Add to ORKGPositivity of polynomials, as a key notion in real algebra, is one of the oldest topics. In a given context, some polynomials can be represented in a form that reveals their positivity immediately, like sums of squares. A large body of literature deals with the question which positive polynomials can be represented in such a way.The milestone in this development was Schm"udgen's solution of the moment problem for compact semi-algebraic sets. In 1991, Schm"udgen proved that if the associated basic closed semi-algebraic set $K_{S}$ is compact, then any polynomial which is strictly positive on $K_{S}$ is contained in the preordering $T_{S}$.Putinar considered a further question: when are `linear representations' possible? He provided the first...
The Positivstellens\"atze of Putinar and Schm\"udgen show that any polynomial $f$ positive on a comp...
Abstract If a real polynomial f can be written as a sum of squares of real polynomials, then clearly...
We extend and generalize results of Scheiderer (2006) on the representation of polynomials nonnegati...
AbstractWe present a new proof of Schmüdgen's Positivstellensatz concerning the representation of po...
AbstractThis paper studies the representation of a positive polynomial f(x) on a noncompact semialge...
AbstractLet Φ={φ1, …, φj} and let K be a closed basic set in Rn given by the polynomial inequalities...
We present a new proof of Schmüdgen's Positivstellensatz concerning the representation of polynomial...
AbstractLet g1,…,gr∈R[x1,…,xn] such that the set K={g1⩾0,…,gr⩾0} in Rn is compact. We study the prob...
AbstractThis paper concerns positive polynomials and the moment problem for certain non-compact cyli...
AbstractDuring the last 10 years there have been several new results on the representation of real p...
We prove a criterion for an element of a commutative ring to be contained in an archimedean subsemir...
We present a new proof of Schmüdgen’s Positivstellensatz concerning the repre-sentation of polynomi...
AbstractLetKbe a closed basic set inRngiven by the polynomial inequalities φ1≥ 0, ... , φm≥ 0 and le...
Given g1,..., gs ∈ R[X] = R[X1,..., Xn] such that the semialgebraic set K: = {x ∈ Rn | gi(x) ≥ 0 f...
Im ersten Teil der Arbeit wird für eine Klasse von partiell archimedisch angeordneten kommutativen R...
The Positivstellens\"atze of Putinar and Schm\"udgen show that any polynomial $f$ positive on a comp...
Abstract If a real polynomial f can be written as a sum of squares of real polynomials, then clearly...
We extend and generalize results of Scheiderer (2006) on the representation of polynomials nonnegati...
AbstractWe present a new proof of Schmüdgen's Positivstellensatz concerning the representation of po...
AbstractThis paper studies the representation of a positive polynomial f(x) on a noncompact semialge...
AbstractLet Φ={φ1, …, φj} and let K be a closed basic set in Rn given by the polynomial inequalities...
We present a new proof of Schmüdgen's Positivstellensatz concerning the representation of polynomial...
AbstractLet g1,…,gr∈R[x1,…,xn] such that the set K={g1⩾0,…,gr⩾0} in Rn is compact. We study the prob...
AbstractThis paper concerns positive polynomials and the moment problem for certain non-compact cyli...
AbstractDuring the last 10 years there have been several new results on the representation of real p...
We prove a criterion for an element of a commutative ring to be contained in an archimedean subsemir...
We present a new proof of Schmüdgen’s Positivstellensatz concerning the repre-sentation of polynomi...
AbstractLetKbe a closed basic set inRngiven by the polynomial inequalities φ1≥ 0, ... , φm≥ 0 and le...
Given g1,..., gs ∈ R[X] = R[X1,..., Xn] such that the semialgebraic set K: = {x ∈ Rn | gi(x) ≥ 0 f...
Im ersten Teil der Arbeit wird für eine Klasse von partiell archimedisch angeordneten kommutativen R...
The Positivstellens\"atze of Putinar and Schm\"udgen show that any polynomial $f$ positive on a comp...
Abstract If a real polynomial f can be written as a sum of squares of real polynomials, then clearly...
We extend and generalize results of Scheiderer (2006) on the representation of polynomials nonnegati...