Multidimensional configurations in the primes with shifted prime steps
Abstract
Let P denote the set of primes. For a fixed dimension d, Cook-Magyar-Titichetrakun, Tao-Ziegler and Fox-Zhao independently proved that any subset of positive relative density of Pd contains an arbitrary linear configuration. In this paper, we prove that there exists such configuration with the step being a shifted prime (prime minus 1 or plus 1).
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