Information Nonanticipative Rate Distortion Function and Its Applications

In this paper, we develop finite-time horizon causal filters using the nonanticipative rate distortion theory. We apply the developed theory to design optimal filters for time-varying multidimensional Gauss-Markov processes, subject to a mean square error fidelity constraint. We show that such filters are equivalent to the design of an optimal {encoder, channel, decoder}, which ensures that the error satisfies a fidelity constraint. Moreover, we derive a universal lower bound on the mean square error of any estimator of time-varying multidimensional Gauss-Markov processes in terms of conditional mutual information. Unlike classical Kalman filters, the filter developed is characterized by a reverse-waterfilling algorithm, which ensures that the fidelity constraint is satisfied. The theoretical results are demonstrated via illustrative examples.

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“…. Note that 1) is similar to the one derived in [15,Lemma IV.4]. Also, for 2) recall that a bounded and convex function is continuous.…”

Section: Remark 1 (Rdf and Nonanticipatory -Entropy)mentioning

confidence: 54%

“…The equivalence of the nonanticipatory -entropy, R ε 0,n (D), and NRDF, R na 0,n (D), is a direct consequence of the following equivalent characterization of conditional independence statements shown in [15].…”

Section: Remark 1 (Rdf and Nonanticipatory -Entropy)mentioning

confidence: 94%

Optimal Estimation via Nonanticipative Rate Distortion Function and Applications to Time-Varying Gauss--Markov Processes

Stavrou¹,

Charalambous²,

Charalambous³

et al. 2018

SIAM J. Control Optim.

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“…The rest of the paper will deal with (6) V. OPTIMALITY CONDITIONS In this section, we derive a necessary optimality condition for (6). The result in this section generalizes [32], [33] to conditional directed information. In the following derivation, we assume β = 1 for simplicity.…”

Section: Incorporating Temporal Logic Constraintsmentioning

confidence: 99%

Transfer Entropy in MDPs with Temporal Logic Specifications

Bharadwaj

Ahmadi

Tanaka

et al. 2018

2018 IEEE Conference on Decision and Control (CDC)

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Emerging applications in autonomy require control techniques that take into account uncertain environments, communication and sensing constraints, while satisfying highlevel mission specifications. Motivated by this need, we consider a class of Markov decision processes (MDPs), along with a transfer entropy cost function. In this context, we study highlevel mission specifications as co-safe linear temporal logic (LTL) formulae. We provide a method to synthesize a policy that minimizes the weighted sum of the transfer entropy and the probability of failure to satisfy the specification. We derive a set of coupled non-linear equations that an optimal policy must satisfy. We then use a modified Arimoto-Blahut algorithm to solve the non-linear equations. Finally, we demonstrated the proposed method on a navigation and path planning scenario of a Mars rover.

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“…Comparing Theorem III.10, 1), with the lower semicontinuity of mutual information I(X n ; Y n ) ≡ I X n ;Y n (P X n , Q Y n |X n ), it is clear that directed information requires additional assumptions for its derivation (e.g., those given in Theorem III.5). Theorem III.5 together with Theorem III.10 are important to establish existence of the optimal reproduction distribution for the nonanticipative rate distortion functions defined by (I.7) [23], [42] (by utilizing Weierstrass' Theorem) and in general extremum problems of directed information involving minimization over − → Q 0,n (·|x n ) in some subset of M C2 1 (Y 0,n ). This is formally stated in the next theorem.…”

Section: E Lower Semicontinuity Of Directed Informationmentioning

confidence: 99%

“…Generalized Information Nonanticipative or Sequential RDF. Consider the extremum problem of general information nonanticipative RDF, or sequential RDF [7], which is a variant of classical RDF [41], defined by [23], [42] R na (D) = lim sup n→∞ inf P Y i |Y i−1 ,X i , i=0,1,...,n ∈Q 0,n (D) 1 n + 1 I(X n → Y n ), (I. 7) where Q 0,n (D) is the fidelity constraint set defined by Q 0,n (D) = Q Y i |Y i−1 ,X i , i = 0, 1, .…”

Section: Introductionmentioning

confidence: 99%

Directed Information on Abstract Spaces: Properties and Variational Equalities

Charalambous

Stavrou

2016

IEEE Trans. Inform. Theory

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Directed information or its variants are utilized extensively in the characterization of the capacity of channels with memory and feedback, nonanticipative lossy data compression, and their generalizations to networks.In this paper, we derive several functional and topological properties of directed information for general abstract alphabets (complete separable metric spaces) using the topology of weak convergence of probability measures. These include convexity of the set of consistent distributions, which uniquely define causally conditioned distributions, convexity and concavity of directed information with respect to the sets of consistent distributions, weak compactness of these sets of distributions, their joint distributions and their marginals. Furthermore, we show lower semicontinuity of directed information, and under certain conditions we also establish continuity of directed information. Finally, we derive variational equalities for directed information, including sequential versions. These may be viewed as the analogue of the variational equalities of mutual information (utilized in Blahut-Arimoto algorithm).In summary, we extend the basic functional and topological properties of mutual information to directed information. These properties are discussed in the context of extremum problems of directed information.

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Information Nonanticipative Rate Distortion Function and Its Applications

Cited by 13 publications

References 37 publications

Optimal Estimation via Nonanticipative Rate Distortion Function and Applications to Time-Varying Gauss--Markov Processes

Optimal Estimation via Nonanticipative Rate Distortion Function and Applications to Time-Varying Gauss--Markov Processes

Transfer Entropy in MDPs with Temporal Logic Specifications

Directed Information on Abstract Spaces: Properties and Variational Equalities

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