Decision tree model

(Redirected from Algebraic decision tree)

In computational complexity theory, the decision tree model is the model of computation in which an algorithm can be considered to be a decision tree, i.e. a sequence of queries or tests that are done adaptively, so the outcome of previous tests can influence the tests performed next.

Decision Tree Model

Typically, these tests have a small number of outcomes (such as a yes–no question) and can be performed quickly (say, with unit computational cost), so the worst-case time complexity of an algorithm in the decision tree model corresponds to the depth of the corresponding tree. This notion of computational complexity of a problem or an algorithm in the decision tree model is called its decision tree complexity or query complexity.

Decision tree models are instrumental in establishing lower bounds for the complexity of certain classes of computational problems and algorithms. Several variants of decision tree models have been introduced, depending on the computational model and type of query algorithms are allowed to perform.

For example, a decision tree argument is used to show that a comparison sort of items must make comparisons. For comparison sorts, a query is a comparison of two items , with two outcomes (assuming no items are equal): either or . Comparison sorts can be expressed as decision trees in this model, since such sorting algorithms only perform these types of queries.

Comparison trees and lower bounds for sorting

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Decision trees are often employed to understand algorithms for sorting and other similar problems; this was first done by Ford and Johnson.[1]

For example, many sorting algorithms are comparison sorts, which means that they only gain information about an input sequence   via local comparisons: testing whether  ,  , or  . Assuming that the items to be sorted are all distinct and comparable, this can be rephrased as a yes-or-no question: is  ?

These algorithms can be modeled as binary decision trees, where the queries are comparisons: an internal node corresponds to a query, and the node's children correspond to the next query when the answer to the question is yes or no. For leaf nodes, the output corresponds to a permutation   that describes how the input sequence was scrambled from the fully ordered list of items. (The inverse of this permutation,  , re-orders the input sequence.)

One can show that comparison sorts must use   comparisons through a simple argument: for an algorithm to be correct, it must be able to output every possible permutation of   elements; otherwise, the algorithm would fail for that particular permutation as input. So, its corresponding decision tree must have at least as many leaves as permutations:   leaves. Any binary tree with at least   leaves has depth at least  , so this is a lower bound on the run time of a comparison sorting algorithm. In this case, the existence of numerous comparison-sorting algorithms having this time complexity, such as mergesort and heapsort, demonstrates that the bound is tight.[2]: 91 

This argument does not use anything about the type of query, so it in fact proves a lower bound for any sorting algorithm that can be modeled as a binary decision tree. In essence, this is a rephrasing of the information-theoretic argument that a correct sorting algorithm must learn at least   bits of information about the input sequence. As a result, this also works for randomized decision trees as well.

Other decision tree lower bounds do use that the query is a comparison. For example, consider the task of only using comparisons to find the smallest number among   numbers. Before the smallest number can be determined, every number except the smallest must "lose" (compare greater) in at least one comparison. So, it takes at least   comparisons to find the minimum. (The information-theoretic argument here only gives a lower bound of  .) A similar argument works for general lower bounds for computing order statistics.[2]: 214 

Linear and algebraic decision trees

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Linear decision trees generalize the above comparison decision trees to computing functions that take real vectors   as input. The tests in linear decision trees are linear functions: for a particular choice of real numbers  , output the sign of  . (Algorithms in this model can only depend on the sign of the output.) Comparison trees are linear decision trees, because the comparison between   and   corresponds to the linear function  . From its definition, linear decision trees can only specify functions   whose fibers can be constructed by taking unions and intersections of half-spaces.

Algebraic decision trees are a generalization of linear decision trees that allow the test functions to be polynomials of degree  . Geometrically, the space is divided into semi-algebraic sets (a generalization of hyperplane).

These decision tree models, defined by Rabin[3] and Reingold,[4] are often used for proving lower bounds in computational geometry.[5] For example, Ben-Or showed that element uniqueness (the task of computing  , where   is 0 if and only if there exist distinct coordinates   such that  ) requires an algebraic decision tree of depth  .[6] This was first showed for linear decision models by Dobkin and Lipton.[7] They also show a   lower bound for linear decision trees on the knapsack problem, generalized to algebraic decision trees by Steele and Yao.[8]

Boolean decision tree complexities

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For Boolean decision trees, the task is to compute the value of an n-bit Boolean function   for an input  . The queries correspond to reading a bit of the input,  , and the output is  . Each query may be dependent on previous queries. There are many types of computational models using decision trees that could be considered, admitting multiple complexity notions, called complexity measures.

Deterministic decision tree

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If the output of a decision tree is  , for all  , the decision tree is said to "compute"  . The depth of a tree is the maximum number of queries that can happen before a leaf is reached and a result obtained.  , the deterministic decision tree complexity of   is the smallest depth among all deterministic decision trees that compute  .

Randomized decision tree

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One way to define a randomized decision tree is to add additional nodes to the tree, each controlled by a probability  . Another equivalent definition is to define it as a distribution over deterministic decision trees. Based on this second definition, the complexity of the randomized tree is defined as the largest depth among all the trees in the support of the underlying distribution.   is defined as the complexity of the lowest-depth randomized decision tree whose result is   with probability at least   for all   (i.e., with bounded 2-sided error).

  is known as the Monte Carlo randomized decision-tree complexity, because the result is allowed to be incorrect with bounded two-sided error. The Las Vegas decision-tree complexity   measures the expected depth of a decision tree that must be correct (i.e., has zero-error). There is also a one-sided bounded-error version which is denoted by  .

Nondeterministic decision tree

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The nondeterministic decision tree complexity of a function is known more commonly as the certificate complexity of that function. It measures the number of input bits that a nondeterministic algorithm would need to look at in order to evaluate the function with certainty.

Formally, the certificate complexity of   at   is the size of the smallest subset of indices   such that, for all  , if   for all  , then  . The certificate complexity of   is the maximum certificate complexity over all  . The analogous notion where one only requires the verifier to be correct with 2/3 probability is denoted  .

Quantum decision tree

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The quantum decision tree complexity   is the depth of the lowest-depth quantum decision tree that gives the result   with probability at least   for all  . Another quantity,  , is defined as the depth of the lowest-depth quantum decision tree that gives the result   with probability 1 in all cases (i.e. computes   exactly).   and   are more commonly known as quantum query complexities, because the direct definition of a quantum decision tree is more complicated than in the classical case. Similar to the randomized case, we define   and  .

These notions are typically bounded by the notions of degree and approximate degree. The degree of  , denoted  , is the smallest degree of any polynomial   satisfying   for all  . The approximate degree of  , denoted  , is the smallest degree of any polynomial   satisfying   whenever   and   whenever  .

Beals et al. established that   and  .[9]

Relationships between Boolean function complexity measures

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It follows immediately from the definitions that for all  -bit Boolean functions  , , and  . Finding the best upper bounds in the converse direction is a major goal in the field of query complexity.

All of these types of query complexity are polynomially related. Blum and Impagliazzo,[10] Hartmanis and Hemachandra,[11] and Tardos[12] independently discovered that  . Noam Nisan found that the Monte Carlo randomized decision tree complexity is also polynomially related to deterministic decision tree complexity:  .[13] (Nisan also showed that  .) A tighter relationship is known between the Monte Carlo and Las Vegas models:  .[14] This relationship is optimal up to polylogarithmic factors.[15] As for quantum decision tree complexities,  , and this bound is tight.[16][15] Midrijanis showed that  ,[17][18] improving a quartic bound due to Beals et al.[9]

It is important to note that these polynomial relationships are valid only for total Boolean functions. For partial Boolean functions, that have a domain a subset of  , an exponential separation between   and   is possible; the first example of such a problem was discovered by Deutsch and Jozsa.

Sensitivity conjecture

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For a Boolean function  , the sensitivity of   is defined to be the maximum sensitivity of   over all  , where the sensitivity of   at   is the number of single-bit changes in   that change the value of  . Sensitivity is related to the notion of total influence from the analysis of Boolean functions, which is equal to average sensitivity over all  .

The sensitivity conjecture is the conjecture that sensitivity is polynomially related to query complexity; that is, there exists exponent   such that, for all  ,   and  . One can show through a simple argument that  , so the conjecture is specifically concerned about finding a lower bound for sensitivity. Since all of the previously-discussed complexity measures are polynomially related, the precise type of complexity measure is not relevant. However, this is typically phrased as the question of relating sensitivity with block sensitivity.

The block sensitivity of  , denoted  , is defined to be the maximum block sensitivity of   over all  . The block sensitivity of   at   is the maximum number   of disjoint subsets   such that, for any of the subsets  , flipping the bits of   corresponding to   changes the value of  .[13]

In 2019, Hao Huang proved the sensitivity conjecture, showing that  .[19][20]

See also

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References

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  1. ^ Ford, Lester R. Jr.; Johnson, Selmer M. (1959-05-01). "A Tournament Problem". The American Mathematical Monthly. 66 (5): 387–389. doi:10.1080/00029890.1959.11989306. ISSN 0002-9890.
  2. ^ a b Introduction to algorithms. Cormen, Thomas H. (Third ed.). Cambridge, Mass.: MIT Press. 2009. ISBN 978-0-262-27083-0. OCLC 676697295.{{cite book}}: CS1 maint: others (link)
  3. ^ Rabin, Michael O. (1972-12-01). "Proving simultaneous positivity of linear forms". Journal of Computer and System Sciences. 6 (6): 639–650. doi:10.1016/S0022-0000(72)80034-5. ISSN 0022-0000.
  4. ^ Reingold, Edward M. (1972-10-01). "On the Optimality of Some Set Algorithms". Journal of the ACM. 19 (4): 649–659. doi:10.1145/321724.321730. ISSN 0004-5411. S2CID 18605212.
  5. ^ Preparata, Franco P. (1985). Computational geometry : an introduction. Shamos, Michael Ian. New York: Springer-Verlag. ISBN 0-387-96131-3. OCLC 11970840.
  6. ^ Ben-Or, Michael (1983-12-01). "Lower bounds for algebraic computation trees". Proceedings of the fifteenth annual ACM symposium on Theory of computing - STOC '83. New York, NY, USA: Association for Computing Machinery. pp. 80–86. doi:10.1145/800061.808735. ISBN 978-0-89791-099-6. S2CID 1499957.
  7. ^ Dobkin, David; Lipton, Richard J. (1976-06-01). "Multidimensional Searching Problems". SIAM Journal on Computing. 5 (2): 181–186. doi:10.1137/0205015. ISSN 0097-5397.
  8. ^ Michael Steele, J; Yao, Andrew C (1982-03-01). "Lower bounds for algebraic decision trees". Journal of Algorithms. 3 (1): 1–8. doi:10.1016/0196-6774(82)90002-5. ISSN 0196-6774.
  9. ^ a b Beals, R.; Buhrman, H.; Cleve, R.; Mosca, M.; de Wolf, R. (2001). "Quantum lower bounds by polynomials". Journal of the ACM. 48 (4): 778–797. arXiv:quant-ph/9802049. doi:10.1145/502090.502097. S2CID 1078168.
  10. ^ Blum, M.; Impagliazzo, R. (1987). "Generic oracles and oracle classes". Proceedings of 18th IEEE FOCS. pp. 118–126.
  11. ^ Hartmanis, J.; Hemachandra, L. (1987), "One-way functions, robustness, and non-isomorphism of NP-complete sets", Technical Report DCS TR86-796, Cornell University
  12. ^ Tardos, G. (1989). "Query complexity, or why is it difficult to separate NPA ∩ coNPA from PA by random oracles A?". Combinatorica. 9 (4): 385–392. doi:10.1007/BF02125350. S2CID 45372592.
  13. ^ a b Nisan, N. (1989). "CREW PRAMs and decision trees". Proceedings of 21st ACM STOC. pp. 327–335.
  14. ^ Kulkarni, R. and Tal, A. On Fractional Block Sensitivity. Electronic Colloquium on Computational Complexity (ECCC). Vol. 20. 2013.
  15. ^ a b Ambainis, Andris; Balodis, Kaspars; Belovs, Aleksandrs; Lee, Troy; Santha, Miklos; Smotrovs, Juris (2017-09-04). "Separations in Query Complexity Based on Pointer Functions". Journal of the ACM. 64 (5): 32:1–32:24. arXiv:1506.04719. doi:10.1145/3106234. ISSN 0004-5411. S2CID 10214557.
  16. ^ Aaronson, Scott; Ben-David, Shalev; Kothari, Robin; Rao, Shravas; Tal, Avishay (2020-10-23). "Degree vs. Approximate Degree and Quantum Implications of Huang's Sensitivity Theorem". arXiv:2010.12629 [quant-ph].
  17. ^ Midrijanis, Gatis (2004), "Exact quantum query complexity for total Boolean functions", arXiv:quant-ph/0403168
  18. ^ Midrijanis, Gatis (2005), "On Randomized and Quantum Query Complexities", arXiv:quant-ph/0501142
  19. ^ Huang, Hao (2019). "Induced subgraphs of hypercubes and a proof of the Sensitivity Conjecture". Annals of Mathematics. 190 (3): 949–955. arXiv:1907.00847. doi:10.4007/annals.2019.190.3.6. ISSN 0003-486X. JSTOR 10.4007/annals.2019.190.3.6. S2CID 195767594.
  20. ^ Klarreich, Erica (25 July 2019). "Decades-Old Computer Science Conjecture Solved in Two Pages". Quanta Magazine. Retrieved 2019-07-26.

Surveys

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