The strongly robust simplicial complex of monomial curves

Abstract

To every simple toric ideal IT one can associate the strongly robust simplicial complex T, which determines the strongly robust property for all ideals that have IT as their bouquet ideal. We show that for the simple toric ideals of monomial curves in As, the strongly robust simplicial complex T is either \ \ or contains exactly one 0-dimensional face. In the case of monomial curves in A3, the strongly robust simplicial complex T contains one 0-dimensional face if and only if the toric ideal IT is a complete intersection ideal with exactly two Betti degrees. Finally, we provide a construction to produce infinitely many strongly robust ideals with bouquet ideal the ideal of a monomial curve and show that they are all produced this way.