| A course in Hodge theory: Periods of algebraic cycles. 33o Colóquio Brasileiro de Matemática, IMPA, Rio de Janeiro, Brazil, 2021 H Movasati, R Villaflor Rio de Janeiro: Instituto Nacional de Matemática Pura e Aplicada (IMPA), 2021 | 20* | 2021 |
| Periods of linear algebraic cycles H Movasati, RV Loyola Pure and Applied Mathematics Quarterly 14 (3-4), 563-577, 2018 | 20* | 2018 |
| Periods of complete intersection algebraic cycles R Villaflor Loyola manuscripta mathematica 167 (3-4), 765-792, 2022 | 16 | 2022 |
| Small codimension components of the Hodge locus containing the Fermat variety R Villaflor Loyola Communications in Contemporary Mathematics 24 (07), 2150053, 2022 | 9 | 2022 |
| Integral Hodge conjecture for Fermat varieties E Aljovin, H Movasati, RV Loyola Journal of Symbolic Computation 95, 177-184, 2019 | 7 | 2019 |
| More on G-flux and general hodge cycles on the Fermat sextic AP Braun, H Fortin, DL Garcia, RV Loyola Journal of High Energy Physics 2024 (6), 1-47, 2024 | 5 | 2024 |
| Toric differential forms and periods of complete intersections RV Loyola Journal of Algebra, 2024 | 5 | 2024 |
| Gauss–Manin Connection in Disguise: Quasi Jacobi Forms of Index Zero J Cao, H Movasati, R Villaflor Loyola International Mathematics Research Notices 2024 (8), 6680-6709, 2024 | 4 | 2024 |
| Periods of algebraic cycles R Villaflor Ph. D. thesis, 2019 | 4 | 2019 |
| On a Torelli Principle for automorphisms of Klein hypersurfaces V González-Aguilera, A Liendo, P Montero, R Villaflor Loyola Transactions of the American Mathematical Society 377 (08), 5483-5511, 2024 | 3 | 2024 |
| On fake linear cycles inside Fermat varieties J Duque Franco, R Villaflor Loyola Algebra & Number Theory 17 (10), 1847--1865, 2023 | 3 | 2023 |
| Periods of join algebraic cycles J Duque Franco, R Villaflor Loyola arXiv e-prints, arXiv: 2312.17222, 2023 | 1* | 2023 |
