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Benign prostatic hyperplasia (BPH) is a common disease in human that gradual overgrowth of the prostate gland leads to impinge on the urethra with impairment in urinary function. Numerous plants improve uncontrolled growth of the prostate gland and improve urinary tract symptoms associated with BPH. In this study, 25 healthy adult male Wistar rats were… (More)
A BLOCKINnonzero BLOCKINfuzzy BLOCKINopen BLOCKINset BLOCKIN() BLOCKINof BLOCKINa BLOCKINfuzzy BLOCKINtopological BLOCKINspace BLOCKINis BLOCKINsaid BLOCKINto BLOCKINbe BLOCKINfuzzy BLOCKINminimal BLOCKINopen BLOCKIN(resp. BLOCKINfuzzy BLOCKINmaximal open) BLOCKINset BLOCKINif BLOCKINany BLOCKINfuzzy BLOCKINopen BLOCKINset BLOCKINwhich BLOCKINis… (More)
including translation into other languages reserved by the publisher. No part of this journal may be reproduced or used in any form or by any means without written permission from the publisher, except for noncommercial, educational use including classroom teaching purposes. Product or company names used in this journal are for identification purposes only.… (More)
In this paper, a new nonlinear neural network for solving the interval maximum flow problem is presented. The our nonlinear neural network is able to generate optimal solution to the interval maximum flow problem. The interval maximum flow problem in network is formulated as a special type of linear programming problem and it is solved by appropriately… (More)
Despite the many advances intended to enhance the response to treatment, the survival rate of patients with ovarian cancer has only marginally improved in the past few decades. One major cause for this, is the lack of diagnostics for platinum-resistant disease. The goal of this study was to determine whether Raman micro-spectroscopy in conjunction with… (More)
We give a Jensen's operator inequality for strongly convex functions. As a corollary , we improve Hölder-McCarthy inequality under suitable conditions. More precisely we for each positive operator A and x ∈ H with x = 1.
In this paper, we prove almost sure convergence (̃ ̃) to zero as ∞. In this case, we study the strong Law of large numbers for the weighted average of pairwise negatively quadrant dependent fuzzy random variables. We also obtain analogues of Kolmogrov's theorem for weighted averages of the pairwise quadrant of fuzzy random variables.
In this paper, direct proofs of some properties of new classes of fuzzy sets called fuzzy strongly g *-closed sets and fuzzy g * *-closed sets are introduced. Examples are presented showing that some generalizations can not be obtained.