http://chineseinput.net/에서 pinyin(병음)방식으로 중국어를 변환할 수 있습니다.
변환된 중국어를 복사하여 사용하시면 됩니다.
Continuous order representability properties of topological spaces and algebraic structures
Maria Jesus Campion,Juan Carlos Candeal,Esteban Indurain,Ghanshyam Bhagvandas Mehta 대한수학회 2012 대한수학회지 Vol.49 No.3
In the present paper, we study the relationship between continuous order-representability and the fulfillment of the usual covering properties on topological spaces. We also consider the case of some algebraic structures providing an application of our results to the social choice theory context.
CONTINUOUS ORDER REPRESENTABILITY PROPERTIES OF TOPOLOGICAL SPACES AND ALGEBRAIC STRUCTURES
Campion, Maria Jesus,Candeal, Juan Carlos,Indurain, Esteban,Mehta, Ghanshyam Bhagvandas Korean Mathematical Society 2012 대한수학회지 Vol.49 No.3
In the present paper, we study the relationship between continuous order-representability and the fulfillment of the usual covering properties on topological spaces. We also consider the case of some algebraic structures providing an application of our results to the social choice theory context.
SEMICONTINUOUS PLANAR TOTAL PREORDERS ON NON-SEPARABLE METRIC SPACES
Campioon, Marla Jesuus,Candeal, Juan Carlos,Indurain, Esteban Korean Mathematical Society 2009 대한수학회지 Vol.46 No.4
We prove that every non-separable connected metric space can be endowed with a total preorder that is order-isomorphic to a nonrepresentable subset of the lexicographic plane and semicontinuous with respect to the metric topology.
Semicontinuous planar total preorders on non-separable metric spaces
María Jesús Campión,Juan Carlos Candeal,Esteban Induráin 대한수학회 2009 대한수학회지 Vol.46 No.4
We prove that every non-separable connected metric space can be endowed with a total preorder that is order-isomorphic to a non-representable subset of the lexicographic plane and semicontinuous with respect to the metric topology. We prove that every non-separable connected metric space can be endowed with a total preorder that is order-isomorphic to a non-representable subset of the lexicographic plane and semicontinuous with respect to the metric topology.