Application to interface with the BMW IBus interface. Software will first act as a media player, and I'm open to any other suggestions. This will likely only be useful to those who have a BMW car with an Ibus interface. Unlike much of the proposed Ibus interface cables and circuits with external pullup resistors on the Internet, our cable is recognized as a real serial port and connection to your BMW is running by a special IBUS microchip TH3122, which is important for quality iBUS communication. Bmw ibus interface program software.

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All of the subsequent Shannon information-theoretic quantities we consider may be written as sums and differences of the aforementioned marginal and joint entropies, and all may be extended to multivariate ( X, Y, etc.) and/or continuous variables. The basic information-theoretic quantities: entropy, joint entropy, conditional entropy, mutual information (MI), conditional mutual information (; ), and multi-information (); are discussed in detail in Section S.1.1 in Supplementary Material, and summarized here in Table. All of these measures are non-negative. Also, we may write down pointwise or local information-theoretic measures, which characterize the information attributed with specific measurements x, y, and z of variables X, Y, and Z (), rather than the traditional expected or average information measures associated with these variables introduced above. Full details are provided in Section S.1.3 in Supplementary Material, and the local form for all of our basic measures is shown here in Table. For example, the Shannon information content or local entropy of an outcome x of measurement of the variable X is (; ).

The goal of the framework is to decompose the information in the next observation X n +1 of process X in terms of these information sources. The transfer entropy, arguably the most important measure in the toolkit, has become a very popular tool in complex systems in general, e.g., (;,;;;; ), and in computational neuroscience, in particular, e.g., (;;;; ). For multivariate Gaussians, the TE is equivalent (up to a factor of 2) to the Granger causality ().

Extension of the TE to arbitrary source-destination lags is described by and incorporated in Table (this is not shown for conditional TE here for simplicity, but is handled in JIDT). Further, one can consider multivariate sources Y, in which case we refer to the measure T Y → X( k, l) as a collective transfer entropy (). See further description of this measure at Section S.1.2 in Supplementary Material, including regarding how to set the history length k. Table also shows the local variants of each of the above measures of information dynamics (presented in full in Section S.1.3 in Supplementary Material). The use of these local variants is particularly important here because they provide a direct, model-free mechanism to analyze the dynamics of how information processing unfolds in time in complex systems. Figure indicates, for example, a local active information storage measurement for time-series process X, and a local transfer entropy measurement from process Y to X.