Randomized Query Complexity of Sabotaged and Composed Functions

We study the composition question for bounded-error randomized query complexity: Is R(f circ g) = Omega(R(f)R(g))? We show that inserting a simple function h, whose query complexity is onlyTheta(log R(g)), in between f and g allows us to prove R(f circ h circ g) = Omega(R(f)R(h)R(g)). We prove this using a new lower bound measure for randomized query complexity we call randomized sabotage complexity, RS(f). Randomized sabotage complexity has several desirable properties, such as a perfect composition theorem, RS(f circ g) >= RS(f) RS(g), and a composition theorem with randomized query complexity, R(f circ g) = Omega(R(f) RS(g)). It is also a quadratically tight lower bound for total functions and can be quadratically superior to the partition bound, the best known general lower bound for randomized query complexity. Using this technique we also show implications for lifting theorems in communication complexity. We show that a general lifting theorem from zero-error randomized query to communication complexity implies a similar result for bounded-error algorithms for all total functions.

[1]  Nisheeth K. Vishnoi,et al.  A quadratically tight partition bound for classical communication complexity and query complexity , 2014, ArXiv.

[2]  Troy Lee,et al.  Separations in Communication Complexity Using Cheat Sheets and Information Complexity , 2016, 2016 IEEE 57th Annual Symposium on Foundations of Computer Science (FOCS).

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

[4]  Nikolai K. Vereshchagin Randomized Boolean Decision Trees: Several Remarks , 1998, Theor. Comput. Sci..

[5]  Troy Lee,et al.  Quantum Query Complexity of State Conversion , 2010, 2011 IEEE 52nd Annual Symposium on Foundations of Computer Science.

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

[7]  Moni Naor,et al.  Amortized Communication Complexity , 1995, SIAM J. Comput..

[8]  Toniann Pitassi,et al.  Randomized Communication vs. Partition Number , 2015, Electron. Colloquium Comput. Complex..

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

[10]  SaksMichael,et al.  Composition limits and separating examples for some boolean function complexity measures , 2016 .

[11]  Robin Kothari Nearly optimal separations between communication (or query) complexity and partitions , 2015, Computational Complexity Conference.

[12]  John Watrous,et al.  The Theory of Quantum Information , 2018 .

[13]  Xi Chen,et al.  How to compress interactive communication , 2010, STOC '10.

[14]  Andrew Drucker,et al.  Improved direct product theorems for randomized query complexity , 2010, computational complexity.

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

[16]  Ran Raz,et al.  Super-logarithmic depth lower bounds via the direct sum in communication complexity , 1995, computational complexity.

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

[18]  Hartmut Klauck,et al.  Optimal Direct Sum Results for Deterministic and Randomized Decision Tree Complexity , 2010, Inf. Process. Lett..

[19]  Ran Raz,et al.  Super-logarithmic depth lower bounds via direct sum in communication complexity , 1991, [1991] Proceedings of the Sixth Annual Structure in Complexity Theory Conference.

[20]  Scott Aaronson Quantum certificate complexity , 2008, J. Comput. Syst. Sci..

[21]  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).

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

[23]  Hartmut Klauck,et al.  The Partition Bound for Classical Communication Complexity and Query Complexity , 2009, 2010 IEEE 25th Annual Conference on Computational Complexity.

[24]  Shelby Kimmel Quantum Adversary (Upper) Bound , 2013, Chic. J. Theor. Comput. Sci..

[25]  Ashley Montanaro A composition theorem for decision tree complexity , 2015, Chicago J. Theor. Comput. Sci..

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

[27]  Ran Raz,et al.  A parallel repetition theorem , 1995, STOC '95.

[28]  M. Sion On general minimax theorems , 1958 .

[29]  D. Pankratov Direct Sum Questions in Classical Communication Complexity , 2012 .

[30]  Troy Lee,et al.  Negative weights make adversaries stronger , 2007, STOC '07.