Title :
On the Sum of L1 Influences
Author :
Backurs, Arturs ; Bavarian, Mohammad
Author_Institution :
Massachusetts Inst. of Technol., Cambridge, MA, USA
Abstract :
For a function f over the discrete cube, the total L1 influence of f is defined as the sum of the L1 norm of the discrete derivatives of f in all n directions. In this work, we show that in the case of bounded functions this quantity can be upper bounded by a polynomial in the degree of f (independently of dimension n), resolving affirmatively an open problem of Aaronson and Ambainis (ITCS 2011). We also give an application of our theorem to graph theory, and discuss the connection between the study of bounded functions over the cube and the quantum query complexity of partial functions where Aaronson and Ambainis encountered this question.
Keywords :
computational complexity; graph theory; quantum computing; L1 norm; bounded functions; discrete cube; discrete derivatives; graph theory; partial functions; polynomial; quantum query complexity; upper bound; Boolean functions; Chebyshev approximation; Complexity theory; Graph theory; Hypercubes; Polynomials; Analysis of Boolean function; influence of a variable;
Conference_Titel :
Computational Complexity (CCC), 2014 IEEE 29th Conference on
Conference_Location :
Vancouver, BC
DOI :
10.1109/CCC.2014.21
