Your search keyword '"42B25 (Primary) 11L15, 26D05 (Secondary)"' showing total 6 results

1. Decoupling inequalities for quadratic forms

Author

Guo, Shaoming, Oh, Changkeun, Zhang, Ruixiang, and Zorin-Kranich, Pavel

Subjects

Mathematics - Classical Analysis and ODEs, Mathematics - Number Theory, 42B25 (Primary) 11L15, 26D05 (Secondary)

Abstract

We prove sharp $\ell^q L^p$ decoupling inequalities for $p,q \in [2,\infty)$ and arbitrary tuples of quadratic forms. Connections to prior results on decoupling inequalities for quadratic forms are also explained. We also include some applications of our results to exponential sum estimates and to Fourier restriction estimates. The proof of our main result is based on scale-dependent Brascamp--Lieb inequalities., Comment: v2: corrected following referee reports, 37 pages

Published

2020

2. Decoupling for two quadratic forms in three variables: a complete characterization

Author

Guo, Shaoming, Oh, Changkeun, Roos, Joris, Yung, Po-Lam, and Zorin-Kranich, Pavel

Subjects

Mathematics - Classical Analysis and ODEs, Mathematics - Number Theory, 42B25 (Primary) 11L15, 26D05 (Secondary)

Abstract

We prove sharp decoupling inequalities for all degenerate surfaces of codimension two in $\mathbb{R}^5$ given by two quadratic forms in three variables. Together with previous work by Demeter, Guo, and Shi in the non-degenerate case (arXiv:1609.04107), this provides a classification of decoupling inequalities for pairs of quadratic forms in three variables., Comment: v2: 19 pages, small corrections following referee report

Published

2019

3. Decoupling for certain quadratic surfaces of low co-dimensions

Author

Guo, Shaoming and Zorin-Kranich, Pavel

Subjects

Mathematics - Classical Analysis and ODEs, Mathematics - Number Theory, 42B25 (Primary) 11L15, 26D05 (Secondary)

Abstract

We prove sharp $\ell^{p}L^{p}$ decoupling inequalities for $2$ quadratic forms in $4$ variables. We also recover several previous results (arXiv:1409.1634, arXiv:1501.07224, arXiv:1609.02022, arXiv:1609.04107) in a unified way., Comment: v2: revised following referee reports, 22 pages

Published

2019

4. Decoupling for certain quadratic surfaces of low co‐dimensions

Author

Pavel Zorin-Kranich and Shaoming Guo

Subjects

Pure mathematics, Mathematics - Number Theory, General Mathematics, 010102 general mathematics, 01 natural sciences, Quadratic equation, Mathematics - Classical Analysis and ODEs, 0103 physical sciences, Classical Analysis and ODEs (math.CA), FOS: Mathematics, Decoupling (probability), Number Theory (math.NT), 42B25 (Primary) 11L15, 26D05 (Secondary), 010307 mathematical physics, 0101 mathematics, Mathematics

Abstract

We prove sharp $\ell^{p}L^{p}$ decoupling inequalities for $2$ quadratic forms in $4$ variables. We also recover several previous results (arXiv:1409.1634, arXiv:1501.07224, arXiv:1609.02022, arXiv:1609.04107) in a unified way., Comment: v2: revised following referee reports, 22 pages

Published

2020

5. Decoupling inequalities for quadratic forms

Author

Shaoming Guo, Changkeun Oh, Ruixiang Zhang, and Pavel Zorin-Kranich

Subjects

Mathematics - Number Theory, Mathematics - Classical Analysis and ODEs, General Mathematics, Classical Analysis and ODEs (math.CA), FOS: Mathematics, Number Theory (math.NT), 42B25 (Primary) 11L15, 26D05 (Secondary)

Abstract

We prove sharp $\ell^q L^p$ decoupling inequalities for $p,q \in [2,\infty)$ and arbitrary tuples of quadratic forms. Connections to prior results on decoupling inequalities for quadratic forms are also explained. We also include some applications of our results to exponential sum estimates and to Fourier restriction estimates. The proof of our main result is based on scale-dependent Brascamp--Lieb inequalities., v2: corrected following referee reports, 37 pages

Published

2020

6. Decoupling for two quadratic forms in three variables: a complete characterization

Author

Shaoming Guo, Changkeun Oh, Joris Roos, Po-Lam Yung, and Pavel Zorin-Kranich

Subjects

Mathematics - Number Theory, Mathematics - Classical Analysis and ODEs, General Mathematics, Classical Analysis and ODEs (math.CA), FOS: Mathematics, Number Theory (math.NT), 42B25 (Primary) 11L15, 26D05 (Secondary)

Abstract

We prove sharp decoupling inequalities for all degenerate surfaces of codimension two in $\mathbb{R}^5$ given by two quadratic forms in three variables. Together with previous work by Demeter, Guo, and Shi in the non-degenerate case (arXiv:1609.04107), this provides a classification of decoupling inequalities for pairs of quadratic forms in three variables., Comment: v2: 19 pages, small corrections following referee report

Published

2019