Репозитарій Національного Авіаційного УніверситетуThe DSpace digital repository system captures, stores, indexes, preserves, and distributes digital research material.http://er.nau.edu.ua:802019-05-21T17:24:44Z2019-05-21T17:24:44ZExample applications of the algebra of logics to the decision making problems of the aircraft airworthiness support technologies (aviation legislation and operational documentation concern)Goncharenko, Andriy Viktorovichhttp://er.nau.edu.ua:8080/handle/NAU/387782019-05-21T16:42:26Z2019-04-23T00:00:00ZTitle: Example applications of the algebra of logics to the decision making problems of the aircraft airworthiness support technologies (aviation legislation and operational documentation concern)
Authors: Goncharenko, Andriy Viktorovich
Abstract: It is made an attempt to propose a few examples that may relate to making decisions at conducting investigations or analyses. The material could be helpful optionally for either aviation legislation or operational documentation practical problems involving the mathematical logics operators in regards.
Description: The paper considers optionally either aviation legislation or operational documentation example problems involving mathematical logics operators in regards. The prototypic problems have been found in reference [6]. A few applications to the area of technical operation have been already done in reference [7]. An interesting development could be with the use of the algebra of logics [8, p. 490] and the entropy paradigm [9] adapted to [10-33] doctrine.2019-04-23T00:00:00ZApplicability of the multi-optional uncertainty conditional optimality doctrine to the neuron firing modelGoncharenko, Andriy Viktorovichhttp://er.nau.edu.ua:8080/handle/NAU/387772019-05-21T16:36:33Z2019-04-23T00:00:00ZTitle: Applicability of the multi-optional uncertainty conditional optimality doctrine to the neuron firing model
Authors: Goncharenko, Andriy Viktorovich
Abstract: It is made an attempt to discover an explainable plausible reason for a neuron model
activation function, or a squashing function, of a sigmoid type function like logistic
function, substantiation in terms of the multi-optional conditional optimality doctrine
for the special hybrid-optional effectiveness functions uncertainty.
Description: The problem statement for the current state would be as to
find a value extremized with the known view expression used as a neuron model
activation function. Consider sigmoid function, for instance, logistic function [1].2019-04-23T00:00:00ZOptimal optional-hybrid functions distribution for a reliability problem within the “multi-optionality” uncertainty degree evaluation doctrineGoncharenko, Andriy Viktorovichhttp://er.nau.edu.ua:8080/handle/NAU/387762019-05-21T16:30:35Z2019-04-23T00:00:00ZTitle: Optimal optional-hybrid functions distribution for a reliability problem within the “multi-optionality” uncertainty degree evaluation doctrine
Authors: Goncharenko, Andriy Viktorovich
Abstract: The sixth part of the generalization for the degrading state maximal probability
determination in the framework of the hybrid-optional functions entropy conditional
optimality doctrine initiated in the preceding reports was presented in the given
report. The issue will be continued with a following sequence of reports.
Description: However in this work we interpret it, Eq. (11), as the optional hybrid functions
distribution since we do not consider any active elements or subjects (persons,
individuals, or human beings) in the system. Instead we deal with (1)-(11), the
objectively existing optimal quality of the system, corresponding with the system
intrinsic nature, rather than subjectively preferred (although might be also essential,
indispensable) matter [8-10, p. 39].2019-04-23T00:00:00ZSymmetrical solution for a reliability problem within the multi-optional uncertainty degree evaluation doctrineGoncharenko, Andriy Viktorovichhttp://er.nau.edu.ua:8080/handle/NAU/387752019-05-21T16:25:45Z2019-04-23T00:00:00ZTitle: Symmetrical solution for a reliability problem within the multi-optional uncertainty degree evaluation doctrine
Authors: Goncharenko, Andriy Viktorovich
Abstract: The fifth part of the generalization for the degrading state maximal probability
determination in the framework of the hybrid-optional functions entropy conditional
optimality doctrine initiated in the preceding reports was presented in the given
report. The issue will be continued with a following sequence of reports.
Description: It is visible that intensities of 12 and 10 do not calibrate the optimal
options’ dispositions. In that particular case, none of the flows from the state “1” is
taken into account. The solutions in the view of either equation (1) or its symmetrical
reflection solution as equation (5) are the general ones. That is, the partial cases are
obtained from them.
Objective functional for procedures (1)-(6), like proposed in references [8-16],
is as follows [8-10, p. 35, (55)], [11, p. 90, (11)] and expressed with formula (7):2019-04-23T00:00:00Z