Artículos en Revistas Internacionales con referato del ISI

  1. Physical implementation of asynchronous cellular automata networks: mathematical models and preliminary experimental results

    Cicuttin, A., De Micco, L., Crespo, M. L., Antonelli, M., Garcia, L., & Florian, W. (2021). Physical implementation of asynchronous cellular automata networks: mathematical models and preliminary experimental results. Nonlinear Dynamics, 105(3), 2431-2452.

  2. From Continuous-Time Chaotic Systems to Pseudo Random Number Generators: Analysis and Generalized Methodology

    De Micco, L., Antonelli, M., & Rosso, O. A. (2021). From Continuous-Time Chaotic Systems to Pseudo Random Number Generators: Analysis and Generalized Methodology. Entropy, 23(6), 671.

  3. Spectrum Sensing in Cognitive Radio using Recurrence Diagrams

    Antonelli, M., Moreira, J. C., & Micco, L. D. (2021). Spectrum sensing in cognitive radio using recurrence diagrams. International Journal of Embedded Systems, 14(6), 535-543.

  4. Guest Editorial Special Issue on Embedded Systems

    De Micco, L., Vargas, F. L., & Fierens, P. I. (2019). Guest editorial special issue on embedded systems. IEEE Latin America Transactions, 18(02), 180-187.

  5. Hybrid sorting algorithm implemented by High Level Synthesis

    De Micco, L., Acosta, M. L., & Antonelli, M. (2019). Hybrid sorting algorithm implemented by high level synthesis. IEEE Latin America Transactions, 18(02), 430-437.

  6. A literature review on embedded systems

    De Micco, L., Vargas, F. L., & Fierens, P. I. (2019). A literature review on embedded systems. IEEE Latin America Transactions, 18(02), 188-205.

  7. Complexity of Simple, Switched and Skipped Chaotic Maps in Finite Precision

    Antonelli, M., De Micco, L., Larrondo, H., & Rosso, O. A. (2018). Complexity of simple, switched and skipped chaotic maps in finite precision. Entropy, 20(2), 135.

  8. Stochastic Degradation of the Fixed-point version of 2D-Chaotic Maps

    De Micco, L., Antonelli, M., & Larrondo, H. A. (2017). Stochastic degradation of the fixed-point version of 2D-chaotic maps. Chaos, Solitons & Fractals, 104, 477-484.

  9. Measuring the Jitter of Ring Oscillators by means of Information Theory Quantifiers

    Antonelli, M., De Micco, L., & Larrondo, H. A. (2017). Measuring the jitter of ring oscillators by means of information theory quantifiers. Communications in Nonlinear Science and Numerical Simulation, 43, 139-150.

  10. Randomness of FSSM over GF(4) and quality of hopping turbo codes

    De Micco, L., Petruzzi, D., Larrondo, H. A., & Moreira, J. C. C. (2013). Randomness of finite-state sequence machine over GF (4) and quality of hopping turbo codes. IET Communications, 7(9), 783-790.

  11. Characterization of chaotic maps using the permutation Bandt-Pompe probability distribution

    Rosso, O. A., Olivares, F., Zunino, L., De Micco, L., Aquino, A. L., Plastino, A., & Larrondo, H. A. (2013). Characterization of chaotic maps using the permutation Bandt-Pompe probability distribution. The European Physical Journal B, 86(4), 1-13.

  12. Sampling period, statistical complexity, and chaotic attractors

    De Micco, L., Fernández, J. G., Larrondo, H. A., Plastino, A., & Rosso, O. A. (2012). Sampling period, statistical complexity, and chaotic attractors. Physica A: Statistical Mechanics and its Applications, 391(8), 2564-2575.

  13. Mixing chaotic maps and electromagnetic interference reduction

    De Micco, L., Petrocelli, R. A., Rosso, O. A., Plastino, A., & Larrondo, H. A. (2012). Mixing chaotic maps and electromagnetic interference reduction. Int. J. Appl. Math. Stat, 26, 106-120.

  14. Statistical Complexity of Sampled Chaotic Attractors

    De Micco, L., Fernández, J. G., Larrondo, H. A., Plastino, A., & Rosso, O. A. (2011). Statistical complexity of sampled chaotic attractors. arXiv preprint arXiv:1105.3927.

  15. Info-quantifiers' map-characterization revisited

    Rosso, O. A., De Micco, L., Plastino, A., & Larrondo, H. A. (2010). Info-quantifiers’ map-characterization revisited. Physica A: Statistical Mechanics and its Applications, 389(21), 4604-4612.

  16. Generalized Statistical Complexity Measure

    Rosso, O. A., De Micco, L., Larrondo, H. A., Martín, M. T., & Plastino, A. (2010). Generalized statistical complexity measure. International Journal of Bifurcation and Chaos, 20(03), 775-785.

  17. Quantifiers for randomness of chaotic pseudo random number generators

    De Micco, L., Larrondo, H. A., Plastino, A., & Rosso, O. A. (2009). Quantifiers for randomness of chaotic pseudo-random number generators. Philosophical Transactions of the Royal Society A: Mathematical, Physical and Engineering Sciences, 367(1901), 3281-3296.

  18. Randomizing nonlinear maps via symbolic dynamics

    De Micco, L., González, C. M., Larrondo, H. A., Martin, M. T., Plastino, A., & Rosso, O. A. (2008). Randomizing nonlinear maps via symbolic dynamics. Physica A: Statistical Mechanics and its Applications, 387(14), 3373-3383.

  19. Zipping characterization of chaotic sequences used in spread spectrum communication systems

    De Micco, L., Arizmendi, C. M., & Larrondo, H. A. (2007, May). Zipping characterization of chaotic sequences used in spread spectrum communication systems. In AIP Conference Proceedings (Vol. 913, No. 1, pp. 139-144). American Institute of Physics.

  20. Acquisition of Low Frequency Signals Immersed in Noise by Chaotic Sampling and FIR Filters

    Petrocelli, R. A., De Micco, L., Carrica, D. O., & Larrondo, H. A. (2007, October). Acquisition of low frequency signals immersed in noise by chaotic sampling and fir filters. In 2007 IEEE International Symposium on Intelligent Signal Processing (pp. 1-6). IEEE.