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Extended Mathematical Programming (EMP) is an advanced framework used in optimization that integrates various components of mathematical programming, allowing for the inclusion of additional elements beyond traditional linear or nonlinear programming. EMP typically extends upon classic mathematical programming models by introducing more complex relationships and data structures, making it suited for addressing real-world problems that require more flexibility and detail in their representation.

The Folgar-Tucker model is a theoretical framework used in the study of composite materials and the behavior of suspensions of rigid particles within a fluid matrix. It specifically addresses the dynamics of elongated or fibrous particles in a viscous medium, focusing on the interactions between the particles and the surrounding fluid, as well as the interactions among the particles themselves.

A fractional-order system is a type of dynamical system characterized by differential equations that involve non-integer (fractional) orders of differentiation and integration. Unlike traditional integer-order systems, which are described by integer powers in their differential equations, fractional-order systems can exhibit more complex behaviors due to the inclusion of fractional derivatives. ### Key Concepts: 1. **Fractional Derivatives**: These are generalizations of the notion of derivatives to non-integer orders.

The generalized logistic function is a flexible mathematical model that describes a variety of growth processes. It extends the traditional logistic function by allowing additional parameters that can adjust its shape. The generalized logistic function can be used in various fields, including biology, economics, and population dynamics.

The Global Cascades Model is a framework used to understand and analyze the spread of information, behaviors, or phenomena across connected entities, such as individuals, organizations, or networks. This model is particularly relevant in contexts such as social media, marketing, epidemiology, and the diffusion of innovations. ### Key Features of the Global Cascades Model: 1. **Network Structure**: The model typically operates on a network, where nodes represent individuals or entities, and edges represent connections or relationships.

Gradient-enhanced kriging (GEK) is a variant of the traditional kriging method used for spatial prediction, particularly in the field of geostatistics. While traditional kriging focuses on modeling the spatial correlation of a variable based solely on observations, GEK incorporates additional information about the gradients (or spatial derivatives) of the variable of interest to improve the accuracy of the predictions.

A grey box model is a type of modeling approach that combines both empirical data and theoretical knowledge. In contrast to a black box model, where the internal workings of the system are not visible or understood, and a white box model, where everything about the internal processes is known and utilized, a grey box model occupies a middle ground. Key characteristics of grey box models include: 1. **Combination of Knowledge**: Grey box models utilize both qualitative and quantitative data.

The Head Injury Criterion (HIC) is a measure used to assess the potential for head injury in the event of a crash or impact. It quantifies the risk of brain injury resulting from forces applied to the head during a collision. The HIC is primarily used in automotive safety testing, helmet design, and various applications involving impact protection. ### Key Aspects of HIC: 1. **Calculation**: The HIC is calculated using acceleration data recorded during an impact event.

Historical dynamics is an interdisciplinary study that examines the processes and patterns of historical change over time. It seeks to understand how various factors—social, economic, political, environmental, and cultural—interact and influence the development of societies and civilizations. Key aspects of historical dynamics include: 1. **Causation and Change**: Investigating how specific events, decisions, or movements lead to significant changes in history, as well as how broader trends influence individual events.

The history of network traffic models involves the evolution of theoretical and empirical approaches used to understand, analyze, and predict network traffic behavior over time. Below is a timeline and overview of key developments in the field: ### 1960s - 1970s: Early Developments - **Foundational Theories**: The origins of network traffic modeling can be traced back to the concepts of queueing theory and stochastic processes, which were applied in telecommunications to manage and model telephone traffic.

Info-metrics is an interdisciplinary field that combines concepts from information theory, statistics, and economics to analyze and quantify uncertainty, information, and decision-making processes. It focuses on how information can be measured and utilized in various contexts, including economic modeling, data analysis, machine learning, and social sciences. The primary goal of info-metrics is to understand the relationships between information and uncertainty and to develop tools and methods for making informed decisions based on available data.

JuMP (Julia Mathematical Programming) is a domain-specific modeling language for mathematical optimization built on the Julia programming language. It provides a high-level interface for defining and solving linear, integer, and nonlinear optimization problems. JuMP allows users to express mathematical models in a way that is both expressive and readable, leveraging Julia's capabilities for performance and array handling.

LINGO is a mathematical programming language and optimization software developed by Lindo Systems, Inc. It is designed for formulating and solving linear, nonlinear, and mixed-integer optimization problems. LINGO provides a user-friendly environment for users to define complex mathematical models and analyze various optimization scenarios.

A Landscape Evolution Model (LEM) is a computational tool used to simulate and understand the processes that shape landscapes over time. LEMs integrate various geological and geomorphological principles, accounting for factors such as erosion, sediment transport, vegetation dynamics, hydrology, and climate influences. These models are often used in geological and environmental sciences to explore how landscapes evolve due to natural processes like weathering, fluvial activity, tectonics, and human activities.

Linear seismic inversion is a geophysical technique used to derive subsurface models of the Earth's structure based on seismic data. This process involves using recorded seismic waveforms, which are reflections or refractions caused by subsurface geological features, and estimating the properties of the subsurface layers, such as their density, velocity, and elastic properties. The term "linear" refers to the assumption that the relationship between the seismic data and the subsurface properties is linear.

A linear system refers to a mathematical model or framework that describes a relationship between input and output in a way that adheres to the principles of linearity. This concept is widely used in various fields such as engineering, physics, mathematics, economics, and more.

A Logan plot, also known as a Logan graphical analysis, is a graphical method used in pharmacokinetics and neuroimaging, particularly in the analysis of positron emission tomography (PET) data. It is primarily used to estimate the binding potential (BP) of radioligands, which are compounds that bind to specific receptors in the body. The Logan plot is particularly useful for analyzing reversible binding of a radioligand to its receptor.

MAgPIE, which stands for "Magneto-Optical Imaging of Photoelectrons," is often associated with research and techniques related to magneto-optical phenomena, particularly in the context of condensed matter physics and materials science. However, the term may also refer to a variety of specific projects or tools within these fields.

The Maas–Hoffman model, also known as the Maas-Hoffman dynamic model, is a theoretical framework used to analyze and understand the behavior of people and organizations in complex systems, often in the context of resource allocation and decision-making. Although the specific name may not be widely recognized across different fields, the model typically applies principles from operational research, economics, and systems dynamics.

Macroscopic traffic flow models are used to describe and analyze the flow of traffic on a larger scale, often at the level of road networks or regions rather than individual vehicles. These models treat traffic as a continuous fluid rather than focusing on individual vehicles, and they typically use aggregate quantities such as traffic density, flow (the number of vehicles passing a point per unit time), and average velocity.