Sandhya Jain, Arun Pal Singh, Megha Madan, Pankaj Jain, “BOUNDEDNESS OF DUNKL-HAUSDORFF OPERATOR FOR RADIALLY DECREASING FUNCTIONS AND MONOTONE WEIGHTS ON $\mathbb {R}^{n}$”, J Math Sci, 2024
Humberto Rafeiro, Stefan Samko, Salaudin Umarkhadzhiev, “Local grand Lebesgue spaces on quasi-metric measure spaces and some applications”, Positivity, 26:3 (2022)
S. G. Samko, S. M. Umarkhadzhiev, “Weighted Hardy Operators in Grand Lebesgue Spaces on ℝn”, J Math Sci, 268:4 (2022), 509
Maria Rosaria Formica, Eugeny Ostrovsky, Leonid Sirota, “Grand Lebesgue Spaces are really Banach algebras relative to the convolution on unimodular locally compact groups equipped with Haar measure”, Mathematische Nachrichten, 294:9 (2021), 1702
Pankaj Jain, Anastasia Molchanova, Monika Singh, Sergey Vodopyanov, “On grand Sobolev spaces and pointwise description of Banach function spaces”, Nonlinear Analysis, 202 (2021), 112100
Monika Singh, “Grand and small $X^p$spaces and generalized duality”, Positivity, 25:4 (2021), 1469
P. Jain, M. Singh, A. Singh, V. D. Stepanov, “On the Duality of Grand Bochner–Lebesgue Spaces”, Матем. заметки, 107:2 (2020), 247–256 ; P. Jain, M. Singh, A. Singh, V. D. Stepanov, “On the Duality of Grand Bochner–Lebesgue Spaces”, Math. Notes, 107:2 (2020), 247–256
Д. В. Прохоров, В. Д. Степанов, Е. П. Ушакова, “Характеризация функциональных пространств, ассоциированных с весовыми пространствами Соболева первого порядка на действительной оси”, УМН, 74:6 (2019), 119–158 ; D. V. Prokhorov, V. D. Stepanov, E. P. Ushakova, “Characterization of the function spaces associated with weighted Sobolev spaces of the first order on the real line”, Russian Math. Surveys, 74:6 (2019), 1075–1115