The growth and size of orogenic gold systems: probability and dynamical behaviour

IF 1.2 4区 地球科学 Q3 GEOSCIENCES, MULTIDISCIPLINARY
A. Ord, B. Hobbs, J. Vearncombe
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Abstract

Abstract Every nonlinear system grows by increments, and the final probability distributions for components of that system emerge from an amalgamation of these increments. The resulting probability distribution depends on the constraints imposed on each increment by the physical and chemical processes that produce the system. Hence there is the potential that the observed probability distribution can reveal information on these processes. Complex systems that grow by competition between the supply and consumption of energy and mass have growth laws that are cumulative probability distributions for their component parts that reflect such competition. We show that the type of probability distribution is characteristic of the endowment of orogenic gold deposits with the sequence: Weibull → Fréchet → gamma → log normal representative of increasing endowment. Further, the differential entropy of the probability distribution is indicative of the quality of the deposit, with low-quality deposits represented by high entropy and high-quality deposits represented by low or negative entropy. The type of probability distribution gives an indication of the processes that operated to produce the deposit. These conclusions hold for mineralisation as well as for the associated alteration assemblages. We suggest that the probability distribution for the mineralisation or the alteration assemblage gives a good indication of the endowment and quality of a deposit from a single drill hole. KEY POINTS A single drill hole from a deposit can provide information on endowment and organisation. Weibull → Fréchet → gamma → log normal probability distributions are representative of increasing gold endowment. The differential entropies of these distributions characterise the organisation of the system.
造山型金系统的生长和规模:概率和动力学行为
摘要每个非线性系统都是以增量增长的,该系统各组成部分的最终概率分布是由这些增量的合并而来的。由此产生的概率分布取决于产生系统的物理和化学过程对每个增量施加的约束。因此,观测到的概率分布有可能揭示这些过程的信息。通过能量和质量的供应和消耗之间的竞争而增长的复杂系统具有增长定律,该增长定律是反映这种竞争的其组成部分的累积概率分布。结果表明,概率分布类型是造山带金矿床禀赋的特征,其序列为:威布尔→ 弗雷切特→ γ→ 对数正态表示捐赠增加。此外,概率分布的差分熵指示沉积物的质量,低质量沉积物由高熵表示,高质量沉积物由低熵或负熵表示。概率分布的类型给出了产生沉积物的过程的指示。这些结论适用于矿化作用以及相关蚀变组合。我们认为,矿化或蚀变组合的概率分布很好地表明了单个钻孔矿床的禀赋和质量。要点矿床中的一个钻孔可以提供有关捐赠和组织的信息。威布尔→ 弗雷切特→ γ→ 对数正态概率分布代表着黄金禀赋的增加。这些分布的差异熵表征了系统的组织。
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来源期刊
Australian Journal of Earth Sciences
Australian Journal of Earth Sciences 地学-地球科学综合
CiteScore
2.80
自引率
8.30%
发文量
45
审稿时长
6-12 weeks
期刊介绍: Australian Journal of Earth Sciences publishes peer-reviewed research papers as well as significant review articles of general interest to geoscientists. The Journal covers the whole field of earth science including basin studies, regional geophysical studies and metallogeny. There is usually a thematic issue each year featuring a selection of papers on a particular area of earth science. Shorter papers are encouraged and are given priority in publication. Critical discussion of recently published papers is also encouraged.
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