scholarly journals Bayesian uncertainty quantification for data-driven equation learning

2021 ◽  
Vol 477 (2254) ◽  
Author(s):  
Simon Martina-Perez ◽  
Matthew J. Simpson ◽  
Ruth E. Baker
Keyword(s):  
Differential Equation ◽  
Data Driven ◽  
Parameter Distribution ◽  
Simulation Data ◽  
Agent Based ◽  
Multiple Datasets ◽  
Differential Equation Models ◽  
Observation Noise ◽  
Parameter Values ◽  
The Relationship

Equation learning aims to infer differential equation models from data. While a number of studies have shown that differential equation models can be successfully identified when the data are sufficiently detailed and corrupted with relatively small amounts of noise, the relationship between observation noise and uncertainty in the learned differential equation models remains unexplored. We demonstrate that for noisy datasets there exists great variation in both the structure of the learned differential equation models and their parameter values. We explore how to exploit multiple datasets to quantify uncertainty in the learned models, and at the same time draw mechanistic conclusions about the target differential equations. We showcase our results using simulation data from a relatively straightforward agent-based model (ABM) which has a well-characterized partial differential equation description that provides highly accurate predictions of averaged ABM behaviours in relevant regions of parameter space. Our approach combines equation learning methods with Bayesian inference approaches so that a quantification of uncertainty can be given by the posterior parameter distribution of the learned model.

scholarly journals Calculation and Analysis of the Amber Interval in Traffic Flow

2019 ◽  
pp. 1-10
Author(s):  
Meng Xinyu ◽  
Zhao Jian ◽  
Zhang Wei ◽  
Meng Zhaoping
Keyword(s):  
Differential Equation ◽  
Equation Model ◽  
Related Factors ◽  
Traffic Condition ◽  
Amber Light ◽  
A Value ◽  
Differential Equation Models ◽  
Light Duration ◽  
Difficult Area ◽  
The Relationship

According to the relationship between the speed of vehicle and the amber light, we establish the differential equation model of the amber light duration. And based on the relevant conditions given in the title, three differential equation models of amber light duration under different conditions are obtained. Considering the traffic condition and driver's habit, we calculate a value that is most suitable to the actual demand. The sensitivity and stability of the model and its related factors are analyzed. We improve the model for the problem of difficult area.

scholarly journals Differential equation model of financial market stability based on Internet big data

2021 ◽  
Vol 0 (0) ◽  
Author(s):  
Hongling Chen ◽  
Bahjat Fakieh ◽  
Bishr Muhamed Muwafak
Keyword(s):  
Differential Equation ◽  
Big Data ◽  
Differential Equations ◽  
Financial Market ◽  
Equation Model ◽  
Differential Equation Model ◽  
Nonlinear Characteristics ◽  
Differential Equation Models ◽  
Financial Market Stability ◽  
The Relationship

Abstract In the context of Internet big data, the market characteristics of the financial market can be used to feed back its stability with the help of differential equation models. China's financial market is roughly divided into three main markets: stocks, currency and foreign exchange. The interaction of the three has promoted the development of the financial market. With this as a background, the paper aims at these three financial markets and selects relevant indicators that can reflect the indications of the financial market to construct differential equations to analyse the relationship between the three. The paper uses the nonlinear characteristics of ordinary differential equations and related algorithms to solve the three types of market models. It uses an example to demonstrate that the differential equation model proposed in this paper can feed back the evolutionary characteristics of the three, and this model can help investors produce more correct investment decisions.

scholarly journals Learning differential equation models from stochastic agent-based model simulations

2021 ◽  
Vol 18 (176) ◽  
Author(s):  
John T. Nardini ◽  
Ruth E. Baker ◽  
Matthew J. Simpson ◽  
Kevin B. Flores
Keyword(s):  
Differential Equation ◽  
Cell Biology ◽  
Coarse Grained ◽  
Disease Spread ◽  
Agent Based Model ◽  
Agent Based Models ◽  
Agent Based ◽  
Model Simulations ◽  
Differential Equation Models ◽  
Model Dynamics

Agent-based models provide a flexible framework that is frequently used for modelling many biological systems, including cell migration, molecular dynamics, ecology and epidemiology. Analysis of the model dynamics can be challenging due to their inherent stochasticity and heavy computational requirements. Common approaches to the analysis of agent-based models include extensive Monte Carlo simulation of the model or the derivation of coarse-grained differential equation models to predict the expected or averaged output from the agent-based model. Both of these approaches have limitations, however, as extensive computation of complex agent-based models may be infeasible, and coarse-grained differential equation models can fail to accurately describe model dynamics in certain parameter regimes. We propose that methods from the equation learning field provide a promising, novel and unifying approach for agent-based model analysis. Equation learning is a recent field of research from data science that aims to infer differential equation models directly from data. We use this tutorial to review how methods from equation learning can be used to learn differential equation models from agent-based model simulations. We demonstrate that this framework is easy to use, requires few model simulations, and accurately predicts model dynamics in parameter regions where coarse-grained differential equation models fail to do so. We highlight these advantages through several case studies involving two agent-based models that are broadly applicable to biological phenomena: a birth–death–migration model commonly used to explore cell biology experiments and a susceptible–infected–recovered model of infectious disease spread.

scholarly journals Integrating experimental data to calibrate quantitative cancer models

2015 ◽  
Author(s):  
Heiko Enderling
Keyword(s):  
Differential Equation ◽  
Experimental Data ◽  
Cell Cycle ◽  
Cell Proliferation ◽  
Cancer Cells ◽  
Unknown Parameters ◽  
Agent Based ◽  
Cancer Models ◽  
Differential Equation Models ◽  
Model Dynamics

For quantitative cancer models to be meaningful and interpretable the number of unknown parameters must be kept minimal. Experimental data can be utilized to calibrate model dynamics rates or rate constants. Proper integration of experimental data, however, depends on the chosen theoretical framework. Using live imaging of cell proliferation as an example, we show how to derive cell cycle distributions in agent-based models and averaged proliferation rates in differential equation models. We focus on a tumor hierarchy of cancer stem and progenitor non-stem cancer cells.

Overview of Gene Regulatory Network Inference Based on Differential Equation Models

2020 ◽  
Vol 21 (11) ◽  
pp. 1054-1059
Author(s):  
Bin Yang ◽  
Yuehui Chen
Keyword(s):  
Differential Equation ◽  
Gene Regulatory Networks ◽  
Regulatory Networks ◽  
Network Inference ◽  
New Drugs ◽  
Gene Regulatory Network Inference ◽  
Ode Models ◽  
Differential Equation Models ◽  
Linear Ode ◽  
Gene Regulatory

: Reconstruction of gene regulatory networks (GRN) plays an important role in understanding the complexity, functionality and pathways of biological systems, which could support the design of new drugs for diseases. Because differential equation models are flexible androbust, these models have been utilized to identify biochemical reactions and gene regulatory networks. This paper investigates the differential equation models for reverse engineering gene regulatory networks. We introduce three kinds of differential equation models, including ordinary differential equation (ODE), time-delayed differential equation (TDDE) and stochastic differential equation (SDE). ODE models include linear ODE, nonlinear ODE and S-system model. We also discuss the evolutionary algorithms, which are utilized to search the optimal structures and parameters of differential equation models. This investigation could provide a comprehensive understanding of differential equation models, and lead to the discovery of novel differential equation models.

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