Abstract
We significantly strengthen and generalize the theorem lifting Nullstellensatz degree to monotone span program size by Pitassi and Robere (2018) so that it works for any gadget with high enough rank, in particular, for useful gadgets such as equality and greater-than. We apply our generalized theorem to solve three open problems: •We present the first result that demonstrates a separation in proof power for cutting planes with unbounded versus polynomially bounded coefficients. Specifically, we exhibit CNF formulas that can be refuted in quadratic length and constant line space in cutting planes with unbounded coefficients, but for which there are no refutations in subexponential length and subpolynomial line space if coefficients are restricted to be of polynomial magnitude. •We give the first explicit separation between monotone Boolean formulas and monotone real formulas. Specifically, we give an explicit family of functions that can be computed with monotone real formulas of nearly linear size but require monotone Boolean formulas of exponential size. Previously only a non-explicit separation was known. •We give the strongest separation to-date between monotone Boolean formulas and monotone Boolean circuits. Namely, we show that the classical GEN problem, which has polynomial-size monotone Boolean circuits, requires monotone Boolean formulas of size 2{Omega(n text{polylog}(n))}. An important technical ingredient, which may be of independent interest, is that we show that the Nullstellensatz degree of refuting the pebbling formula over a DAG G over any field coincides exactly with the reversible pebbling price of G. In particular, this implies that the standard decision tree complexity and the parity decision tree complexity of the corresponding falsified clause search problem are equal. This is an extended abstract. The full version of the paper is available at https://arxiv.org/abs/2001.02144.
Original language | English |
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Title of host publication | Proceedings - 2020 IEEE 61st Annual Symposium on Foundations of Computer Science, FOCS 2020 |
Publisher | IEEE Computer Society |
Pages | 24-30 |
Number of pages | 7 |
ISBN (Electronic) | 9781728196213 |
ISBN (Print) | 978-1-7281-9622-0 |
DOIs | |
Publication status | Published - 2020 Nov |
Event | 61st IEEE Annual Symposium on Foundations of Computer Science, FOCS 2020 - Virtual, Durham, United States Duration: 2020 Nov 16 → 2020 Nov 19 |
Publication series
Name | Proceedings - Annual IEEE Symposium on Foundations of Computer Science, FOCS |
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Volume | 2020-November |
ISSN (Print) | 0272-5428 |
Conference
Conference | 61st IEEE Annual Symposium on Foundations of Computer Science, FOCS 2020 |
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Country/Territory | United States |
City | Virtual, Durham |
Period | 2020/11/16 → 2020/11/19 |
Bibliographical note
Funding Information:Or Meir was supported by the Israel Science Foundation (grant No. 1445/16). Toniann Pitassi was supported by NSERC. Susanna F. de Rezende and Jakob Nordström were supported by the European Research Council under the European Union’s Seventh Framework Programme (FP7/2007–2013) / ERC grant agreement no. 279611, as well as by the Knut and Alice Wallenberg grant KAW 2016.0066. Susanna F. de Rezende also received funding fromg Knut and Alice Wallenberg Foundation grant KAW 2018.0371 and Jakob Nordström from the Swedish Research Council grants 621-2012-5645 and 2016-00782 and from the Independent Research Fund Denmark grant 9040-00389B. Part of this work was completed while Robert Robere was a postdoctoral researcher at DIMACS and the Institute for Advanced Study. This material is based upon work directly supported by the Charles Simonyi Endowment and indirectly supported by the National Science Foundation Grant No. CCF-1900460. Any opinions, findings and conclusions or recommendations expressed in this material are those of the author(s) and do not necessarily reflect the views of the National Science Foundation. Marc Vinyals was supported by the Prof. R Narasimhan post-doctoral award.
Funding Information:
Part of this work was carried out while several of the authors were visiting the Simons Institute for the Theory of Computing in association with the DIMACS/Simons Collaboration on Lower Bounds in Computational Complexity, which is conducted with support from the National Science Foundation.
Publisher Copyright:
© 2020 IEEE.
Subject classification (UKÄ)
- Computer Science
Free keywords
- circuit complexity
- communication complexity
- cutting planes
- pebble games
- proof complexity
- trade-offs