A Meticulous Food Safety Plan Today Avoids Handcuffs Tomorrow

In August 2010, thousands of people across the United States were poisoned by eating eggs unknowingly tainted with Salmonella enteritidis bacteria. Following a lengthy investigation, the owners of the facility where the outbreak began were sentenced to three months in prison. This is not a one-off case; poor food safety practices are responsible for several outbreaks and often end in incarceration. Filthy hen houses, diseased fruit storage, and negligent food processing may be the last thing we want to imagine, but these practices have much to teach today\u27s food producers. This article first examines how poor food production practices can lead to an environment ripe for spread of disease and an unacceptable level of contamination. Then, it explores what companies can do to prevent such unacceptable conditions, decrease the likelihood and severity of an outbreak and, of course, avoid incarceration

Walks on the slit plane: other approaches

Let S be a finite subset of Z^2. A walk on the slit plane with steps in S is a sequence (0,0)=w_0, w_1, ..., w_n of points of Z^2 such that w_{i+1}-w_i belongs to S for all i, and none of the points w_i, i>0, lie on the half-line H= {(k,0): k =< 0}. In a recent paper, G. Schaeffer and the author computed the length generating function S(t) of walks on the slit plane for several sets S. All the generating functions thus obtained turned out to be algebraic: for instance, on the ordinary square lattice, S(t) =\frac{(1+\sqrt{1+4t})^{1/2}(1+\sqrt{1-4t})^{1/2}}{2(1-4t)^{3/4}}. The combinatorial reasons for this algebraicity remain obscure. In this paper, we present two new approaches for solving slit plane models. One of them simplifies and extends the functional equation approach of the original paper. The other one is inspired by an argument of Lawler; it is more combinatorial, and explains the algebraicity of the product of three series related to the model. It can also be seen as an extension of the classical cycle lemma. Both methods work for any set of steps S. We exhibit a large family of sets S for which the generating function of walks on the slit plane is algebraic, and another family for which it is neither algebraic, nor even D-finite. These examples give a hint at where the border between algebraicity and transcendence lies, and calls for a complete classification of the sets S.Comment: 31 page