Abstract-Following the discovery of a fundamental connection between information measures and estimation measures in Gaussian channels, this paper explores the counterpart of those results in Poisson channels. In the continuous-time setting, the received signal is a doubly stochastic Poisson point process whose rate is equal to the input signal plus a dark current. It is found that, regardless of the statistics of the input, the derivative of the input-output mutual information with respect to the intensity of the additive dark current can be expressed as the expected difference between the logarithm of the input and the logarithm of its noncausal conditional mean estimate. The same holds for the derivative with respect to input scaling, bu...
Let a message m = {m(t)} be a Gaussian process. We consider the transmission of m over a white Gauss...
This paper characterizes the rate distortion function of a Poisson process with a queuing distortion...
Abstract — Consider arbitrarily distributed input signals observed in additive Gaussian noise. A new...
In recent years, infinite-dimensional methods have been introduced for the Gaussian channels estimat...
Abstract—Identities yielding optimal estimation interpretations for mutual information and relative ...
170 pagesWe study the following three information-theoretic problems using tools derived from stocha...
International audienceThis paper studies the continuous-time Poisson channel whose dark current is r...
Abstract—The notion of directed information is intro-duced for stochastic processes in continuous ti...
Abstract—Many of the classical and recent relations between in-formation and estimation in the prese...
A relationship between information theory and estimation theory was recently shown for the Gaussian ...
Fisher information plays a fundamental role in the analysis of Gaussian noise channels and in the st...
Abstract—Many of the classical and recent relations between information and estimation in the presen...
This paper considers a general linear vector Gaussian channel with arbitrary signaling and pursues t...
This paper presents a proof of the rate distortion function of a Poisson process with a queuing dist...
The conditional intensity (CI) of a counting process $Y_t$ is based on the minimal knowledge $\mathc...
Let a message m = {m(t)} be a Gaussian process. We consider the transmission of m over a white Gauss...
This paper characterizes the rate distortion function of a Poisson process with a queuing distortion...
Abstract — Consider arbitrarily distributed input signals observed in additive Gaussian noise. A new...
In recent years, infinite-dimensional methods have been introduced for the Gaussian channels estimat...
Abstract—Identities yielding optimal estimation interpretations for mutual information and relative ...
170 pagesWe study the following three information-theoretic problems using tools derived from stocha...
International audienceThis paper studies the continuous-time Poisson channel whose dark current is r...
Abstract—The notion of directed information is intro-duced for stochastic processes in continuous ti...
Abstract—Many of the classical and recent relations between in-formation and estimation in the prese...
A relationship between information theory and estimation theory was recently shown for the Gaussian ...
Fisher information plays a fundamental role in the analysis of Gaussian noise channels and in the st...
Abstract—Many of the classical and recent relations between information and estimation in the presen...
This paper considers a general linear vector Gaussian channel with arbitrary signaling and pursues t...
This paper presents a proof of the rate distortion function of a Poisson process with a queuing dist...
The conditional intensity (CI) of a counting process $Y_t$ is based on the minimal knowledge $\mathc...
Let a message m = {m(t)} be a Gaussian process. We consider the transmission of m over a white Gauss...
This paper characterizes the rate distortion function of a Poisson process with a queuing distortion...
Abstract — Consider arbitrarily distributed input signals observed in additive Gaussian noise. A new...