مولانا آزاد سبحانی
افسوس ہے پچھلے دنوں مولانا آزاد سبحانی کا۷۵ برس کی عمر میں گورکھ پور میں انتقال ہوگیا۔مرحوم کااصل نام عبدالقادر اوروطن سکندر پور ضلع بَلیاتھا۔ادھر ایک مدت سے گمنامی کی زندگی بسر کررہے تھے۔ورنہ تحریکِ خلافت کے زمانہ میں پورے ہندوستان میں ان کی شہرت کاطوطی بولتا تھا۔فلسفہ والٰہیات کے فاضل تھے۔ خطابت وتقریرمیں بعض حیثیتوں سے اپنا جواب نہیں رکھتے تھے۔ شاعر بھی تھے۔مرحوم کی ایک غزل بچپن میں کبھی پڑھی تھی جواب تک یاد ہے:
پیام آیا ہے پیمانِ جفا کا
یجہ کھل گیا جوشِ وفا کا
نِکل آؤ ذرا پردہ سے باہر
عقیدہ مٹ رہا ہے اب خدا کا
مزاجِ لااُبالی اور جوانی
خدا حافظ ہے ناموسِ حیا کا
خدا پر چھوڑ دو انجامِ کشتی
قدم کیوں درمیاں ہو ناخدا کا
حدیثِ ضبط پروانہ ہے بے وقت
زمانہ ہے فغانِ برمَلا کا
ترا آزادؔ پھر پابندِ غم ہے
ہ پھر محتاج ہے لطف و عطا کا
لیکن افسوس ہے اپنی صلاحیتوں اورکمالات سے اسلام اور مسلمانوں کو جو فائدہ پہنچا سکتے تھے اپنی طبیعت کے عدم استقلال اور تلون کی وجہ سے نہ پہنچا سکے۔ بحیثیت مجموعی بڑی خوبیوں کے انسان تھے۔الّٰلھم اغفرلہ وارحمہ ۔
[اگست ۱۹۵۷ء]
Arabic language is one of the most developed languages of the world. It has a number of grammatical phenomenon, Omissions is one of them. Omission of any part of a sentence creates ambiguity to fully understand its meanings. Due to this phenomenon Arabic has a specific cause when viewed in the light of Semantic analysis. This study deals with the phenomenon of dropping or omission of the part of a speech. In article under review, I have explained as to how an omission becomes requirement of the text to reflect a particular meaning. I have chosen semantic study of three basic parts of verbal sentence that is Verb, Subject and Object to unveil this phenomenon in Sahih Al Bukhari. This clearly explains the significance of omission of words in the sayings of Holy Prophet Muhammad (Peace Be Upon Him).
When sampling from ecological, environmental and geographical regions, it is observed that there is a spatial pattern among the units of population. The units that are close to each other are more similar than the units that are far apart. In this situation a simple random sample from a population where neighboring units are contiguous, is not the best representative of the population; so we cannot obtain best estimates of the population parameters. Polygonal designs are the special type of partially balanced incomplete block designs, developed under the idea that neighboring units should be avoided in the selection of samples. Polygonal designs are extensively used in survey sampling in terms of balanced sampling plans excluding contiguous units (BSEC) and balanced sampling plans to avoid the selection of adjacent units (BSA). In partially balanced incomplete block designs we do not consider the distance among the neighboring units where as in polygonal designs we consider it. Polygonal designs are usually denoted by PD (v, k, λ; α), where v denotes the number of treatments, k denotes the block size, λ is the concurrence parameter and α denotes the distance. In this thesis there is an introduction of block designs, especially Balanced Incomplete Block Designs (BIBDs), Partially Balanced Incomplete Block Designs (PBIBDs), Regular Graph Designs (RGD). As polygonal designs are basically a generalization of PBIBD and is related to RGD, it is necessary to include an introduction of these block designs in the thesis. Polygonal designs in term of Partially Balanced Incomplete Block Designs (PBIBDs), Balanced Sampling plans Excluding Contiguous units (BSECs) and Balanced Sampling plans to avoid the selection of Adjacent units (BSAs) are also discussed. Also, there is a detailed discussion of the existence of polygonal designs with linear blocks (PDL). A brief review of existing work on cyclic polygonal designs is presented. Also, examples of the said designs along with their concurrence vectors and concurrence matrices are given, which show the difference between the structure of the polygonal designs and the other block designs. The method of addition is introduced for the construction of all types of cyclic block designs and cyclic incomplete block designs; also the construction of these designs is illustrated through examples. This method is cyclic in nature. The method of addition is a more detailed and easy method of construction as compared to the other existing methods. One can directly find the properties of the designs from the set of x''s. Many authors have investigated polygonal designs with circular blocks. They attempted to establish the existence of polygonal designs as well as to find polygonal designs for different combination of parameters. But their work is limited. They provided designs for circular blocks only. Unfortunately there is no work on the construction of polygonal designs with linear blocks. In this thesis, cyclic polygonal design with linear blocks are introduced for the first time. Polygonal designs comprised of linear blocks are defined and explained. A detailed discussion of necessary conditions of the existence and construction of polygonal designs with linear blocks is presented. A large number of cyclic polygonal designs with linear blocks are constructed. Besides considering linear blocks, efforts are made to construct circular polygonal designs for block size 4 up to 10. Algorithms are developed for the construction of these types of designs. Although researchers have found designs for different combination of parameters, their work is limited to distance 1, and only a few designs were found for α > 1 and k > 4. There is a summary of work presented at the end of thesis. Limitations in the construction of designs are mentioned. Some suggestions for future directions in the construction of cyclic polygonal designs and polygonal designs with linear blocks are also furnished.