Stochasticity in Algorithmic Statistics for Polynomial Time

N. Vereshchagin; A. Milovanov

doi:10.4230/LIPIcs.CCC.2017.17

Publications

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Stochasticity in Algorithmic Statistics for Polynomial Time

P. 1–18.

Vereshchagin N., Milovanov A.

A fundamental notion in Algorithmic Statisticsis that of a stochastic object, i.e., an object having a simple plausible explanation. Informally, a probability distribution is a plausible explanation for x if it looks likely that x was drawn at random with respect to that distribution. In this paper, we suggest three definitions of a plausible statistical hypothesis for Algorithmic Statistics with polynomial time bounds, which are called acceptability, plausibility and optimality. Roughly speaking, a probability distribution μ is called an acceptable explanation for x, if x possesses all properties decidable by short programs in a short time and shared by almost all objects (with respect to μ). Plausibility is a similar notion, however this time we require x to possess all properties T decidable even by long programs in a short time and shared by almost all objects. To compensate the increase in program length, we strengthen the notion of ‘almost all’—the longer the program recognizing the property is, the more objects must share the property. Finally, a probability distribution μ is poly called an optimal explanation for x if μ(x) is large (close to 2 − C (x) ). Almost all our results hold under some plausible complexity theoretic assumptions. Our main result states that for acceptability and plausibility there are infinitely many non-stochastic objects, i.e. objects that do not have simple plausible (acceptable) explanations. We explain why we need assumptions—our main result implies that P 6 = PSPACE. In the proof of that result, we use the notion of an elusive set, which is interesting in its own right. Using elusive sets, we show that the distinguishing complexity of a string x can be super-logarithmically less than the conditional com- plexity of x with condition r for almost all r (for polynomial time bounded programs). Such a gap was known before, however only in the case when both complexities are conditional, or both complexities are unconditional. It follows from the definition that plausibility implies acceptability and optimality. We show that there are objects that have simple acceptable but implausible and non-optimal explanations. We prove that for strings whose distinguishing complexity is close to Kolmogorov complexity (with polynomial time bounds) plausibility is equivalent to optimality for all simple distributions, which fact c

Keywords: Kolmogorov complexity stochasticity

Publication based on the results of:

Теоретическая информатика (2017)

In book

32nd Computational Complexity Conference

O'Donnell R. Вадерн: Schloss Dagstuhl – Leibniz-Zentrum für Informatik, Dagstuhl Publishing, 2017.

О базовых математических определениях цифровых технологий и искусственного интеллекта

Semenov A., Доклады Российской академии наук. Математика, информатика, процессы управления (ранее - Доклады Академии Наук. Математика) 2025 Т. 527 № S С. 7–12

The paper proposes a system of definitions for the basic concepts of computability theory that underlie the mathematics of the digital world: algorithm, computability, calculus, object complexity, close to modern undertnding. Hierarchies of the finite and the problem of consistency are considered. ...

Added: December 6, 2025

Kolmogorov’s Last Discovery? (Kolmogorov and Algorithmic Statistics)

Semenov A., Shen A., Vereshchagin N., Theory of Probability and its Applications, USA 2024 Vol. 68 No. 4 P. 582–606

The definition of descriptional complexity of finite objects suggested by Kolmogorov and other authors in the mid-1960s is now well known. In addition, Kolmogorov pointed out some approaches to a more fine-grained classification of finite objects, such as the resource-bounded complexity (1965), structure function (1974), and the notion of $(\alpha,\beta)$-stochasticity (1981). Later it turned out ...

Added: January 16, 2025

On information content in certain objects

Vereshchagin N., / Series arXiv "math". 2024.

The fine approach to measure information dependence is based on the total conditional complexity CT(y|x), which is defined as the minimal length of a total program that outputs y on the input x. It is known that the total conditional complexity can be much larger than than the plain conditional complexity. Such strings x, y ...

Added: August 19, 2024

Universal almost optimal compression and Slepian-Wolf coding in probabilistic polynomial time

Bauwens B. F., Zimand M., Journal of the ACM 2023 Vol. 70 No. 2 Article 9

In a lossless compression system with target lengths, a compressor 𝒞 maps an integer m and a binary string x to an m-bit code p, and if m is sufficiently large, a decompressor 𝒟 reconstructs x from p. We call a pair (m,x) achievable for (𝒞,𝒟) if this reconstruction is successful. We introduce the notion ...

Added: March 22, 2023

Inequalities for space-bounded Kolmogorov complexity

Bauwens B. F., Gács P., Romashchenko A. et al., Computability 2022 Vol. 11 No. 3-4 P. 165–185

Finding all linear inequalities for entropies remains an important open question in information theory. For a long time the only known inequalities for entropies of tuples of random variables were Shannon (submodularity) inequalities. Only in 1998 Zhang and Yeung 1998 found the first inequality that cannot be represented as a convex combination of Shannon inequalities, and ...

Added: December 23, 2022

Information disclosure in the framework of kolmogorov complexity

Vereshchagin N., Theoretical Computer Science 2023 Vol. 940 P. 108–122

We consider the network consisting of three nodes 1, 2, 3 connected by two open channels 1 → 2 and 1 → 3. The information present in the node 1 consists of four strings x , y , z , w. The nodes 2, 3 know x , w and need to know y , z, respectively. ...

Added: December 19, 2022

Stochastic model of memristor based on the length of conductive region

Agudov N. V., Dubkov A. A., Safonov A. V. et al., Chaos, Solitons and Fractals 2021 Vol. 150 Article 111131

We propose a stochastic model of a voltage controlled bipolar memristive system, which includes the properties of widely used dynamic SPICE models and takes into account the fluctuations inherent in memristors. The proposed model is described by rather simple equations of Brownian diffusion, does not require significant computational resources for numerical modeling, and allows obtaining the exact analytical solutions ...

Added: December 14, 2022

Predictions and Algorithmic Statistics for Infinite Sequences

Milovanov A., , in: Computer Science – Theory and Applications: 16th International Computer Science Symposium in Russia, CSR 2021, Sochi, Russia, June 28–July 2, 2021, Proceedings.: Springer, 2021. Ch. 17 P. 283–295.

We combine Solomonoff’s approach to universal prediction with algorithmic statistics and suggest to use the computable measure that provides the best “explanation” for the observed data (in the sense of algorithmic statistics) for prediction. In this way we keep the expected sum of squares of prediction errors bounded (as it was for the Solomonoff’s predictor) ...

Added: August 11, 2021

The normalized algorithmic information distance can not be approximated

Bauwens B. F., Blinnikov I., , in: Computer Science – Theory and Applications 15th International Computer Science Symposium in Russia, CSR 2020, Yekaterinburg, Russia, June 29 – July 3, 2020, ProceedingsVol. 12159.: Springer, 2020. P. 130–141.

It is known that the normalized algorithmic information distance is not computable and not semicomputable. We show that for all 𝜀<1/2, there exist no semicomputable functions that differ from N by at most 𝜀. Moreover, for any computable function f such that |lim𝑡𝑓(𝑥,𝑦,𝑡)−N(𝑥,𝑦)|≤𝜀 and for all n, there exist strings x, y of length n such that ...

Added: February 5, 2021

Information Distance Revisited

Bauwens B. F., , in: 37th International Symposium on Theoretical Aspects of Computer Science (STACS 2020)Vol. 154: Leibniz International Proceedings in Informatics (LIPIcs).: Schloss Dagstuhl--Leibniz-Zentrum fuer Informatik, 2020. P. 46:1–46:14.

Added: March 20, 2020

Descriptive complexity of computable sequences revisited

Vereshchagin N., Theoretical Computer Science 2020 Vol. 809 P. 531–537

The purpose of this paper is to answer two questions left open in [B. Durand, A. Shen, and N. Vereshchagin, Descriptive Complexity of Computable Sequences, Theoretical Computer Science 171 (2001), pp. 47--58]. Namely, we consider the following two complexities of an infinite computable 0-1-sequence $\alpha$: $C^{0'}(\alpha )$, defined as ...

Added: January 17, 2020

Algorithmic Statistics: Forty Years Later.

Shen A., Vereshchagin N., , in: Computability and Complexity.: Berlin: Springer, 2017. P. 669–737.

Algorithmic statistics has two different (and almost orthogonal) motivations. From the philosophical point of view, it tries to formalize how the statistics works and why some statistical models are better than others. After this notion of a "good model" is introduced, a natural question arises: it is possible that for some piece of data there ...

Added: October 26, 2018

On Algorithmic Statistics for Space-bounded Algorithms

Milovanov A., Theory of Computing Systems 2019 Vol. 63 No. 4 P. 833–848

Algorithmic statistics looks for models of observed data that are good in the following sense: a model is simple (i.e., has small Kolmogorov complexity) and captures all the algorithmically discoverable regularities in the data. However, this idea can not be used in practice as is because Kolmogorov complexity is not computable. In this paper we ...

Added: October 17, 2018

Plain stopping time and conditional complexities revisited

Posobin G. I., Shen A., Andreev M., , in: 43rd International Symposium on Mathematical Foundations of Computer Science (MFCS 2018)Vol. 117.: Schloss Dagstuhl--Leibniz-Zentrum fuer Informatik, 2018. P. 1–24.

In this paper we analyze the notion of "stopping time complexity", informally defined as the amount of information needed to specify when to stop while reading an infinite sequence. This notion was introduced by Vovk and Pavlovic (2016). It turns out that plain stopping time complexity of a binary string x could be equivalently defined as (a) ...

Added: October 11, 2018

A Structural Lemma for Deterministic Context-Free Languages

Rubtsov A. A., , in: Developments in Language Theory 22nd International Conference, DLT 2018, Tokyo, Japan, September 10-14, 2018, Proceedings.: Cham: Springer, 2018. P. 553–565.

We present a new structural lemma for deterministic con- text free languages. From the first sight, it looks like a pumping lemma, because it is also based on iteration properties, but it has significant distinctions that makes it much easier to apply. The structural lemma is a combinatorial analogue of KC-DCF-Lemma (based on Kolmogorov complexity), ...

Added: September 12, 2018

Algorithmic Statistics and Prediction for Polynomial Time-Bounded Algorithms

Milovanov A., , in: Sailing Routes in the World of Computation.: Springer, 2018. P. 287–296.

Algorithmic statistics studies explanations of observed data that are good in the algorithmic sense: an explanation should be simple i.e. should have small Kolmogorov complexity and capture all the algorithmically discoverable regularities in the data. However this idea can not be used in practice as is because Kolmogorov complexity is not computable. In recent years resource-bounded ...

Added: September 4, 2018

On Algorithmic Statistics for Space-Bounded Algorithms

Milovanov A., , in: Computer Science – Theory and Applications: 12th International Computer Science Symposium in Russia (CSR 2017)Vol. 10304.: Luxemburg: Springer, 2017. P. 232–244.

Algorithmic statistics studies explanations of observed data that are good in the algorithmic sense: an explanation should be simple i.e. should have small Kolmogorov complexity and capture all the algorithmically discoverable regularities in the data. However this idea can not be used in practice because Kolmogorov complexity is not computable. In this paper we develop algorithmic ...

Added: October 15, 2017

Kolmogorov complexity and algorithmic randomness

Shen A., Uspensky V. A., Vereshchagin N., American Mathematical Society, 2017.

Added: October 12, 2017

Short lists with short programs in short time

Vereshchagin N., Bauwens B. F., Makhlin A. et al., Computational Complexity 2018 Vol. 27 No. 1 P. 31–61

Given a machine $U$, a $c$-short program for $x$ is a string $p$ such that $U(p)=x$ and the length of $p$ is bounded by $c$ + (the length of a shortest program for $x$). We show that for any universal machine, it is possible to compute in polynomial time on input $x$ a list of ...

Added: April 22, 2017

Stochasticity in Algorithmic Statistics for Polynomial Time

Vereshchagin N., Milovanov A., / Series Technical report "Electronic Colloquium on Computational Complexity". 2017. No. TR17-043.

Added: March 7, 2017

Algorithmic Statistics: Forty Years Later.

Vereshchagin N., Shen A., Lecture Notes in Computer Science 2017 Vol. 10010 P. 669–737

Added: February 13, 2017

Generic algorithms for halting problem and optimal machines revisited

Bienvenu L., Desfontaines D., Shen A., Logical Methods in Computer Science 2016 Vol. 12 No. 2

The halting problem is undecidable --- but can it be solved for "most" inputs? This natural question was considered in a number of papers, in different settings. We revisit their results and show that most of them can be easily proven in a natural framework of optimal machines (considered in algorithmic information theory) using the ...

Added: February 7, 2017