ECCC-Report TR21-151https://eccc.weizmann.ac.il/report/2021/151Comments and Revisions published for TR21-151en-usThu, 16 Dec 2021 09:50:21 +0200
Revision 1
| Locally Testable Codes with constant rate, distance, and locality |
Irit Dinur,
Shai Evra,
Ron Livne,
Alexander Lubotzky,
Shahar Mozes
https://eccc.weizmann.ac.il/report/2021/151#revision1A locally testable code (LTC) is an error correcting code that has a property-tester. The tester reads $q$ bits that are randomly chosen, and rejects words with probability proportional to their distance from the code. The parameter $q$ is called the locality of the tester.
LTCs were initially studied as important components of PCPs, and since then the topic has evolved on its own. High rate LTCs could be useful in practice: before attempting to decode a received word, one can save time by first quickly testing if it is close to the code.
An outstanding open question has been whether there exist "$c^3$-LTCs", namely LTCs with *c*onstant rate, *c*onstant distance, and *c*onstant locality.
In this work we construct such codes based on a new two-dimensional complex which we call a left-right Cayley complex. This is essentially a graph which, in addition to vertices and edges, also has squares. Our codes can be viewed as a two-dimensional version of (the one-dimensional) expander codes, where the codewords are functions on the squares rather than on the edges. Thu, 16 Dec 2021 09:50:21 +0200https://eccc.weizmann.ac.il/report/2021/151#revision1
Paper TR21-151
| Locally Testable Codes with constant rate, distance, and locality |
Irit Dinur,
Shai Evra,
Ron Livne,
Alexander Lubotzky,
Shahar Mozes
https://eccc.weizmann.ac.il/report/2021/151A locally testable code (LTC) is an error correcting code that has a property-tester. The tester reads $q$ bits that are randomly chosen, and rejects words with probability proportional to their distance from the code. The parameter $q$ is called the locality of the tester.
LTCs were initially studied as important components of PCPs, and since then the topic has evolved on its own. High rate LTCs could be useful in practice: before attempting to decode a received word, one can save time by first quickly testing if it is close to the code.
An outstanding open question has been whether there exist "$c^3$-LTCs", namely LTCs with *c*onstant rate, *c*onstant distance, and *c*onstant locality.
In this work we construct such codes based on a new two-dimensional complex which we call a left-right Cayley complex. This is essentially a graph which, in addition to vertices and edges, also has squares. Our codes can be viewed as a two-dimensional version of (the one-dimensional) expander codes, where the codewords are functions on the squares rather than on the edges. Mon, 08 Nov 2021 22:01:24 +0200https://eccc.weizmann.ac.il/report/2021/151