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Home > پیغمبر اسلام ﷺتاریخی حیثیت اورمغربی مفکرین کی تحقیقات: ابن ورّاق کےمجموعہ مضامین The Quest for the Historical Muhammad کاتحقیقی وتنقیدی جائزہ

پیغمبر اسلام ﷺتاریخی حیثیت اورمغربی مفکرین کی تحقیقات: ابن ورّاق کےمجموعہ مضامین The Quest for the Historical Muhammad کاتحقیقی وتنقیدی جائزہ

Thesis Info

Author

محمد ناصر محمود

Supervisor

محمد اکرم چوہدری

Department

شعبہ علوم اسلامیہ

Program

PhD

Institute

University of Sargodha

Institute Type

Public

City

Sargodha

Province

Punjab

Country

Pakistan

Degree Starting Year

2010

Degree End Year

2013

Subject

Orientalism

Language

Urdu

Keywords

استشراق، سیرت
Orientalism,Sirah

Added

2021-02-17 19:49:13

Modified

2023-01-06 19:20:37

ARI ID

1676709364562

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یہ ہم نے غور کرنا ہے یہ ہم نے سوچنا بھی ہے

یہ ہم نے غور کرنا ہے یہ ہم نے سوچنا بھی ہے
جو ہم نے آج بونا ہے اُسے کل کاٹنا بھی ہے

فقیری کے ضوابط میں میاں اک ضابطہ ہے یہ
کہ زندہ دل کو رکھنا خواہشوں کو مارنا بھی ہے

مجھے یہ خوف بھی لاحق کہیں رسوا نہ ہو جائوں
کہ میں نے اُس سے اُس کا ہاتھ آخر مانگنا بھی ہے

یہ چھت اپنی، در و دیوار اپنے ، گھر ہے یہ اپنا
کڑا جو وقت آئے جاں کو اس پر وارنا بھی ہے

یقیں مانو بڑی مشکل میں ہے پھر آج کل تائب ؔ
وہ ظالم اب یہ کہتا ہے کہ اُس کو بھولنا بھی ہے

بلاد اسلاميہ ميں مندروں كى تعمير

There are rulings for both Muslims and non-Muslims in Islām whereby Muslims are bound to act and deal with the nonMuslims according to those teachings. There are numerous books authored in classical and modern times that include all such details of dealing with the different categories and of nonMuslims. It is therefore incumbent on Muslims to follow all such jurisprudential guidelines in all times and places. Although the application and employment methods of these legislations may vary in modern times but Islām has clearly stipulated its objectives and expectations that every Muslim pledges to fulfill in all times. In this paper, in stead of mentioning the jurisprudential details and discussions regarding building temples and religious places on non-Muslims in Muslim lands, only those verses of the Qur’ān and the Aḥādīth are mentioned that are basis for all such jurisprudential discussions. Numerous Qur’ānic verses and Prophetic traditions along with the consensus of companions and scholars are compiled in this paper to clarify the rightful stance in this regard.

Symmetry Analysis and Conservation Laws of Physical Models on Curved Surfaces

Physical models with non-flat background are important in biological mathematics. Most of the biological membranes are not flat in general. For example, membranes which convert energy in mitochondria and chloroplasts are tubes, buds and may be sheets. In most of the biological processes, the geometry of membranes is very important. The organization and shape of the membranes play a vital role in biological processes such as shape change, fusion- division, ion adsorption etc. A cell membrane is a system for exchange of energy and matter from the neighbourhood. Absorption and transformation of conserved quantities such as energy and matter from the environment are one of the characteristics of membranes. The shape of proteins, non zero curvature of membranes and involvement of conserved quantities lead one to discuss physical models on curved surfaces. Conservation laws play a vital role in science and also helpful to construct potential systems which can be used to calculate exact solutions of differential equations. Physical models on curved surfaces govern partial differential equation which need not to be derivable from variational principle. The partial Noether approach is the systematic way to construct the conservation laws for non-variational problems. The group classification and conservation laws for some partial differential equation on curved surfaces are presented in this dissertation. In particular some linear and nonlinear models of heat and wave equation on plane, cone, sphere are classified. The conservation laws for the (1 + 2)-dimensional heat equation on different surfaces are constructed via partial Noether approach and then the results are generalized for the (1+n)-dimensional case. The symmetry conservation laws relation is used to simplify the derived conserved vectors and exact solu- tions are constructed. We also extend these results to a special type of (1 + n)-dimensional linear evolution equation. Potential systems of some models from different sciences are also given. The similar analysis is performed for the (1 + 2)-dimensional wave equation on the sphere, cone and on flat surface. Furthermore, the nonlinear heat equation on curved surfaces is considered. A class of func- tions is found on the plane, sphere and torus, which is not only independent of the number of independent variables but also independent of the background metric. We consider whether the background metric or the nonlinearity have the dominant role in the infinitesimal gen- erators of heat equation on curved manifolds. Then a complete Lie analysis of the time dependent Ginzburg-Landau equation (TDGL model) is presented on the sphere and torus. In addition, for the (1 + n)-dimensional nonlinear wave equation (Klein Gordon Equation) it is proved that there is a class of functions which is independent from number of independent variables. Then for the (1 + 2)-dimensional wave equation it is proved that there is a class of functions which is invariant either the underlying space is a plane, sphere or torus.