The Strahler number was originally proposed to characterize the complexity of river bifurcation and has found various applications. This article proposes computation of the Strahler number's upper and lower limits for natural language sentence tree structures, which are available in a large dataset allowing for statistical mechanics analysis. Through empirical measurements across grammatically annotated data, the Strahler number of natural language sentences is shown to be almost always 3 or 4, similar to the case of river bifurcation as reported by Strahler (1957) and Horton (1945). From the theory behind the number, we show that it is the lower limit of the amount of memory required to process sentences under a particular model. A mathematical analysis of random trees provides a further conjecture on the nature of the Strahler number, revealing that it is not a constant but grows logarithmically. This finding uncovers the statistical basics behind the Strahler number as a characteristic of a general tree structure target.
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