T. E. Harris scite author profile

Consider a lattice L in the Cartesian plane consisting of all points (x, y) such that either x or y is an integer. Points with integer coordinates (positive, negative, or zero) are called vertices and the sides of the unit squares (including endpoints) are called links. Each link of L is assigned the designation active with probability p or passive with probability 1 − p, independently of all other links. To avoid trivial cases, we shall always assume 0 < p < 1. The lattice L, with the designations active or passive attached to the links, is called a random maze. A set of links is called connected if the points comprising the links (including endpoints) form a connected point set in the plane.

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Diffusion with “collisions” between particles

Harris¹

1965

J. Appl. Probab.

209

400

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First consider two particles diffusing on the same line, with positions at time t given by y 1(t) and y2 (t) respectively. We suppose that they cannot pass one another, so that if initially y 1(0) < y 2(0), then . As long as the two particles are not in contact, we suppose that each moves, independently of the other, according to the Wiener process. We must also prescribe what happens when collisions occur. There seems to be no unique natural way to do this, and we shall adopt a method recommended by its mathematical convenience. However, we shall see that there are two possible motivations for the prescription, one in terms of random walks, the other in terms of a more mechanical model.

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Optimal Inventory Policy

Arrow¹,

Harris²,

Marschak³

1951

Econometrica

814

288

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T. E. Harris

The Theory of Branching Processes

Contact Interactions on a Lattice

A lower bound for the critical probability in a certain percolation process

Diffusion with “collisions” between particles

Optimal Inventory Policy

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