Formulæ for the Number of Partitions of n into at Most m Parts (Using the Quazi-Polynomial Ansatz), Andrew Sills, Doron Zeilberger
Andrew V. Sills

Rademacher's Infinite Partial Fractions Conjecture is (Almost Certainly) False, Andrew Sills, Doron Zeilberger
Andrew V. Sills

Rademacher's Infinite Partial Fractions Conjecture is (Almost Certainly) False, Andrew Sills, Doron Zeilberger
Department of Mathematical Sciences Faculty Publications

Rademacher's Infinite Partial Fractions Conjecture Is (Almost Certainly) False, Andrew V. Sills, Doron Zeilberger
Department of Mathematical Sciences Faculty Presentations

Rademacher's Infinite Partial Fractions Conjecture Is (Almost Certainly) False, Andrew Sills, Doron Zeilberger
Andrew V. Sills

Rademacher’s Infinite Partial Fractions Conjecture Is (Almost Certainly) False, Andrew V. Sills, Doron Zeilberger
Department of Mathematical Sciences Faculty Presentations

Rademacher’s Infinite Partial Fractions Conjecture Is (Almost Certainly) False, Andrew Sills, Doron Zeilberger
Andrew V. Sills

Formulæ for the Number of Partitions of n into at Most m Parts (Using the Quazi-Polynomial Ansatz), Andrew Sills, Doron Zeilberger
Department of Mathematical Sciences Faculty Publications

Rademacher’s Infinite Partial Fractions Conjecture Is (Almost Certainly) False, Andrew V. Sills, Doron Zeilberger
Department of Mathematical Sciences Faculty Presentations

Rademacher’s Infinite Partial Fractions Conjecture Is (Almost Certainly) False, Andrew Sills, Doron Zeilberger
Andrew V. Sills

Disturbing the Dyson Conjecture (in a GOOD Way), Andrew V. Sills, Doron Zeilberger
Andrew V. Sills

Disturbing the Dyson Conjecture (in a GOOD Way), Andrew V. Sills, Doron Zeilberger
Andrew V. Sills