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محبوب کی یاد میں

محبوب کی یاد میں
اب تو آجا ساجن کہ ماحول ہے بڑا ساز گار
میری بے چین نگاہوں کو کب سے ہے انتظار
دل روتا ہے اور آنکھیں اشکبار رہتی ہیں
محبوب کے ملنے کا یہ بار بار کہتی ہیں
ہجر کی غمگین گھاٹیوں میں کب سے یہ رہتی ہیں
یہ پیاسی ہیں ہونا چاہیے اب تو دیدار
برسات کے موسم میں دل ملنے کی تمنا کرتا ہے
شمع کی خاطر پروانہ جان کی پرواہ نہ کرتا ہے
زندہ رہے یا مرجائے دکھ درد صبر سے وہ جرتا ہے
حضرت عشق کی منزل میں آتے ہیں دکھوں کے انبار
چاولہ سائیںؔ ساون کے مہینے میں گھٹا جب چھاجاتی ہے
دکھ درد کے ماروں کو محبوب کی یاد ستاتی ہے
قسمت والے ملتے ہیں بد قسمت سیج نہ بھاتی ہے
ملنے والے خوشیوں کا کرتے ہیں پرچار

سیرتِ صحابہ کرام کی روایات کے اصول و ضوابط : معاصر آراء کا تجزیاتی مطالعہ

Researchers, Scholars and historians have rendered invaluable services on important topics such as the biography of the Prophet ( P.B.U.H) and the Biography of Sahaabah. But unfortunately some writers have included in their writings some traditions and baseless historical references about the holy congregation of the Companions which are not worthy of the holy congregation and do not meet the rules and regulations of the traditions of these biographies and histories ۔ Leading historians of the present day have done unparalleled work on the Seerah of the Companions in the case of the writings and compilations of the Seerah and history. Has done research work on relations with But in the beginning (in the case) as well as in the context, the principles of Seerah  and history have been discussed in detail and we have tried to bring out all the principles that are standard, accepted, in the Seerah and the character of the Companions and the disputes of the Companions. I am going to pave the way for balance and moderationIn The following Lines, a special study or the principles of biography and history described by contemporary historians such as Maulana Shibli Nomani ( 1913) Maulana Saeed Ahmed Akbarabadi ( 1985) and Maulana Nafe (2014) is presented. In this regard, efforts will be made to clarify how the path of moderation can be taken in this regard, how the honor of Ahel Bayt and Sahabah can be  maintained and how such traditions  can be avoided as a result. There was no mention of Ahle –e- Bayt or Zat –e- Sahaba or there was no element of division.

Generalized Geometry of Goncharow & Configuration Chain Complexes.

The goal of this thesis is to present generalized geometry of two famous chain complexes through generalized homomorphisms. First one is Grassmannian configuration chain complex of free abelian groups generated by all the projective configurations of m points in any n-dimensional vector space Vn(F) defined over some arbitrary field F, while other is Goncharov polylogarithmic group complex of classical polylog groups. Many researchers defined geometry of Grassmannian configuration with classical polylogarithmic groups only for lower weights, i.e. n = 2 and 3, to present commutative diagrams. Here geometry for lower weights is not only redefined in different ways but also it is generalized for higher weights, i.e. n = 4, 5, 6 up to any weight n ∈ N. Initially, geometry for special cases for weight n = 2 and n = 3 is introduced in detail. Bloch Suslin polylogarithmic group complex and Grassmannian configuration chain complexes are connected through morphisms for weight 2 such that the associated polygon is proven to be commutative and composition of morphisms is bi-complex. For weight 3, Goncharov classical poly-logarithmic and Grassmannian configuration chain complexes are connected to provide commutative and bi-complex diagram. Then geometry of Goncharov motivic complex and Grassmannian configuration complex is defined for weight 4 up to generalized weight n ∈ N through two types of generalized morphisms. All the associated diagrams are shown to be bi-complex and commutative. Lastly, and most importantly, extensions in geometry of Goncharov polylogarithmic and Grassmannian configuration chain complexes are introduced to generalize all morphisms between the above two chain complexes and also to generalize functional equations of polylogarithmic groups up to order n. For extensions of geometry, additional morphisms are introduced for weight 3 up to higher weight 6, to extend commutative and bi-complex diagrams. Then these extensions in geometry are generalized for any weight n to all morphisms between above two chain complexes. Associated generalized commutative and bi-complex diagrams are exhibited
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