. and Manon, Ch.}}, journal = {{Inter. Math. Research Notices}}, pages = {{6255–6309}}, title = {{{Contraction of Hamiltonian K-spaces}}}, doi = {{10.1093/imrn/rnw191}}, volume = {{20}}, year = {{2017}}, } @article{51391, author = {{Hilgert, Joachim and Przebinda, T. and Pasquale, A.}}, journal = {{J. Funct. Anal.}}, pages = {{1477--1523}}, title = {{{Resonances for the Laplacian of products of two rank one Riemannian symmetric spaces}}}, volume = {{272}}, year = {{2017}}, } @misc{51576, author = {{Hilgert, Joachim}}, booktitle = {{Mathematische Semesterberichte}}, pages = {{253--254}}, title = {{{Pitici, M. (Ed). The Best Writing on Mathematics 2016 (Princeton University Press, 2017)}}}, volume = {{64}}, year = {{2017}}, } @misc{51575, author = {{Hilgert, Joachim}}, booktitle = {{Mathematische Semesterberichte}}, pages = {{245--247}}, title = {{{Devlin, K. Finding Fibonacci. The Quest to Rediscover the Forgotten Mathematical Genius Who Changed the World (Princeton University Press, 2017)}}}, volume = {{64}}, year = {{2017}}, } @article{45941, author = {{Kovács, Balázs and Li, Buyang and Lubich, Christian and Power Guerra, Christian A.}}, issn = {{0029-599X}}, journal = {{Numerische Mathematik}}, keywords = {{Applied Mathematics, Computational Mathematics}}, number = {{3}}, pages = {{643--689}}, publisher = {{Springer Science and Business Media LLC}}, title = {{{Convergence of finite elements on an evolving surface driven by diffusion on the surface}}}, doi = {{10.1007/s00211-017-0888-4}}, volume = {{137}}, year = {{2017}}, } @article{45942, author = {{Kovács, Balázs and Lubich, Christian}}, issn = {{0029-599X}}, journal = {{Numerische Mathematik}}, keywords = {{Applied Mathematics, Computational Mathematics}}, number = {{2}}, pages = {{365--388}}, publisher = {{Springer Science and Business Media LLC}}, title = {{{Stability and convergence of time discretizations of quasi-linear evolution equations of Kato type}}}, doi = {{10.1007/s00211-017-0909-3}}, volume = {{138}}, year = {{2017}}, } @article{45940, author = {{Kovács, Balázs and Lubich, Christian}}, issn = {{0029-599X}}, journal = {{Numerische Mathematik}}, keywords = {{Applied Mathematics, Computational Mathematics}}, number = {{1}}, pages = {{91--117}}, publisher = {{Springer Science and Business Media LLC}}, title = {{{Stable and convergent fully discrete interior–exterior coupling of Maxwell’s equations}}}, doi = {{10.1007/s00211-017-0868-8}}, volume = {{137}}, year = {{2017}}, } @article{45946, author = {{Kovács, Balázs and Power Guerra, Christian Andreas}}, issn = {{0749-159X}}, journal = {{Numerical Methods for Partial Differential Equations}}, keywords = {{Applied Mathematics, Computational Mathematics, Numerical Analysis, Analysis}}, number = {{2}}, pages = {{518--554}}, publisher = {{Wiley}}, title = {{{Maximum norm stability and error estimates for the evolving surface finite element method}}}, doi = {{10.1002/num.22212}}, volume = {{34}}, year = {{2017}}, } @article{45943, author = {{Kovács, Balázs}}, issn = {{0272-4979}}, journal = {{IMA Journal of Numerical Analysis}}, keywords = {{Applied Mathematics, Computational Mathematics, General Mathematics}}, number = {{1}}, pages = {{430--459}}, publisher = {{Oxford University Press (OUP)}}, title = {{{High-order evolving surface finite element method for parabolic problems on evolving surfaces}}}, doi = {{10.1093/imanum/drx013}}, volume = {{38}}, year = {{2017}}, } @article{45945, author = {{Kovács, Balázs and Power Guerra, Christian Andreas}}, issn = {{0749-159X}}, journal = {{Numerical Methods for Partial Differential Equations}}, keywords = {{Applied Mathematics, Computational Mathematics, Numerical Analysis, Analysis}}, number = {{2}}, pages = {{518--554}}, publisher = {{Wiley}}, title = {{{Maximum norm stability and error estimates for the evolving surface finite element method}}}, doi = {{10.1002/num.22212}}, volume = {{34}}, year = {{2017}}, } @article{32020, author = {{Küster, Benjamin}}, issn = {{0232-704X}}, journal = {{Annals of Global Analysis and Geometry}}, keywords = {{Geometry and Topology, Analysis}}, number = {{1}}, pages = {{57--97}}, publisher = {{Springer Science and Business Media LLC}}, title = {{{On the semiclassical functional calculus for h-dependent functions}}}, doi = {{10.1007/s10455-017-9549-1}}, volume = {{52}}, year = {{2017}}, } @article{32022, author = {{Küster, Benjamin and Ramacher, Pablo}}, issn = {{0022-1236}}, journal = {{Journal of Functional Analysis}}, keywords = {{Analysis}}, number = {{1}}, pages = {{41--124}}, publisher = {{Elsevier BV}}, title = {{{Quantum ergodicity and symmetry reduction}}}, doi = {{10.1016/j.jfa.2017.02.013}}, volume = {{273}}, year = {{2017}}, }