Further Publications

 


  1. (1) de la Llave, R., & Windsor, A. (2011). Smooth dependence on parameters of solutions to cohomology equations over Anosov systems with applications to cohomology equations on diffeomorphism groups. Discrete and Continuous Dynamical Systems, Series A, 29(3), 1141 – 1154 (pdf)

  2. (2) de la Llave, R., & Windsor, A. (2011). Avoiding Early Closing: A Corrigendum to “Livsic theory for diffeomorphism groups with applications to conformal structures.” Ergodic Theory and Dynamical Systems, 31(4), 1269-1272 (pdf)

  3. (3) Bargagliotti, A.E., Botelho, F., Gleason, J., Haddock, J., Windsor, A. A Report on the Effectiveness of Blended Instruction in General Education Mathematics Courses.  Proceedings Of The 14th Annual Conference On Research In Undergraduate Mathematics Education. 25-38 (pdf)

  4. (4) Windsor A. (2010). A contraction mapping proof of the smooth dependence on parameters of solutions to Volterra integral equations. Nonlinear Analysis. Theory, Methods \& Applications. Series A: Theory and Methods, 72(9-10), 3627-3634 (pdf)

  5. (5) de la Llave, R., & Windsor, A. (2009). Livsic theorems for non-commutative groups including diffeomorphism groups and results on the existence of conformal structures for Anosov systems. Ergodic Theory and Dynamical Systems. 30(4), 1055 - 1100 (pdf)

  6. (6) de la Llave, R., & Windsor, A. (2009). Multiple recurrence and tiling theory. Discrete and Continuous Time Dynamical Systems, Series S, 2(2), 315–324. (pdf)

  7. (7) Windsor, A. (2008). Smoothness is not an obstruction to realizability. Ergodic Theory and Dynamical Systems, 28(3), 1037–1041. (pdf)

  8. (8) Fayad, B., & Windsor, A. (2007). A dichotomy between discrete and continuous spectrum for a class of special flows over rotations. Journal of Modern Dynamics, 1(1), 107–122. (pdf)

  9. (9) Fayad, B., Saprykina, M., & Windsor, A. (2007). Non-standard smooth realizations of Liouville rotations. Ergodic Theory and Dynamical Systems, 27(6), 1803–1818. (pdf)

  10. (10) Melbourne, I., & Windsor, A. (2005). A C diffeomorphism with infinitely many intermingled basins. Ergodic Theory and Dynamical Systems, 25(6), 1951–1959. (pdf)

  11. (11) Fayad, B., Katok, A. B., & Windsor, A. (2001). Mixed spectrum reparametrizations of linear flows on T2. Moscow Mathematics Journal, 1(4), 521–537. (pdf)

  12. (12) Windsor, A. (2001). Minimal but not uniquely ergodic diffeomorphisms. In Proceedings of Symposia in Pure Mathematics, Volume 69 (pp. 809–824). Providence, RI: American Mathematical Society. (pdf)