Proper functionalism : a new account of artifacts

Starbuck, Jessalyn Amanda

12 November 2010

After a brief overview of the standard attempts to give the persistence conditions of artifacts through time and material changes, I develop and present an account which capitalizes on Koons’s theory that artifacts are in some robust and important way social practices in order to explain their persistence through time. After one unsuccessful attempt to formulate a view that is not susceptible to Ship of Theseus like problems concerning the persistence conditions of artifacts, I present the full view: artifacts become artifacts when they are arranged in a particular formal manner by someone who is engaging in a creative social practice. The artifact then remains the same artifact so long as its form is sufficiently preserved and maintained according to maintaining social practices. In this way, the social practice that unifies the artifact is like the life that unifies an organism—so long as the social practice and the form persist, the artifact is the same artifact. To conclude, I look at several problems my view cannot yet account for, such as the persistence conditions of objects that are not manmade artifacts, and the commitment to ontic vagueness that my view seems to entail. / text

Persistence conditions

Ship of Theseus puzzle

Neo-Aristotelian

Identity

Social practices

Ontology

Functionalism

Teleology

Integrodifference Equations in Patchy Landscapes

Musgrave, Jeffrey

16 September 2013

In this dissertation, we study integrodifference equations in patchy landscapes. Specifically, we provide a framework for linking individual dispersal behavior with population-level dynamics in patchy landscapes by integrating recent advances in modeling dispersal into an integrodifference equation. First, we formulate a random-walk model in a patchy landscape with patch-dependent diffusion, settling, and mortality rates. We incorporate mechanisms for individual behavior at an interface which, in general, results in the probability-density function of the random walker being discontinuous at an interface. We show that the dispersal kernel can be characterized as the Green's function of a second-order differential operator and illustrate the kind of (discontinuous) dispersal kernels that arise from our approach. We examine the dependence of obtained kernels on model parameters. Secondly, we analyze integrodifference equations in patchy landscapes equipped with discontinuous kernels. We obtain explicit formulae for the critical-domain-size problem, as well as, explicit formulae for the analogous critical size of good patches on an infinite, periodic, patchy landscape. We examine the dependence of obtained formulae on individual behavior at an interface. Through numerical simulations, we observe that, if the population can persist on an infinite, periodic, patchy landscape, its spatial profile can evolve into a discontinuous traveling periodic wave. We derive a dispersion relation for the speed of the wave and illustrate how interface behavior affects invasion speeds. Lastly, we develop a strategic model for the spread of the emerald ash borer and its interaction with host trees. A thorough literature search provides point estimates and interval ranges for model parameters. Numerical simulations show that the spatial profile of an emerald ash borer invasion evolves into a pulse-like solution that moves with constant speed. We employ Latin hypercube sampling to obtain a plausible collection of parameter values and use a sensitivity analysis technique, partial rank correlation coefficients, to identify model parameters that have the greatest influence on obtained speeds. We illustrate the applicability of our framework by exploring the effectiveness of barrier zones on slowing the spread of the emerald ash borer invasion.

Random Walk

Interface behavior

integrodifference equations

dispersal kernel

landscape heterogeneity

stability analysis

persistence conditions

discontinuous traveling periodic wave

emerald ash borer

barrier zone

Integrodifference Equations in Patchy Landscapes

Musgrave, Jeffrey

January 2013

In this dissertation, we study integrodifference equations in patchy landscapes. Specifically, we provide a framework for linking individual dispersal behavior with population-level dynamics in patchy landscapes by integrating recent advances in modeling dispersal into an integrodifference equation. First, we formulate a random-walk model in a patchy landscape with patch-dependent diffusion, settling, and mortality rates. We incorporate mechanisms for individual behavior at an interface which, in general, results in the probability-density function of the random walker being discontinuous at an interface. We show that the dispersal kernel can be characterized as the Green's function of a second-order differential operator and illustrate the kind of (discontinuous) dispersal kernels that arise from our approach. We examine the dependence of obtained kernels on model parameters. Secondly, we analyze integrodifference equations in patchy landscapes equipped with discontinuous kernels. We obtain explicit formulae for the critical-domain-size problem, as well as, explicit formulae for the analogous critical size of good patches on an infinite, periodic, patchy landscape. We examine the dependence of obtained formulae on individual behavior at an interface. Through numerical simulations, we observe that, if the population can persist on an infinite, periodic, patchy landscape, its spatial profile can evolve into a discontinuous traveling periodic wave. We derive a dispersion relation for the speed of the wave and illustrate how interface behavior affects invasion speeds. Lastly, we develop a strategic model for the spread of the emerald ash borer and its interaction with host trees. A thorough literature search provides point estimates and interval ranges for model parameters. Numerical simulations show that the spatial profile of an emerald ash borer invasion evolves into a pulse-like solution that moves with constant speed. We employ Latin hypercube sampling to obtain a plausible collection of parameter values and use a sensitivity analysis technique, partial rank correlation coefficients, to identify model parameters that have the greatest influence on obtained speeds. We illustrate the applicability of our framework by exploring the effectiveness of barrier zones on slowing the spread of the emerald ash borer invasion.

Random Walk

Interface behavior

integrodifference equations

dispersal kernel

landscape heterogeneity

stability analysis

persistence conditions

discontinuous traveling periodic wave

emerald ash borer

barrier zone