## Contact

**KTH Royal Institute of Technology**

*SE-100 44 Stockholm Sweden +46 8 790 60 00*

[1]

K. Bjerklöv, "Circle maps driven by a class of uniformly distributed sequences on T," *Bulletin of the London Mathematical Society*, vol. 54, no. 3, pp. 910-928, 2022.

[2]

K. Bjerklöv and R. Krikorian, "Coexistence of absolutely continuous and pure point spectrum for kicked quasiperiodic potentials," *Journal of Spectral Theory*, vol. 11, no. 3, pp. 1215-1254, 2021.

[3]

K. Bjerklöv, "On the Lyapunov Exponents for a Class of Circle Diffeomorphisms Driven by Expanding Circle Endomorphisms," *Journal of Dynamics and Differential Equations*, 2020.

[4]

K. Bjerklöv, "Positive Lyapunov Exponent for Some Schrödinger Cocycles Over Strongly Expanding Circle Endomorphisms," *Communications in Mathematical Physics*, vol. 379, no. 1, pp. 353-360, 2020.

[5]

K. Bjerklöv and H. Eliasson, "Positive fibered lyapunov exponents for some quasi-periodically driven circle endomorphisms with critical points," *Astérisque*, vol. 415, pp. 181-193, 2020.

[6]

K. Bjerklöv, "Some remarks on the dynamics of the almost Mathieu equation at critical coupling*," *Nonlinearity*, vol. 33, no. 6, pp. 2707-2722, 2020.

[7]

K. Bjerklöv, "On some generalizations of skew-shifts on T-2," *Ergodic Theory and Dynamical Systems*, vol. 39, pp. 19-61, 2019.

[8]

K. Bjerklöv, "Quasi-periodic kicking of circle diffeomorphisms having unique fixed points," *Moscow Mathematical Journal*, vol. 19, no. 2, pp. 189-216, 2019.

[9]

K. Bjerklov, "A note on circle maps driven by strongly expanding endomorphisms on T," *Dynamical systems*, vol. 33, no. 2, pp. 361-368, 2018.

[10]

K. Bjerklöv, "The Dynamics of a Class of Quasi-Periodic Schrödinger Cocycles," *Annales de l'Institute Henri Poincare. Physique theorique*, vol. 16, no. 4, pp. 961-1031, 2015.

[11]

K. Bjerklöv, "Attractors in the quasi-periodically perturbed quadratic family," *Nonlinearity*, vol. 25, no. 5, pp. 1537-1545, 2012.

[12]

K. Bjerklöv, "Quasi-periodic perturbation of unimodal maps exhibiting an attracting 3-cycle," *Nonlinearity*, vol. 25, no. 3, pp. 683-741, 2012.

[13]

K. Bjerklöv and T. Jäger, "Rotation numbers for quasiperiodically forced circle maps mode-locking vs. strict monotonicity," *Journal of The American Mathematical Society*, vol. 22, no. 2, pp. 353-362, 2009.

[14]

K. Bjerklöv, "SNA's in the Quasi-Periodic Quadratic Family," *Communications in Mathematical Physics*, vol. 286, no. 1, pp. 137-161, 2009.

[15]

K. Bjerklöv, D. Damanik and R. Johnson, "Lyapunov exponents of continuous Schrodinger cocycles over irrational rotations," *Annali di Matematica Pura ed Applicata*, vol. 187, no. 1, pp. 1-6, 2008.

[16]

K. Bjerklöv and R. Johnson, "Minimal subsets of projective flows," *Discrete and continuous dynamical systems. Series B*, vol. 9, no. 3-4, pp. 493-516, 2008.

[17]

K. Bjerklöv and M. Saprykina, "Universal asymptotics in hyperbolicity breakdown," *Nonlinearity*, vol. 21, no. 3, pp. 557-586, 2008.

[18]

K. Bjerklöv, "Dynamics of the quasi-periodic Schrodinger cocycle at the lowest energy in the spectrum," *Communications in Mathematical Physics*, vol. 272, no. 2, pp. 397-442, 2007.

[19]

K. Bjerklöv, "Positive lyapunov exponent and minimality for the continuous 1-d quasi-periodic Schrodinger equation with two basic frequencies," *Annales de l'Institute Henri Poincare. Physique theorique*, vol. 8, no. 4, pp. 687-730, 2007.

[20]

K. Bjerklöv, "Explicit examples of arbitrarily large analytic ergodic potentials with zero Lyapunov exponent," *Geometric and Functional Analysis*, vol. 16, no. 6, pp. 1183-1200, 2006.

[21]

K. Bjerklöv, "Positive Lyapunov exponents for continuous quasiperiodic Schrodinger equations," *Journal of Mathematical Physics*, vol. 47, no. 2, 2006.

[22]

K. Bjerklöv, "Positive Lyapunov exponent and minimality for a class of one-dimensional quasi-periodic Schrodinger equations," *Ergodic Theory and Dynamical Systems*, vol. 25, pp. 1015-1045, 2005.

[23]

K. Bjerklöv, "Dynamical Properties of Quasi-periodic Schrödinger Equations," Doctoral thesis Stockholm : KTH, Trita-MAT. MA, 2003:04, 2003.

Senaste synkning med DiVA:

2024-04-14 00:20:10

**KTH Royal Institute of Technology**

*SE-100 44 Stockholm Sweden +46 8 790 60 00*