Your search keyword '"Karan Pattni"' showing total 6 results

1. Generalized Social Dilemmas: The Evolution of Cooperation in Populations with Variable Group Size

Author

Karan Pattni, Jan Rychtář, and Mark Broom

Subjects

0301 basic medicine, Evolutionary game, General Mathematics, Immunology, Population, Evolutionary game theory, Context (language use), Public goods game, HM, Models, Biological, General Biochemistry, Genetics and Molecular Biology, Microeconomics, 03 medical and health sciences, 0302 clinical medicine, Game Theory, Animals, Humans, Cooperative Behavior, education, QA, General Environmental Science, Pharmacology, Population Density, education.field_of_study, Special Issue: Modelling Biological Evolution: Developing Novel Approaches, General Neuroscience, 91A22, Social dilemma, Prisoner's dilemma, Mathematical Concepts, Prisoner Dilemma, Public good, Hawk–Dove game, Biological Evolution, 92D15, Dilemma, Cooperation, 030104 developmental biology, Computational Theory and Mathematics, 030220 oncology & carcinogenesis, Prisoner’s Dilemma, General Agricultural and Biological Sciences, Psychology

Abstract

Evolutionary game theory is an important tool to model animal and human behaviour. A key class of games are the social dilemmas, where cooperation benefits the group but defection benefits the individual within any group. Previous works have considered which games qualify as social dilemmas, and different categories of dilemmas, but have generally concentrated on fixed sizes of interacting groups. In this paper we develop a systematic investigation of social dilemmas on all group sizes. This allows for a richer definition of social dilemmas. For example, while increasing a group size to include another defector is always bad for all existing group members, extra cooperators can be good or bad, depending upon the particular dilemma and group size. We consider a number of commonly used social dilemmas in this context, and in particular show the effect of variability in group sizes for the example of a population comprising negative binomially distributed group sizes. The most striking effect is that increasing the variability in group sizes for non-threshold public goods games is favourable for the evolution of cooperation. The situation for threshold public goods games and commons dilemmas is more complex.

Published

2018

2. Evolving multiplayer networks: Modelling the evolution of cooperation in a mobile population

Author

Jan Rychtar, Karan Pattni, and Mark Broom

Subjects

0301 basic medicine, QA75, education.field_of_study, Markov chain, Computer science, Movement (music), Applied Mathematics, Population size, Population, HB, Evolutionary game theory, Microeconomics, 03 medical and health sciences, 030104 developmental biology, Evolutionary graph theory, Public goods game, Discrete Mathematics and Combinatorics, Evolutionary dynamics, education, QA

Abstract

We consider a finite population of individuals that can move through a structured environment using our previously developed flexible evolutionary framework. In the current paper the behaviour of the individuals follows a Markov movement model where decisions about whether they should stay or leave depends upon the group of individuals they are with at present. The interaction between individuals is modelled using a public goods game. We demonstrate that cooperation can evolve when there is a cost associated with movement. Combining the movement cost with a larger population size has a positive effect on the evolution of cooperation. Moreover, increasing the exploration time, which is the amount of time an individual is allowed to explore its environment, also has a positive effect. Unusually, we find that the evolutionary dynamics used does not have a significant effect on these results.

Published

2018

3. Evolutionary dynamics and the evolution of multiplayer cooperation in a subdivided population

Author

Mark Broom, Karan Pattni, and Jan Rychtář

Subjects

0301 basic medicine, Statistics and Probability, Vertex (graph theory), Class (set theory), Theoretical computer science, Population Dynamics, Population, Models, Biological, Stability (probability), General Biochemistry, Genetics and Molecular Biology, Combinatorics, 03 medical and health sciences, QH301, Game Theory, Evolutionary graph theory, Animals, Humans, Quantitative Biology::Populations and Evolution, Interpersonal Relations, Cooperative Behavior, Evolutionary dynamics, Representation (mathematics), education, QA, Mathematics, education.field_of_study, General Immunology and Microbiology, Applied Mathematics, General Medicine, Biological Evolution, Variable (computer science), 030104 developmental biology, Modeling and Simulation, General Agricultural and Biological Sciences

Abstract

The classical models of evolution have been developed to incorporate structured populations using evolutionary graph theory and, more recently, a new framework has been developed to allow for more flexible population structures which potentially change through time and can accommodate multiplayer games with variable group sizes. In this paper we extend this work in three key ways. Firstly by developing a complete set of evolutionary dynamics so that the range of dynamic processes used in classical evolutionary graph theory can be applied. Secondly, by building upon previous models to allow for a general subpopulation structure, where all subpopulation members have a common movement distribution. Subpopulations can have varying levels of stability, represented by the proportion of interactions occurring between subpopulation members; in our representation of the population all subpopulation members are represented by a single vertex. In conjunction with this we extend the important concept of temperature (the temperature of a vertex is the sum of all the weights coming into that vertex; generally, the higher the temperature, the higher the rate of turnover of individuals at a vertex). Finally, we have used these new developments to consider the evolution of cooperation in a class of populations which possess this subpopulation structure using a multiplayer public goods game. We show that cooperation can evolve providing that subpopulations are sufficiently stable, with the smaller the subpopulations the easier it is for cooperation to evolve. We introduce a new concept of temperature, namely “subgroup temperature”, which can be used to explain our results.

Published

2017

4. Evolutionary graph theory revisited: when is an evolutionary process equivalent to the Moran process?

Author

L. J. Silvers, Mark Broom, Karan Pattni, and Jan Rychtář

Subjects

education.field_of_study, Theoretical computer science, General Mathematics, Population, General Engineering, General Physics and Astronomy, Combinatorics, Fixation (population genetics), Evolutionary graph theory, G1, Moran process, Graph (abstract data type), Quantitative Biology::Populations and Evolution, Evolutionary dynamics, education, QA, Mathematics

Abstract

Evolution in finite populations is often modelled using the classical Moran process. Over the last 10 years, this methodology has been extended to structured populations using evolutionary graph theory. An important question in any such population is whether a rare mutant has a higher or lower chance of fixating (the fixation probability) than the Moran probability, i.e. that from the original Moran model, which represents an unstructured population. As evolutionary graph theory has developed, different ways of considering the interactions between individuals through a graph and an associated matrix of weights have been considered, as have a number of important dynamics. In this paper, we revisit the original paper on evolutionary graph theory in light of these extensions to consider these developments in an integrated way. In particular, we find general criteria for when an evolutionary graph with general weights satisfies the Moran probability for the set of six common evolutionary dynamics.

Published

2015

5. A study of the dynamics of multi-player games on small networks using territorial interactions

Author

Mark Broom, Karan Pattni, Jan Rychtář, and Charlotte Lafaye

Subjects

education.field_of_study, Sequential game, Applied Mathematics, Population Dynamics, Population, Mathematical Concepts, Biological Evolution, Models, Biological, Agricultural and Biological Sciences (miscellaneous), Fixation (population genetics), Game Theory, Evolutionary graph theory, Modeling and Simulation, Statistics, Public goods game, Animals, Humans, Territoriality, education, QA, Game theory, Mathematical economics, Value (mathematics), Selection (genetic algorithm), Mathematics

Abstract

Recently, the study of structured populations using models of evolutionary processes on graphs has begun to incorporate a more general type of interaction between individuals, allowing multi-player games to be played among the population. In this paper, we develop a birth-death dynamics for use in such models and consider the evolution of populations for special cases of very small graphs where we can easily identify all of the population states and carry out exact analyses. To do so, we study two multi-player games, a Hawk-Dove game and a public goods game. Our focus is on finding the fixation probability of an individual from one type, cooperator or defector in the case of the public goods game, within a population of the other type. We compare this value for both games on several graphs under different parameter values and assumptions, and identify some interesting general features of our model. In particular there is a very close relationship between the fixation probability and the mean temperature, with high temperatures helping fitter individuals and punishing unfit ones and so enhancing selection, whereas low temperatures give a levelling effect which suppresses selection.

Published

2015

6. Dynamics of multiplayer games on complex networks using territorial interactions

Author

Karan Pattni, Mark Broom, and Pedro H. T. Schimit

Subjects

Structure (mathematical logic), education.field_of_study, Theoretical computer science, Computer science, QH, HB, Population, Complex network, 01 natural sciences, 010305 fluids & plasmas, Term (time), Evolutionary graph theory, 0103 physical sciences, Public goods game, Quantitative Biology::Populations and Evolution, Pairwise comparison, QA, 010306 general physics, education, Clustering coefficient

Abstract

The modelling of evolution in structured populations has been significantly advanced by evolutionary graph theory, which incorporates pairwise relationships between individuals on a network. More recently, a new framework has been developed to allow for multi-player interactions of variable size in more flexible and potentially changing population structures. While the theory within this framework has been developed, and simple structures considered, there has been no systematic consideration of a large range of different population structures, which is the subject of this paper. We consider a large range of underlying graphical structures for the territorial raider model, the most commonly used model in the new structure, and consider a variety of important properties of our structures with the aim of finding factors that determine the fixation probability of mutants. We find that the graphical temperature and the average group size, as previously defined, are strong predictors of fixation probability, whilst all other properties considered are poor predictors, although the clustering coefficient is a useful secondary predictor when combined with either of temperature or group size. The relationship between temperature/average group size and fixation probability is sometimes, however, non-monotonic, with a directional reverse occurring around the temperature associated with what we term “completely mixed” populations in the case of the Hawk-Dove game, but not the Public Goods game.