{"id":1150199,"date":"2025-09-19T08:23:22","date_gmt":"2025-09-19T15:23:22","guid":{"rendered":"https:\/\/www.microsoft.com\/en-us\/research\/?post_type=msr-research-item&p=1150199"},"modified":"2025-09-19T08:23:23","modified_gmt":"2025-09-19T15:23:23","slug":"improved-constructions-and-lower-bounds-for-maximally-recoverable-grid-codes","status":"publish","type":"msr-research-item","link":"https:\/\/www.microsoft.com\/en-us\/research\/publication\/improved-constructions-and-lower-bounds-for-maximally-recoverable-grid-codes\/","title":{"rendered":"Improved Constructions and Lower Bounds for Maximally Recoverable Grid Codes"},"content":{"rendered":"

In this paper, we continue the study of Maximally Recoverable (MR) Grid Codes initiated by Gopalan et al. [SODA 2017]. More precisely, we study codes over an $m \\times n$ grid topology with one parity check per row and column of the grid along with $h \\ge 1$ global parity checks. Previous works have largely focused on the setting in which $m = n$, where explicit constructions require field size which is exponential in $n$. Motivated by practical applications, we consider the regime in which $m,h$ are constants and $n$ is growing. In this setting, we provide a number of new explicit constructions whose field size is polynomial in $n$. We further complement these results with new field size lower bounds.<\/p>\n","protected":false},"excerpt":{"rendered":"

In this paper, we continue the study of Maximally Recoverable (MR) Grid Codes initiated by Gopalan et al. [SODA 2017]. More precisely, we study codes over an $m \\times n$ grid topology with one parity check per row and column of the grid along with $h \\ge 1$ global parity checks. Previous works have largely 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