Further bounds in the polynomial Szemer
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Publication:5854724
DOI10.4064/aa200218-9-6zbMath1459.11029arXiv1907.08446OpenAlexW3126989782MaRDI QIDQ5854724
Publication date: 17 March 2021
Published in: Acta Arithmetica (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/1907.08446
Related Items (2)
On several notions of complexity of polynomial progressions ⋮ True complexity of polynomial progressions in finite fields
Cites Work
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- Linear forms and higher-degree uniformity for functions on \(\mathbb F^n_p\)
- The primes contain arbitrarily long polynomial progressions
- Difference sets without squares
- Linear equations in primes
- Difference sets without \(\kappa\)-th powers
- Three-term polynomial progressions in subsets of finite fields
- Nonlinear Roth type theorems in finite fields
- A polynomial Sárközy-Furstenberg theorem with upper bounds
- Improved estimates for polynomial Roth type theorems in finite fields
- Linear forms and quadratic uniformity for functions on \(\mathbb{Z}_{N}\)
- On the polynomial Szemerédi theorem in finite fields
- Concatenation theorems for anti-Gowers-uniform functions and Host-Kra characteristic factors
- An inverse theorem for Gowers norms of trace functions over Fp
- LINEAR FORMS AND QUADRATIC UNIFORMITY FOR FUNCTIONS ON
- A quantitative improvement for Roth's theorem on arithmetic progressions: Table 1.
- Intersective sets given by a polynomial
- Decompositions, approximate structure, transference, and the Hahn-Banach theorem
- On sets of integers containing k elements in arithmetic progression
- On difference sets of sequences of integers. I
- On difference sets of sequences of integers. III
- NEW BOUNDS FOR SZEMERÉDI'S THEOREM, III: A POLYLOGARITHMIC BOUND FOR
- A maximal extension of the best-known bounds for the Furstenberg–Sárközy theorem
- Szemerédi's Theorem in the Primes
- Quantitative bounds in the polynomial Szemerédi theorem: the homogeneous case
- POLYNOMIAL PATTERNS IN THE PRIMES
- Polynomial extensions of van der Waerden’s and Szemerédi’s theorems
- On Sets of Integers Which Contain No Three Terms in Arithmetical Progression
- A new proof of Szemerédi's theorem
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