Best fitting tumor growth models of the von Bertalanffy-PütterType

Kühleitner, Manfred; Brunner, Norbert; Nowak, Werner Georg; Renner-Martin, Katharina; Scheicher, Klaus

doi:10.1186/s12885-019-5911-y

Cited by 20 publications

(16 citation statements)

References 35 publications

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“…The data-fitting exercise for the BP-model is more challenging than for the Richards model, where standard optimization routines may run into difficulties [29]. In recent papers a method of data-fitting was developed for the BP-model [30] [31] [32] and [33]. This method was based on a grid-search, whereby we searched the best-fitting exponent-pairs (a, b) on a grid with step size 0.01 in both directions (Figure 1).…”

Section: Goodness Of Fit and Methods Of Calibrationmentioning

confidence: 99%

Bertalanffy-Pütter Models for the Growth of Tropical Trees and Stands

Brunner¹,

Kühleitner²

2020

OJMSi

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The Bertalanffy-Pütter (BP) five-parameter growth model provides a versatile framework for the modeling of growth. Using data from a growth experiment in literature about the average size-at-age of 24 species of tropical trees over ten years in the same area, we identified their best-fit BP-model parameters. While different species had different best-fit exponent-pairs, there was a model with a good fit to 21 (87.5%) of the data ("Good fit" means a normalized root-mean-squared-error NRMSE below 2.5%. This threshold was the 95% quantile of the lognormal distribution that was fitted to the NRMSE values for the best-fit models for the data). In view of the sigmoidal character of this model despite the early stand we discuss whether the setting of the growth experiment may have impeded growth.

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Section: Goodness Of Fit and Methods Of Calibrationmentioning

confidence: 99%

Bertalanffy-Pütter Models for the Growth of Tropical Trees and Stands

Brunner¹,

Kühleitner²

2020

OJMSi

Self Cite

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“…In our analysis we chose four of the most representative and typically used scalar growth models, namely Logistic, von Bertalanffy, Gompertz and Holling, described in Table 1 and depicted in Figure 2. Despite their ubiquitous use, in either original form or embedded in more complex models [18], the aforementioned scalar tumor growth models are confined due to: a) the requirement of a precise biological description (i.e. values for α, β, λ and k correspond to biophysical processes); b) incapacity to describe the diversity of tumor types (i.e.…”

Section: Model Equationmentioning

confidence: 99%

Growth pattern Learning for Unsupervised Extraction of Cancer Kinetics

Axenie¹,

Kurz

2020

Preprint

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Neoplastic processes are described by complex and heterogeneous dynamics. The interaction of neoplastic cells with their environment describes tumor growth and is critical for the initiation of cancer invasion. Despite the large spectrum of tumor growth models, there is no clear guidance on how to choose the most appropriate model for a particular cancer and how this will impact its subsequent use in therapy planning. Such models need parametrization that is dependent on tumor biology and hardly generalize to other tumor types and their variability. Moreover, the datasets are small in size due to the limited or expensive measurement methods. Alleviating the limitations that incomplete biological descriptions, the diversity of tumor types, and the small size of the data bring to mechanistic models, we introduce Growth pattern Learning for Unsupervised Extraction of Cancer Kinetics (GLUECK) a novel, data-driven model based on a neural network capable of unsupervised learning of cancer growth curves. Employing mechanisms of competition, cooperation, and correlation in neural networks, GLUECK learns the temporal evolution of the input data along with the underlying distribution of the input space. We demonstrate the superior accuracy of GLUECK, against four typically used tumor growth models, in extracting growth curves from a four clinical tumor datasets. Our experiments show that, without any modification, GLUECK can learn the underlying growth curves being versatile between and within tumor types.

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“…where k 0 is the growth rate, and N m is the maximum number of cells in a system in an organ, in vivo or a culture plate, in vitro. The existence of N m can be often recognized by many papers, for example (K€ uhleitner et al 2019;Mu et al 2003;Sachs et al 2001).…”

Section: Proliferating Cancer Cells: Wam To Ss Modelmentioning

confidence: 99%

WAM to SeeSaw model for cancer therapy – overcoming LQM difficulties –

Bandō

Tsunoyama

Suzuki

et al. 2020

International Journal of Radiation Biology

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Purpose: The assessment of biological effects caused by radiation exposure has been currently carried out with the linear-quadratic (LQ) model as an extension of the linear non-threshold (LNT) model. In this study, we suggest a new mathematical model named as SeaSaw (SS) model, which describes proliferation and cell death effects by taking account of Bergonie-Tribondeau's law in terms of a differential equation in time. We show how this model overcomes the long-standing difficulties of the LQ model. Materials and methods: We construct the SS model as an extended Wack-A-Mole (WAM) model by using a differential equation with respect to time in order to express the dynamics of the proliferation effect. A large number of accumulated data of such parameters as a and b in the LQ based models provide us with valuable pieces of information on the corresponding parameter b 1 and the maximum volume V m of the SS model. The dose rate b 1 and the notion of active cell can explain the present data without introduction of b, which is obtained by comparing the SS model with not only the cancer therapy data but also with in vitro experimental data. Numerical calculations are presented to grasp the global features of the SS model. Results: The SS model predicts the time dependence of the number of active-and inactive-cells. The SS model clarifies how the effect of radiation depends on the cancer stage at the starting time in the treatment. Further, the time dependence of the tumor volume is calculated by changing individual dose strength, which results in the change of the irradiation duration for the same effect. We can consider continuous irradiation in the SS model with interesting outcome on the time dependence of the tumor volume for various dose rates. Especially by choosing the value of the dose rate to be balanced with the total growth rate, the tumor volume is kept constant. Conclusions: The SS model gives a simple equation to study the situation of clinical radiation therapy and risk estimation of radiation. The radiation parameter extracted from the cancer therapy is close to the value obtained from animal experiment in vitro and in vivo. We expect the SS model leads us to a unified description of radiation therapy and protection and provides a great development in cancer-therapy clinical-planning.

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Best fitting tumor growth models of the von Bertalanffy-PütterType

Cited by 20 publications

References 35 publications

Bertalanffy-Pütter Models for the Growth of Tropical Trees and Stands

Bertalanffy-Pütter Models for the Growth of Tropical Trees and Stands

Growth pattern Learning for Unsupervised Extraction of Cancer Kinetics

WAM to SeeSaw model for cancer therapy – overcoming LQM difficulties –

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Best fitting tumor growth models of the von Bertalanffy-PütterType

Cited by 20 publications

References 35 publications

Bertalanffy-P&#252;tter Models for the Growth of Tropical Trees and Stands

Bertalanffy-P&#252;tter Models for the Growth of Tropical Trees and Stands

Growth pattern Learning for Unsupervised Extraction of Cancer Kinetics

WAM to SeeSaw model for cancer therapy – overcoming LQM difficulties –

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Product

Resources

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Bertalanffy-Pütter Models for the Growth of Tropical Trees and Stands

Bertalanffy-Pütter Models for the Growth of Tropical Trees and Stands