۳-متی
"أَمْ حَسِبْتُمْ أَن تَدْخُلُواْ ٱلْجَنَّةَ وَلَمَّا يَأْتِكُم مَّثَلُ ٱلَّذِينَ خَلَوْاْ مِن قَبْلِكُم مَّسَّتْهُمُ ٱلْبَأْسَآءُ وَٱلضَّرَّآءُ وَزُلْزِلُواْ حَتَّىٰ يَقُولَ ٱلرَّسُولُ وَٱلَّذِينَ آمَنُواْ مَعَهُ مَتَىٰ نَصْرُ ٱللَّهِ أَلا إِنَّ نَصْرَ ٱللَّهِ قَرِيبٌ۔"[[1]]
"پھر کیا تم لوگوں نے یہ سمجھ رکھا ہے کہ یونہی جنت کا داخلہ تمہیں مل جائے گا، حالانکہ ابھی تم پر وہ سب کچھ نہیں گزرا ہے، جو تم سے پہلے ایمان لانے والوں پر گزر چکا ہے؟ اُن پر سختیاں گزریں، مصیبتیں آئیں، ہلا مارے گئے، حتیٰ کہ وقت کارسول اور اس کے ساتھی اہل ایمان چیخ اٹھے کہ اللہ کی مدد کب آئے گی اُس وقت انہیں تسلی دی گئی کہ ہاں اللہ کی مدد قریب ہے"۔
There is no doubt that the economic system of Islam is stable and compassionate which is based on "Human Amity." This system and its features are utterly beneficial for humanity irrespective of their caste, creed, reigion and religion etc. The specialities of social justice that are applied in the economic field provide such comprehensive and versatile version which makes the utility of the economic system even more pertinent. The humanity can adopt this system to ensure their well-being and welfare. More importantly, as this system is based on economic justice rather equality, which means, it’s the natural system that depends on human capacities, efforts, innate necessities and abilities. The more a man strives, the more benefit he gets. However, it also sets out the principle of financing those who try hard but stay behind in the economic race. In addition, the fundamental philosophy of this system is to protect the economic rights of the society and provides resources to everyone for equitable economic struggle, with no discrimination. The economic systems around the world suffer from inflation and precariousness, while Social Justice proves to be a remedy to the said scenarios.
The core objective of this research is to introduce new classes of analytic functions by using the concept of bounded boundary rotation and some of its generalization. This research heavily depends on the recent techniques of convolution (Hadamard product) and the differential subordination. The Ruscheweyh derivative and Carlson-Shaffer operator are utilized to define certain new classes of analytic functions. We also investigate these classes for certain linear operators such as Jung-Kim-Srivastava operator, generalized Bernardi integral operator, Frasin integral operator and some others. Some geometrical and analytical properties, which include distortion bounds, radius problems, inclusion relation, rate of growth problem and integral representation, are explored systematically. Relevant connections of the results presented here with those obtained in earlier works are pointed out. This research is updated with the advancement and changing trends in the field of Geometric Function Theory and emerging new open problems are added for investigation.