Ethan M. Coven scite author profile

A set tiles the integers if and only if the integers can be written as a disjoint union of translates of that set. We consider the problem of finding necessary and sufficient conditions for a finite set to tile the integers. For sets of prime power Ž . size, it was solved by D. Newman 1977, J. Number Theory 9, 107᎐111 . We solve it for sets of size having at most two prime factors. The conditions are always sufficient, but it is unknown whether they are necessary for all finite sets.

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Sequences with minimal block growth

Coven

Hedlund

1973

Math. Systems Theory

277

214

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Endomorphisms of irreducible subshifts of finite type

Coven

Paul

1974

Math. Systems Theory

118

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Pseudo-orbit shadowing in the family of tent maps

Coven¹,

Kan²,

Yorke³

1988

Trans. Amer. Math. Soc.

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ABSTRACT. We study the family of tent maps-continuous, unimodal, piecewise linear maps of the interval with slopes ±s, \/2 < s < 2. We show that tent maps have the shadowing property (every pseudo-orbit can be approximated by an actual orbit) for almost all parameters s, although they fail to have the shadowing property for an uncountable, dense set of parameters.We also show that for any tent map, every pseudo-orbit can be approximated by an actual orbit of a tent map with a perhaps slightly larger slope.

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Pseudo-Orbit Shadowing in the Family of Tent Maps

Coven¹,

Kan²,

Yorke³

1988

Transactions of the American Mathematical Society

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Ethan M. Coven

Tiling the Integers with Translates of One Finite Set

Sequences with minimal block growth

Endomorphisms of irreducible subshifts of finite type

Pseudo-orbit shadowing in the family of tent maps

Pseudo-Orbit Shadowing in the Family of Tent Maps

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