Degree vs. approximate degree and Quantum implications of Huang’s sensitivity theorem

Based on the recent breakthrough of Huang (2019), we show that for any total Boolean function $f$, $\bullet \quad \mathrm{deg}(f) = O(\widetilde{\mathrm{deg}}(f)^2)$: The degree of $f$ is at most quadratic in the approximate degree of $f$. This is optimal as witnessed by the OR function. $\bullet \quad \mathrm{D}(f) = O(\mathrm{Q}(f)^4)$: The deterministic query complexity of $f$ is at most quartic in the quantum query complexity of $f$. This matches the known separation (up to log factors) due to Ambainis, Balodis, Belovs, Lee, Santha, and Smotrovs (2017). We apply these results to resolve the quantum analogue of the Aanderaa--Karp--Rosenberg conjecture. We show that if $f$ is a nontrivial monotone graph property of an $n$-vertex graph specified by its adjacency matrix, then $\mathrm{Q}(f)=\Omega(n)$, which is also optimal. We also show that the approximate degree of any read-once formula on $n$ variables is $\Theta(\sqrt{n})$.

[1]  Eberhard Triesch,et al.  A Lower Bound for the Complexity of Monotone Graph Properties , 2013, SIAM J. Discret. Math..

[2]  Frédéric Magniez,et al.  Quantum algorithms for the triangle problem , 2005, SODA '05.

[3]  Elias Koutsoupias,et al.  Improvements on Khrapchenko's theorem , 1993, Theor. Comput. Sci..

[4]  Justin Thaler,et al.  A Nearly Optimal Lower Bound on the Approximate Degree of AC0 , 2017, Electron. Colloquium Comput. Complex..

[5]  Andrew Chi-Chih Yao Lower bounds to randomized algorithms for graph properties , 1987, 28th Annual Symposium on Foundations of Computer Science (sfcs 1987).

[6]  Lov K. Grover A fast quantum mechanical algorithm for database search , 1996, STOC '96.

[7]  Alexander A. Sherstov Making polynomials robust to noise , 2012, STOC '12.

[8]  Subhash Khot,et al.  Improved lower bounds on the randomized complexity of graph properties , 2001, Random Struct. Algorithms.

[9]  Nathan Linial,et al.  Complexity measures of sign matrices , 2007, Comb..

[10]  Michael E. Saks,et al.  Probabilistic Boolean decision trees and the complexity of evaluating game trees , 1986, 27th Annual Symposium on Foundations of Computer Science (sfcs 1986).

[11]  Michael E. Saks,et al.  Quantum query complexity and semi-definite programming , 2003, 18th IEEE Annual Conference on Computational Complexity, 2003. Proceedings..

[12]  P. Hajnal An Ω(n4/3) lower bound on the randomized complexity of graph properties , 1991 .

[13]  Nikhil Bansal,et al.  k-Forrelation Optimally Separates Quantum and Classical Query Complexity , 2020, Electron. Colloquium Comput. Complex..

[14]  Michael E. Saks,et al.  Composition limits and separating examples for some boolean function complexity measures , 2013, 2013 IEEE Conference on Computational Complexity.

[15]  Alexander A. Sherstov Approximating the AND-OR Tree , 2013, Theory Comput..

[16]  Avishay Tal,et al.  Properties and applications of boolean function composition , 2013, ITCS '13.

[17]  Avi Wigderson,et al.  Computing Graph Properties by Randomized Subcube Partitions , 2002, RANDOM.

[18]  Andrew Chi-Chih Yao Monotone Bipartite Graph Properties are Evasive , 1988, SIAM J. Comput..

[19]  Gordon F. Royle,et al.  Algebraic Graph Theory , 2001, Graduate texts in mathematics.

[20]  David Galvin,et al.  A topological approach to evasiveness , 2010 .

[21]  David Rubinstein Sensitivity vs. block sensitivity of Boolean functions , 1995, Comb..

[22]  Avishay Tal,et al.  On Fractional Block Sensitivity , 2013, Chic. J. Theor. Comput. Sci..

[23]  Ryan O'Donnell,et al.  Every decision tree has an influential variable , 2005, 46th Annual IEEE Symposium on Foundations of Computer Science (FOCS'05).

[24]  Troy Lee,et al.  A Direct Product Theorem for Discrepancy , 2008, 2008 23rd Annual IEEE Conference on Computational Complexity.

[25]  Michael E. Saks,et al.  A lower bound on the quantum query complexity of read-once functions , 2001, Electron. Colloquium Comput. Complex..

[26]  Sanjeev Khanna,et al.  Space Time Tradeoffs for Graph Properties , 1999, ICALP.

[27]  Terence Tao Structure and Randomness: Pages from Year One of a Mathematical Blog , 2008 .

[28]  Andris Ambainis,et al.  Separations in query complexity based on pointer functions , 2015, STOC.

[29]  Mario Szegedy,et al.  All Quantum Adversary Methods Are Equivalent , 2005, ICALP.

[30]  T. Sanders,et al.  Analysis of Boolean Functions , 2012, ArXiv.

[31]  Ronald de Wolf,et al.  Quantum lower bounds by polynomials , 2001, JACM.

[32]  Gatis Midrijanis Exact quantum query complexity for total Boolean functions , 2004, quant-ph/0403168.

[33]  Gilles Brassard,et al.  Strengths and Weaknesses of Quantum Computing , 1997, SIAM J. Comput..

[34]  Andrew Chi-Chih Yao,et al.  Probabilistic computations: Toward a unified measure of complexity , 1977, 18th Annual Symposium on Foundations of Computer Science (sfcs 1977).

[35]  Martin E. Walter,et al.  On the norm of a Schur product , 1986 .

[36]  Ronald de Wolf,et al.  Robust Polynomials and Quantum Algorithms , 2003, Theory of Computing Systems.

[37]  Shalev Ben-David Low-Sensitivity Functions from Unambiguous Certificates , 2017, ITCS.

[38]  Justin Thaler,et al.  A Nearly Optimal Lower Bound on the Approximate Degree of AC^0 , 2017, 2017 IEEE 58th Annual Symposium on Foundations of Computer Science (FOCS).

[39]  Scott Aaronson,et al.  Separations in query complexity using cheat sheets , 2015, Electron. Colloquium Comput. Complex..

[40]  Justin Thaler,et al.  Hardness Amplification and the Approximate Degree of Constant-Depth Circuits , 2013, ICALP.

[41]  Ankit Garg,et al.  Classical Lower Bounds from Quantum Upper Bounds , 2018, 2018 IEEE 59th Annual Symposium on Foundations of Computer Science (FOCS).

[42]  Sophie Laplante,et al.  Sensitivity lower bounds from linear dependencies , 2020, Electron. Colloquium Comput. Complex..

[43]  Andris Ambainis,et al.  Quantum lower bounds by quantum arguments , 2000, STOC '00.

[44]  Justin Thaler,et al.  Dual lower bounds for approximate degree and Markov-Bernstein inequalities , 2013, Inf. Comput..

[45]  Supartha Podder,et al.  Quantum Query Complexity of Subgraph Isomorphism and Homomorphism , 2016, STACS.

[46]  Andris Ambainis,et al.  Superlinear advantage for exact quantum algorithms , 2012, STOC '13.

[47]  H. Buhrman,et al.  Complexity measures and decision tree complexity: a survey , 2002, Theor. Comput. Sci..

[48]  Noam Nisan,et al.  On the degree of boolean functions as real polynomials , 1992, STOC '92.

[49]  Ronald de Wolf,et al.  Bounds for small-error and zero-error quantum algorithms , 1999, 40th Annual Symposium on Foundations of Computer Science (Cat. No.99CB37039).

[50]  Terence Tao Structure and randomness , 2008 .

[51]  Ben Reichardt,et al.  Reflections for quantum query algorithms , 2010, SODA '11.

[52]  Charles R. Johnson,et al.  The singular values of a Hadamard product : a basic inequality , 1987 .

[53]  Avishay Tal,et al.  Quantum Implications of Huang's Sensitivity Theorem , 2020, Electron. Colloquium Comput. Complex..

[54]  Toniann Pitassi,et al.  Deterministic Communication vs. Partition Number , 2015, 2015 IEEE 56th Annual Symposium on Foundations of Computer Science.

[55]  Valerie King Lower bounds on the complexity of graph properties , 1988, STOC '88.

[56]  Toniann Pitassi,et al.  Randomized Communication versus Partition Number , 2018, ACM Trans. Comput. Theory.

[57]  Robert H. Halstead,et al.  Matrix Computations , 2011, Encyclopedia of Parallel Computing.

[58]  Troy Lee,et al.  The Quantum Adversary Method and Classical Formula Size Lower Bounds , 2005, Computational Complexity Conference.

[59]  Noam Nisan,et al.  On rank vs. communication complexity , 1994, Proceedings 35th Annual Symposium on Foundations of Computer Science.

[60]  Ronald L. Rivest,et al.  On Recognizing Graph Properties from Adjacency Matrices , 1976, Theor. Comput. Sci..

[61]  Alexander A. Sherstov,et al.  An optimal separation of randomized and Quantum query complexity , 2020, Electron. Colloquium Comput. Complex..

[62]  Hao Huang,et al.  Induced subgraphs of hypercubes and a proof of the Sensitivity Conjecture , 2019, Annals of Mathematics.

[63]  Noam Nisan,et al.  CREW PRAMS and decision trees , 1989, STOC '89.

[64]  V. M. Khrapchenko Method of determining lower bounds for the complexity of P-schemes , 1971 .