On pursuit curves

J. C. Barton; C. J. Eliezer

doi:10.1017/S0334270000011292

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Recently, several papers [2–4, 6] have been published concerning a pursuit problem which was apparently first posed explicitly by Leonardo da Vinci and which may have been present in earlier thinking about kinematics and geometry. Falconry appears to go back, in Europe, to the days of Pliny, Aristotle and Martial, and, in Asia, to 2000 BC [5].

References

[1]Boole, G. A., Treatise on differential equations (Cambridge, Macmillan and Co., 1859) p. 246.Google Scholar

[2]Colman, W. J. A., “A curve of pursuit”, Bulletin of the Institute of Mathematics and its Applications 27 (3) (1991) pp. 45–47.Google Scholar

[3]Eliezer, C.J. and Barton, J.C., “Pursuit curves”, Bulletin of the Institute of Mathematics and its Applications 28 (11, 12) (1992) pp. 182–184.Google Scholar

[4]Eliezer, C.J. and Barton, J.C., “Pursuit curves II”, Bulletin of the Institute of Mathematics and its Applications 31 (9, 10) (1995) pp. 139–141.Google Scholar

[5]Encyclopaedia Britannica, Ninth Edition, vol. IX, MDCCCLXXIX, p. 6.Google Scholar

[6]Guha, A. and Biswas, S.K., “On Leonardo da Vinci's cat and mouse problem”, Bulletin of the Institute of Mathematics and its Applications 30 (1, 2) (1994) pp. 12–15.Google Scholar

Crossref Citations

This article has been cited by the following publications. This list is generated based on data provided by Crossref.

Betser, A. Vela, P.A. Pryor, G. and Tannenbaum, A. 2005. Flying in formation using a pursuit guidance algorithm. p. 5085.

Mungan, Carl E 2005. A classic chase problem solved from a physics perspective. European Journal of Physics, Vol. 26, Issue. 6, p. 985.

Trott, Michael 2006. The Mathematica GuideBook for Numerics. p. 1.

Cera, M. Mesa, J. A. Ortega, F. A. and Plastria, F. 2008. Locating a Central Hunter on the Plane. Journal of Optimization Theory and Applications, Vol. 136, Issue. 2, p. 155.

Qing-Xin, Yuan and Yin-Xiao, Du 2008. Note on the dog-and-rabbit chase problem in introductory kinematics. European Journal of Physics, Vol. 29, Issue. 5, p. N43.

Shunyakov, V. M. and Lavrik, L. V. 2010. Analytical solution of curvilinear motion on an inclined plane. American Journal of Physics, Vol. 78, Issue. 12, p. 1406.

Scott, William and Leonard, Naomi Ehrich 2013. Pursuit, herding and evasion: A three-agent model of caribou predation. p. 2978.

Jun, Chanyoung 2014. Continuous pursuit curves on cat $$(K)$$ ( K ) spaces. Geometriae Dedicata, Vol. 173, Issue. 1, p. 309.

Dunworth, Jeffrey B. and Ermentrout, G. Bard 2016. Heterogeneity and Oscillations in Small Swarms. SIAM Journal on Applied Dynamical Systems, Vol. 15, Issue. 3, p. 1455.

Scarpello, Giovanni Mingari Ritelli, Daniele and Spaletta, Giulia 2019. Aircraft planar trajectories in crosswind navigation: some hypergeometric solutions. European Journal of Physics, Vol. 40, Issue. 1, p. 015001.

Deng, Bill and Collier, Timothy 2019. Increasing relative angular velocity for air combat in zero gravity. Aerospace Systems, Vol. 2, Issue. 2, p. 83.

Natt, Oliver 2020. Physik mit Python. p. 91.

Natt, Oliver 2022. Physik mit Python. p. 99.

Yoshihara, Sota and Ohira, Toru 2022. Pursuit and Evasion: from singles to groups. Journal of Physics: Conference Series, Vol. 2207, Issue. 1, p. 012014.

Azevedo, Thales and Pelluso, Anderson 2022. Space pirates: A pursuit curve problem involving retarded time. American Journal of Physics, Vol. 90, Issue. 10, p. 730.

Basquerotto, Cláudio H. C. C. Ruiz, A. da Silva, Samuel and Weber, Hans Ingo 2022. An illustrative application of the Lie symmetries in the context of first-order mechanical systems: Hathaway’s circular pursuit problem. Acta Mechanica, Vol. 233, Issue. 3, p. 1031.

Von Moll, Alexander Pachter, Meir and Fuchs, Zachariah 2023. Pure Pursuit with an Effector. Dynamic Games and Applications, Vol. 13, Issue. 3, p. 961.

Weintraub, Isaac E. Von Moll, Alexander Garcia, Eloy Casbeer, David W. and Pachter, Meir 2023. Surveillance of a Faster Fixed-Course Target. IEEE Transactions on Aerospace and Electronic Systems, Vol. 59, Issue. 4, p. 4147.

Бодряков, Владимир Юрьевич and Bodryakov, Vladimir Yur'evich 2023. Задача о преследовании с произвольным начальным углом прицеливания. Математическое моделирование, Vol. 35, Issue. 11, p. 35.

Mančev, Ivan and Kostić, Ljiljana 2023. Various methods for solving the pursuit problem with two objects on a plane. European Journal of Physics, Vol. 44, Issue. 3, p. 035002.

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