On a Class of Isoperimetric Constrained Controlled Optimization Problems
Abstract
:1. Introduction
2. Isoperimetric Constrained Controlled Optimization Problem
Algorithm 1: |
DATA: |
•controlled path-independent curvilinear integral cost functional |
• set of self or normal data |
- the differential 1-form satisfies the closeness conditions; |
RESULT: |
• Generating Stage: consider a feasible point |
if the necessary optimality conditions (see Theorem 1) |
are not compatible with respect to |
then STOP |
else GO to the next step |
• Detecting Stage: monitoring of Lagrange multipliers |
if the set of self or normal data is not fulfilled |
then STOP |
else GO to the next step • Deciding Stage: let be derived in Detecting Stage |
if holds for all feasible points |
then is an optimal solution |
else STOP |
END |
3. Conclusions
Funding
Institutional Review Board Statement
Informed Consent Statement
Data Availability Statement
Conflicts of Interest
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Treanţă, S. On a Class of Isoperimetric Constrained Controlled Optimization Problems. Axioms 2021, 10, 112. https://doi.org/10.3390/axioms10020112
Treanţă S. On a Class of Isoperimetric Constrained Controlled Optimization Problems. Axioms. 2021; 10(2):112. https://doi.org/10.3390/axioms10020112
Chicago/Turabian StyleTreanţă, Savin. 2021. "On a Class of Isoperimetric Constrained Controlled Optimization Problems" Axioms 10, no. 2: 112. https://doi.org/10.3390/axioms10020112
APA StyleTreanţă, S. (2021). On a Class of Isoperimetric Constrained Controlled Optimization Problems. Axioms, 10(2), 112. https://doi.org/10.3390/axioms10020112