استشهاد ابن زيدون بأشعار المتنبى في رسالته الجدية التي كتبها في غياهب السجن

This article probes into poetical citation in the historical letter of Ibn-e Zaydun, a renowned Andalusion poet of 11th  century A.D. Ibn-e Zaydun was imprisoned by king of Córdoba, Ibn-e- Jahoor. While in prison, Ibn-e- Zaydun wrote Ibn- e- Jahoor a letter lamenting that he has been thrown into prison for no reason and appealed  for mercy and leniency towards him. The depth of thoughts reflected in the poetic text of Ibn- e- Zaydun`s letter testifying  his command over  poetry. The poet who is  quoted in the letter of Ibn- e- Zaydun is known as Al- Mutanabi. The article examines the parts of the Ibn- e- Zaydun`s letter citing the poetry of Al- Mutanabi in order to make it effective in achieving the objectives of the study.

On Generalization of Inequalities for Monotone Functions

The thesis comprises of generalized inequalities for monotone functions from which we deduce important inequalities such as reversed Hardy type inequalities, general- ized Hermite-Hadamard’s inequalities etc by putting suitable functions. The present thesis is divided into three chapters. The first chapter includes generalized inequalities given for C-monotone functions and multidimensional monotone functions. As a result of these inequalities, we de- duce reversed Hardy inequalities for C-monotone functions and multidimensional re- versed Hardy type inequalities with the optimal constant. Furthermore, we construct functionals from the differences of above inequalities and gives their n-exponential convexity and exponential convexity. By using log-convexity of these functionals we give refinements of these inequalities. Also we give mean-value theorems for these functionals and deduce Cauchy means for them. The second chapter consists of inequalities valid for monotone functions of the form f /h and f /h. These are also very interesting as by putting suitable functions we get one side of Hermite-Hadamard’s inequality and generalized Hermite-Hadamard’s inequality. Similarly as in the first chapter, we make functionals of these inequalities and gives results regarding n-exponential convexity and exponential convexity. Also we give mean value theorems of Lagrange and Cauchy type as well as we obtain non- symmetric Stolarsky means with and without parameter. In the third and the last chapter we consider Petrovi ́ type functionals obtained from c Petrovi ́ type inequalities and investigate their properties like superadditivity, sub- c additivity, monotonicity and n-exponential convexity. Also at the end of each chapter we discuss examples in which we construct further exponential convex functions and their relative properties.