جسٹس سیّد امیرعلی مرحوم
سیدامیرعلی مرحوم تمام تر جدید تعلیم کی پیدوار تھے، مگر انہوں نے بزرگوں کے سُنے سُنائے معلومات اور ذاتی کدو کاوش سے یورپ میں اسلام کی بڑی خدمت کی، وہ یورپ میں تمام اسلامی کاموں اور تحریکوں کے رکن رکین سمجھے جاتے تھے ان کے مذہبی اور سیاسی خیالات سے گوہم موافقت نہ کرسکیں، مگر اس میں کوئی شبہ نہیں کہ ان کے قلم کی ضوافشانی سے اسلام کے متعلق یورپ کے بہت سے خیالات باطلہ کے بادل پھٹ گئے، ان کی دوکتابیں اسپرٹ آف اسلام اور ہسٹری آف ساراسینس ہمیشہ یادگار رہیں گی، ان دونوں کتابوں کے ترجمے اکثر اسلامی زبانوں میں موجود ہیں، حتیٰ کہ عربی میں بھی ہوچکے ہیں، ۷۹ سال کی عمر میں اس جہان فانی کو الوداع کہا، مرحوم سے ۱۹۲۰ء میں کئی دفعہ لندن میں ملنے کا موقعہ ملا تھا، رحمۃ اﷲ تعالیٰ۔ (سید سلیمان ندوی، اگست ۱۹۲۸ء)
After reading the whole books and find out the interpretation, there were various sayings, the meanings and interpretations of the verses of Quran. The reader does not have the capability to select correct and incorrect. He does not know what to do about the various interpretations. At first the people of Mecca knew the status of Revelation; they do not need to explain that revelation, because it was their native language while the Prophet (S.A.W) explains it in detail. After the earlier periods, it was necessary to adapt some rules to know the correct sayings, that rules were already include the Quran itself, in the Sunnah, in the Quranic Sciences, in the books of fundamentals of Jurisprudence, and in the books of Quranic Sciences. Later on, however, wrote the books as contemporary independent science as such as book of Husain Al Ḥarbī named (قواعد الترجيح عند المفسرين) and book written by Khalid Al Sabbath named (قواعد التفسير جمعاً ودراسةً). These rules of preference are most important as with the help of these rules, the books of interpretation can be clarified from incorrect sayings. These rules are various, including, related to Quranic text, Sunnah, the views of Companions, the evidence, or related to the linguistics of Arabs. The preference proves the strength of a saying or strengthens an aspect than others through rules of preference. One of the objectives of this research is that the rules of preference can distinguish between correct and incorrect interpretation. The researcher recommended attention to these rules of preference and to study it as a separate subject to get full benefit from the books of interpretation.
The modular group generated by two linear fractional transformations, u : z 7! 1 z and v : z 7! z1 z , satisfying the relations u2 = v3 = 1 [46]. The linear transformation t : z 7! 1 z inverts u and v, i,e, t2 = (vt)2 = (ut)2 = 1 and extends PSL(2; Z) to PGL(2;Z). In [72] a condition for the existence of t is explained. G. Higman introduced coset diagrams for.PSL(2; Z) and PGL(2;Z): Since then, these have been used in several ways, particularly for nding the subgroups which arise as homomorphic images or quotients of PGL(2;Z). The coset diagrams of the action of PSL(2;Z) represent permutation representations of homomorphic images. In these coset diagrams the three cycles of the homomorphic image of v, say v, are represented by small triangles whose vertices are permuted counter-clockwise, any two vertices which are interchanged by homomorphic image of u, say u, are joined by an edge, and t is denoted by symmetry along the vertical line. The xed points of u and v, if they exist are denoted by heavy dots. The xed points of t lies on the vertical line of symmetry. A real quadratic irrational eld is denoted by Qpd, where d is a square free positive integer. If =a1 + b1pdc1 is an element of Qpd, where a1;b1;c1;d; are integers, then has a unique representation such that a1;a2 1 dc1 and c1 are relatively prime. It is possible that ; and and its algebraic conjugate = a1 pdc1 have opposite signs. In this case is called an ambiguous number by Q. Mushtaq in [69]. The coset diagrams of the action of PSL(2;Z) on Qpddepict interesting results. It is shown in [69] that for a xed value of d, there is only one circuit in the coset diagram of the orbit, corresponding to each .Any homomorphism 1 : PGL(2;Z) ! PGL(2;q) give rise to an action on PL(Fq): We denote the generators ()1; ()1 and (t)1 by ; and t: If neither of the generators , and t lies in the kernel of 1; so that , and t are of order 2, 3 and 2 respectively, then 1 is said to be a non-degenerate homomorphism: In addition to these relations, if another relation ( )k = 1 is satised by it, then it has been proved in [74] that the conjugacy classes of non-degenerate homomorphisms of PGL(2;Z) into PGL(2;q) correspond into one to one way with the conjugacy classes of 1 and an element of Fq: That is, the actions of PGL(2;Z) on PL(Fq) are parametrized by the elements of Fq: This further means that there is a unique coset diagram, for each conjugacy class corresponding to 2 Fq. Finally, by assigning a parameter 2 Fq to the conjugacy class of 1, there exists a polynomial f() such that for each root i of this polynomial, a triplet ; ; t 2 PGL(2;q) satises the relations of the triangle group (2;3;k) =D ; ; t : 2 = 3 = ( t)2 = ( )k = ( t)2 = ( t)2 = 1E: Hence, we can obtain the triangle groups (2;3;k) through the process of parametrization. Thegeneralizedtrianglegrouphasthepresentationu;v : ur;vs;Wk;where r; s; k are integers greater than 1, and W = u1v1:::ukvk, where k > 1;0 < i < r and 0 < i < s for all i. These groups are obtained by natural generalization of (r;s;k) dened by the presentationsDu;v : ur = vs = (uv)k = 1E, where r;s and k are integers greater than one. It was shown in [37] that G is innite if 1 r + 1 s + 1 k 1 provided r 3 or k 3 and s 6, or (r; s;k) = (4;5;2): This was generalized in [4], where it was shown that G is innite whenever 1 r + 1 s + 1 k 1 . A proof of this last fact can be seen in [101].A generalized triangle group may be innite when 1 r + 1 s + 1 k > 1. The complete classication of nite generalized triangle groups is given in 1995 by J. Howie in [39] and later by L. Levai, G. Rosenberger, and B. Souvignier in [57] which are fourteen in number. As there are fourteen, generalized triangle groups classied as nite [39], our area of interest is the set of groups which are homomorphic images or quotients of PSL(2;Z). Out of these fourteen only eight groups are quotients of the modular group. In this study, we have extended parametrization of the action of PSL(2;Z) on PL(Fp), where p is a prime number, to obtain the nite generalized triangle groupsD 2 = 3 = 23 = 1E by this parametrization. By parametrization of action of PGL(2;Z) on PL(Fp) we have obtained the coset diagrams of D 2 = 3 = 23 = 1E for all 2 Fp. This thesis is comprised of six chapters. The rst chapter consists of some basic denitions and concepts along with examples. We have given brief introduction of linear groups, the modular and the extended modular group, real quadratic irrational elds, nite elds, coset diagrams, triangle groups, and generalized triangle groups. In the second chapter, we show that entries of a matrix representing the element g =(v)m1v2m2l where l 1 of PSL(2;Z) =;v : 2 = v3 = 1are denominators of the convergents of the continued fractions related to the circuits of type (m1;m2); for all m1;m2 2N: We also investigate xed points of a particular class of circuits of type (m1;m2) and identify location of the Pisot numbers in a circuit of a coset diagram of the action of PSL(2;Z) on Qpd[f1g, where d is a non-square positive integer.In the third chapter we attempt to classify all those subgroups of the homomor phic image of PSL(2;Z) which are depicted by coset diagrams containing circuits of the type (m1; m2). In the fourth chapter we devise a special parametrization of the action of modular group PSL(2;Z) on PL(Fp), where p is prime, to obtain the generalized triangle groups D 2 = 3 = 2k = 1E and by parametrization we obtain the coset diagrams of D 2 = 3 = 2k = 1E for all 2 Fp. In the fth chapter we investigate the action of PSL(2;Z) on PL(F7n) for di⁄erent values of n, where n 2 N, which yields PSL(2;7). The coset diagrams for this action are obtained, by which the transitivity of the action is inspected in detail by nding all the orbits of the action. The orbits of the coset diagrams and the structure of prototypical D168 Schwarzite [48], are closely related to each other. So, we investigate in detail the relation of these coset diagram with the carbon allotrope structures with negative curvature D168 Schwarzite. Their relation reveals that the diagrammatic structure of these orbits is similar to the structure of hypothetical carbon allotrope D56 Protoschwarzite which has a C56 unit cell. In the last chapter, we investigate the actions of the modular group PSL(2;Z) on PL(F11m) for di⁄erent values of m; where m 2 N and draw coset diagrams for various orbits and prove some interesting results regarding the number of orbits that occur.