Lachowicz M - Search Results

1

Friedman A, Lachowicz M, Ledzewicz U, Piotrowska MJ, Szymanska Z. Friedman A, et al. Among authors: lachowicz m. Math Biosci Eng. 2017 Feb 1;14(1):i. doi: 10.3934/mbe.201701i. Math Biosci Eng. 2017. PMID: 27879115 Free article.

2

Nonlocal models of biological phenomena: comment on "On the interplay between mathematical and biology, hallmarks towards a new system biology" by Bellomo, Elaiw, Althiabi and Alghamdi.

Lachowicz M, Szymańska Z. Lachowicz M, et al. Phys Life Rev. 2015 Mar;12:76-7. doi: 10.1016/j.plrev.2015.01.001. Epub 2015 Jan 13. Phys Life Rev. 2015. PMID: 25618394 No abstract available.

3

Mathematical Model Explaining the Role of CDC6 in the Diauxic Growth of CDK1 Activity during the M-Phase of the Cell Cycle.

Dębowski M, Szymańska Z, Kubiak JZ, Lachowicz M. Dębowski M, et al. Among authors: lachowicz m. Cells. 2019 Nov 28;8(12):1537. doi: 10.3390/cells8121537. Cells. 2019. PMID: 31795221 Free PMC article.

4

Mathematical modeling of the intracellular protein dynamics: the importance of active transport along microtubules.

Szymańska Z, Parisot M, Lachowicz M. Szymańska Z, et al. Among authors: lachowicz m. J Theor Biol. 2014 Dec 21;363:118-28. doi: 10.1016/j.jtbi.2014.07.022. Epub 2014 Aug 7. J Theor Biol. 2014. PMID: 25108193

5

Equilibrium solutions for microscopic stochastic systems in population dynamics.

Lachowicz M, Ryabukha T. Lachowicz M, et al. Math Biosci Eng. 2013 Jun;10(3):777-86. doi: 10.3934/mbe.2013.10.777. Math Biosci Eng. 2013. PMID: 23906149 Free article.

6

A singularly perturbed SIS model with age structure.

Banasiak J, Phongi EK, Lachowicz M. Banasiak J, et al. Among authors: lachowicz m. Math Biosci Eng. 2013 Jun;10(3):499-521. doi: 10.3934/mbe.2013.10.499. Math Biosci Eng. 2013. PMID: 23906133 Free article.

7

Chaotic behavior of semigroups related to the process of gene amplification-deamplification with cell proliferation.

Banasiak J, Lachowicz M, Moszyński M. Banasiak J, et al. Among authors: lachowicz m. Math Biosci. 2007 Apr;206(2):200-15. doi: 10.1016/j.mbs.2005.08.004. Epub 2005 Sep 30. Math Biosci. 2007. PMID: 16199064

In the last few years there has been a renewed interest in infinite systems of differential equations, similar to the classical birth-and-death system of population dynamics, due to their role in modelling the evolution of drug resistance in cancer cells. In [J. Banasiak, M …

In the last few years there has been a renewed interest in infinite systems of differential equations, similar to the classical birth-and-de …

8

Diauxic Growth at the Mesoscopic Scale.

Lachowicz M, Dȩbowski M. Lachowicz M, et al. Entropy (Basel). 2020 Nov 12;22(11):1280. doi: 10.3390/e22111280. Entropy (Basel). 2020. PMID: 33287048 Free PMC article.

9

Flexibility vs. robustness in cell cycle regulation of timing of M-phase entry in Xenopus laevis embryo cell-free extract.

Debowski M, El Dika M, Malejczyk J, Zdanowski R, Prigent C, Tassan JP, Kloc M, Lachowicz M, Kubiak JZ. Debowski M, et al. Among authors: lachowicz m. Int J Dev Biol. 2016;60(7-8-9):305-314. doi: 10.1387/ijdb.160134jk. Int J Dev Biol. 2016. PMID: 27759157 Free article.

10

From particle systems to learning processes: Comment on "Collective learning modeling based on the kinetic theory of active particles" by Diletta Burini, Silvana De Lillo, and Livio Gibelli.

Lachowicz M. Lachowicz M. Phys Life Rev. 2016 Mar;16:150-1. doi: 10.1016/j.plrev.2015.12.002. Epub 2015 Dec 11. Phys Life Rev. 2016. PMID: 26699682 No abstract available.

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