A Solution of Sierpinski Problem Based m

Abstract

In 1960, W. Sierpinski proved that there are infinitely many positive odd numbers k, such that for any positive integer n, k×2n+1 is a composite number. Such numbers are called "Sierpinski numbers". In this study, by using covering systems and the theory of cyclotomic polynomials, the following theorem is proved: for any integer m>1, there are infinitely many integers k satisfying k-1\!q for any prime number q|(m-1), such that for any positive integer n, kmn+1 is a composite number. These positive integers k are called "Sierpinski numbers based m". The theorem can be regarded as a generalization of Sierpinski problem.

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