Sarah Peluse scite author profile

We show that any subset of [N ] of density at least (log log N ) −2 −157 contains a nontrivial progression of the form x, x + y, x + y 2 . This is the first quantitatively effective version of the Bergelson-Leibman polynomial Szemerédi theorem for a progression involving polynomials of differing degrees. In the course of the proof, we also develop a quantitative version of a special case of a concatenation theorem of Tao and Ziegler, with polynomial bounds.

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A Polylogarithmic Bound in the Nonlinear Roth Theorem

Peluse

Prendiville

2020

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A generalized family of multidimensional continued fractions: TRIP Maps

Dasaratha

Flapan

Garrity

et al. 2014

Int. J. Number Theory

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Most well-known multidimensional continued fractions, including the Mönkemeyer map and the triangle map, are generated by repeatedly subdividing triangles. This paper constructs a family of multidimensional continued fractions by permuting the vertices of these triangles before and after each subdivision. We obtain an even larger class of multidimensional continued fractions by composing the maps in the family. These include the algorithms of Brun, Parry-Daniels and Güting. We give criteria for when multidimensional continued fractions associate sequences to unique points, which allows us to determine when periodicity of the corresponding multidimensional continued fraction corresponds to pairs of real numbers being cubic irrationals in the same number field.

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Three-term polynomial progressions in subsets of finite fields

Peluse

2018

Isr. J. Math.

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Sarah Peluse

On the polynomial Szemerédi theorem in finite fields

Quantitative bounds in the nonlinear Roth theorem

A Polylogarithmic Bound in the Nonlinear Roth Theorem

A generalized family of multidimensional continued fractions: TRIP Maps

Three-term polynomial progressions in subsets of finite fields

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