Let (u × v, k, λ a , λ c ) denote the largest possible size among all 2-D (u × v, k, λ a , λ c )-OOCs. In this paper, the exact value of (u × v, k, λ a , k − 1) for λ a = k − 1 and k is determined. The case λ a = k − 1 is a generalization of a result in Yang (Inform Process Lett 40:85-87, 1991) which deals with one dimensional OOCs namely, u = 1.
BackgroundThe optimization of surgical procedures and the management of surgical quality and safety have become the focus of attention of hospital managers. The application of multimodal identification technology in the innovative management mode of hospital operating department has made remarkable progress.MethodsTo investigate the effect of the upgraded multimodal identification technology on the innovative management of the operating department, 2,280 cases of laparoscopic surgery using traditional surgical management procedures from January to December 2019 before the management upgrade were set as the control group, and 2,350 laparoscopic surgeries with the upgraded multimodal identification management process from January to December 2020 were selected as the experimental group. The operating efficiency, material management efficiency, and patient experience and satisfaction of the two groups were investigated and compared.ResultsCompared with traditional procedures, the upgraded multimodal surgical management system significantly improves the efficiency of laparoscopic surgery and reduces surgical consumption and costs. In addition, the multimodal surgical information identification system significantly improves the surgical experience for patients undergoing laparoscopic surgery.ConclusionApplication of multimodal identification technology improves the innovative management of operation department compared with traditional surgery management procedure.
scite is a Brooklyn-based organization that helps researchers better discover and understand research articles through Smart Citations–citations that display the context of the citation and describe whether the article provides supporting or contrasting evidence. scite is used by students and researchers from around the world and is funded in part by the National Science Foundation and the National Institute on Drug Abuse of the National Institutes of Health.