Penguins are flightless, so they are forced to walk while on land. In particular, they show rather specific behaviours in their homecoming, which are interesting to observe and to describe analytically. We observed that penguins have the tendency to waddle back and forth on the shore to create a sufficiently large group, and then walk home compactly together. The mathematical framework that we introduce describes this phenomenon, by taking into account "natural parameters", such as the eyesight of the penguins and their cruising speed. The model that we propose favours the formation of conglomerates of penguins that gather together, but, on the other hand, it also allows the possibility of isolated and exposed individuals. The model that we propose is based on a set of ordinary differential equations. Due to the discontinuous behaviour of the speed of the penguins, the mathematical treatment (to get existence and uniqueness of the solution) is based on a "stop-and-go" procedure. We use this setting to provide rigorous examples in which at least some penguins manage to safely return home (there are also cases in which some penguins remain isolated). To facilitate the intuition of the model, we also present some simple numerical simulations that can be compared with the actual movement of the penguin parade.

The Phillip island penguin parade (A mathematical treatment) / S. Dipierro, L. Lombardini, P. Miraglio, E. Valdinoci. - In: ANZIAM JOURNAL. - ISSN 1446-1811. - 60:1(2018 Jul 01), pp. 27-54.

The Phillip island penguin parade (A mathematical treatment)

S. Dipierro
Primo
;
L. Lombardini
Secondo
;
P. Miraglio
Penultimo
;
E. Valdinoci
Ultimo
2018

Abstract

Penguins are flightless, so they are forced to walk while on land. In particular, they show rather specific behaviours in their homecoming, which are interesting to observe and to describe analytically. We observed that penguins have the tendency to waddle back and forth on the shore to create a sufficiently large group, and then walk home compactly together. The mathematical framework that we introduce describes this phenomenon, by taking into account "natural parameters", such as the eyesight of the penguins and their cruising speed. The model that we propose favours the formation of conglomerates of penguins that gather together, but, on the other hand, it also allows the possibility of isolated and exposed individuals. The model that we propose is based on a set of ordinary differential equations. Due to the discontinuous behaviour of the speed of the penguins, the mathematical treatment (to get existence and uniqueness of the solution) is based on a "stop-and-go" procedure. We use this setting to provide rigorous examples in which at least some penguins manage to safely return home (there are also cases in which some penguins remain isolated). To facilitate the intuition of the model, we also present some simple numerical simulations that can be compared with the actual movement of the penguin parade.
population dynamics; Eudyptula minor; Phillip Island; mathematical models
Settore MAT/05 - Analisi Matematica
   Aspetti variazionali e perturbativi nei problemi differenziali nonlineari
   MINISTERO DELL'ISTRUZIONE E DEL MERITO
   201274FYK7_008

   Elliptic Pdes and Symmetry of Interrfaces and Layers for Odd Nonlinearties
   EPSILON
   EUROPEAN COMMISSION
   FP7
   277749
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Utilizza questo identificativo per citare o creare un link a questo documento: https://hdl.handle.net/2434/609152
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