Abstract
The study of the distribution of various number theoretic functions in arithmetic progressions has long been a topic of concern and has in recent years received new impetus from outside sources such as exponential sums over varieties [D, B, H] and from those occurring in the theory of auto- morphic forms [D-I]. Particular examples are squarefree numbers [HB1], primes [Fo-I, B-F-I] and divisor functions [Fo, F-Il, F-I2, HB2].
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To Paul Bateman, with friendship and respect
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© 1990 Birkhäuser Boston
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Friedlander, J.B., Iwaniec, H. (1990). Norms in Arithmetic Progressions. In: Berndt, B.C., Diamond, H.G., Halberstam, H., Hildebrand, A. (eds) Analytic Number Theory. Progress in Mathematics, vol 85. Birkhäuser Boston. https://doi.org/10.1007/978-1-4612-3464-7_17
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DOI: https://doi.org/10.1007/978-1-4612-3464-7_17
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