A connected, linearly ordered subset of an euclidean space satisfying the property that the distance of any previous points is not decreasing with repect to the order is shown to be a rectifiable curve; a priori bounds for its length are given; moreover, these curves are generalized steepest descent curves of suitable quasi convex functions. Properties of quasi convex families are considered; special curves related to quasi convex families are defined and studied; they are generalizations of steepest descent curves for quasi convex functions and satisfy the previous property. Existence, uniqueness, stability results and length bounds are proved for them.
On steepest descent curves for quasi convex families in R^n / M.LONGINETTI; P. MANSELLI; A.VENTURI. - In: MATHEMATISCHE NACHRICHTEN. - ISSN 0025-584X. - ELETTRONICO. - (2015), pp. 1-23. [10.1002/mana.201300133]
On steepest descent curves for quasi convex families in R^n
LONGINETTI, MARCO
;MANSELLI, PAOLO;VENTURI, ADRIANA
2015
Abstract
A connected, linearly ordered subset of an euclidean space satisfying the property that the distance of any previous points is not decreasing with repect to the order is shown to be a rectifiable curve; a priori bounds for its length are given; moreover, these curves are generalized steepest descent curves of suitable quasi convex functions. Properties of quasi convex families are considered; special curves related to quasi convex families are defined and studied; they are generalizations of steepest descent curves for quasi convex functions and satisfy the previous property. Existence, uniqueness, stability results and length bounds are proved for them.
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