Just as in linear programming, duality theorem plays a basic and an important role in theory as well as in algorithmics. Based on the discretization method and convergence property, this paper proposes a new proof of the strong duality theorem for semidefinite programming, which is different from...
This paper re-evaluates the formative year of quantum mechanics—from Heisenberg’s first paper on matrix mechanics to Schrödinger’s equivalence proof—by focusing on the role of radiation in the emerging theory. We argue that the radiation problem played a key role in early quantum mechanics,...
both of which are central to inferentialist approaches to semantics. In so doing, I shall argue that, in contrast to the prescriptive and monological approach to logic that underlies the problems discussed in the previous chapter, we should...
2 O(logn) (Theorem 2) The second property we consider is verifying that a specified matching M has the maximum possible weight (see summary of results in Table 2). For this property we are interested in bounding from below the weight of the matching w.r.t. the weight of the maxim...
strong dualityWe provide a simple proof of strong duality for the linear persuasion problem. The duality is established in Dworczak and Martini (2019), under slightly strongedoi:10.2139/ssrn.3426166Dizdar, DenizKová, EugenSocial Science Electronic Publishing...
Strong dualityWe provide a simple proof of strong duality for the linear persuasion problem. The duality is established in Dworczak and Martini (2019), under slightly stronger assumptions, using techniques from the literature on optimization with stochastic dominance constraints and several approximation...
We provide a simple proof of strong duality for the linear persuasion problem. The duality is established in Dworczak and Martini (2019), under slightly stronger assumptions, using techniques from the literature on optimization with stochastic dominance constraints and several approximation arguments. ...