The Ramanujan Journal
An International Journal Devoted to the Areas of Mathematics Influenced by Ramanujan
The remarkable discoveries made by Srinivasa Ramanujan have made a great impact on several branches of mathematics, revealing deep and fundamental connections. This journal publishes papers of the highest quality in all areas of mathematics influenced by Ramanujan, including:
Hyper-geometric and basic hyper-geometric series (q-series) * Partitions, compositions and combinatory analysis * Circle method and asymptotic formulae * Mock theta functions * Elliptic and theta functions * Modular forms and automorphic functions * Special functions and definite integrals * Continued fractions * Diophantine analysis including irrationality and transcendence * Number theory * Fourier analysis with applications to number theory * Connections between Lie algebras and q-series.
William Paulsen (March 2019)
New congruences modulo 2, 4, and 8 for the number of tagged parts over the partitions with designated summands
To view the rest of this content please follow the download PDF link above.