DOIAbstract
AbstractLinear systems and their order sequences for an algebraic curve over a finite field are used to obtain upper bounds on the size of a complete arc in a finite projective plane
AbstractLinear systems and their order sequences for an algebraic curve over a finite field are used to obtain upper bounds on the size of a complete arc in a finite projective plane
This article reviews some of the principal and recently-discovered lower and upper bounds on the max...
AbstractAn approach to the computations of upper bounds on the size of large complete arcs is presen...
A lower bound on the minimum degree of the plane algebraic curves containing every point in a large ...
AbstractLinear systems and their order sequences for an algebraic curve over a finite field are used...
AbstractIn [11], a new bound for the number of points on an algebraic curve over a finite field of o...
In [11], a new bound for the number of points on an algebraic curve over a finite field of odd order...
This paper examines subsets with at most n points on a line in the projective plane π q = PG(2, q). ...
In the late 1950’s, B. Segre introduced the fundamental notion of arcs and complete arcs [48, 49]. A...
In the projective plane PG(2, q), upper bounds on the smallest size t(2)(2, q) of a complete arc are...
In the projective plane PG(2, q), upper bounds on the smallest size t(2)(2, q) of a complete arc are...
PhDMathematicsUniversity of Michigan, Horace H. Rackham School of Graduate Studieshttp://deepblue.li...
Let p denote the characteristic of , the finite field with q elements. We prove that if q is odd the...
Complete (Formula presented.) -arcs in projective planes over finite fields are the geometric counte...
Complete (Formula presented.) -arcs in projective planes over finite fields are the geometric counte...
Let p denote the characteristic of Fq, the finite field with q elements. We prove that if q is odd t...
This article reviews some of the principal and recently-discovered lower and upper bounds on the max...
AbstractAn approach to the computations of upper bounds on the size of large complete arcs is presen...
A lower bound on the minimum degree of the plane algebraic curves containing every point in a large ...
AbstractLinear systems and their order sequences for an algebraic curve over a finite field are used...
AbstractIn [11], a new bound for the number of points on an algebraic curve over a finite field of o...
In [11], a new bound for the number of points on an algebraic curve over a finite field of odd order...
This paper examines subsets with at most n points on a line in the projective plane π q = PG(2, q). ...
In the late 1950’s, B. Segre introduced the fundamental notion of arcs and complete arcs [48, 49]. A...
In the projective plane PG(2, q), upper bounds on the smallest size t(2)(2, q) of a complete arc are...
In the projective plane PG(2, q), upper bounds on the smallest size t(2)(2, q) of a complete arc are...
PhDMathematicsUniversity of Michigan, Horace H. Rackham School of Graduate Studieshttp://deepblue.li...
Let p denote the characteristic of , the finite field with q elements. We prove that if q is odd the...
Complete (Formula presented.) -arcs in projective planes over finite fields are the geometric counte...
Complete (Formula presented.) -arcs in projective planes over finite fields are the geometric counte...
Let p denote the characteristic of Fq, the finite field with q elements. We prove that if q is odd t...
This article reviews some of the principal and recently-discovered lower and upper bounds on the max...
AbstractAn approach to the computations of upper bounds on the size of large complete arcs is presen...
A lower bound on the minimum degree of the plane algebraic curves containing every point in a large ...
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