On the convex hull genus of space curves

We present an algorithm that computes the convex hull of multiple rational curves in the plane. The problem is reformulated as one of finding the zero-sets of polynomial equations in one or two variables; using these zero-sets we characterize curve segments that belong to the boundary of the convex

## Abstract We compute the following upper bounds for the maximal arithmetic genus __P~a~(d,t__) over all locally Cohen ‐ Macaulay space curves of degree __d__, which are not contained in a surface of degree magnified image These bounds are sharp for t ≤ 4 abd any d ≥ t.

## Abstract We provided an answer to an open problem of A. Pietsch by giving a direct construction of the bornologically surjective hull 𝔲^bsur^ of an operator ideal 𝔲 on __LCS's.__ Discussion of some extension problems of operator ideals were given.

We give a new proof of a theorem of BEORCHIA which provides a bound P ( d , t ) for t.he maximum genus of a locally Cohen-Macaulay space curve of degree d which does not lie on a nurface of degree t -1.

Consider a curve of genus one over a field K in one of three explicit forms: a double cover of P 1 , a plane cubic, or a space quartic. For each form, a certain syzygy from classical invariant theory gives the curve's jacobian in Weierstrass form and the covering map to its jacobian induced by the K