## Abstract

It is now time to summarize the copious results that game theory yields when superior beings confront ordinary beings in games (see Appendix). I wish to reiterate that these theoretical results are just that—conceptual guides for thinking about certain religious-theological-philosophical questions but not scientific findings supported by any kind of empirical evidence, even if couched in mathematical language. As I recapitulate the effects of SB’s powers in games, I shall use them as a springboard to discuss what I identified as the “central question” in the first sentence of the Preface of this book: “If there existed a superior being who possessed the supernatural qualities of omniscience, omnipotence, immortality, and incomprehensibility, how would he/she act differently from us, and would these differences be knowable?”

## Keywords

Nash Equilibrium Mixed Strategy Superior Quality Sequential Rule Decidable Game## Preview

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## References

- 1.A mathematical system is consistent if no two theorems can be derived that contradict each other. For further details, see Ernest Nagel and James R. Newman,
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*Science*218, 4574 (19 November 1982), 779–780.MathSciNetCrossRefMATHGoogle Scholar - 1f.The connection between Gödel’s Theorem and theology is made in Howard Eves,
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