| Curtis Cooper |
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( source ) Cooper's own work has mainly been mainly in elementary number theory, especially work related to digital representations of numbers. He collaborated extensively with Robert E. Kennedy . They have worked with Niven Numbers , among other results, showing that no 21 consecutive integers can all be Niven numbers Fibonacci Quart. 31 (1993), no. 2, 146--151, and introduced the notion of Tau Numbers , numbers whose total number of divisors are itself a divisor of the numberInternat. J. Math. Math. Sci. 13 (1990), no. 2, 383--386 . Independent of Kennedy, Cooper has also done work about generalizations of geometric series, and their application to probabilityAmer. Math. Monthly 93 (1986). NOTES |
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