224 research outputs found
Intrathecal Drug Delivery Systems Survey: Trends in Utilization in Pain Practice [Corrigendum]
Abd-Sayed A, Fiala K, Weisbein J, et al. J Pain Res. 2022;15:1305–1314.
The authors have advised there is an error in the author list on page 1305. The author name “Alaa Abd-Sayed” should read “Alaa Abd-Elsayed”.
The authors apologize for this error
جهود أبرز تلامذة المحدث الإمام السيد نذير حسين الدهلوي في خدمة السنة النبوية Efforts of Some Students of Nazeer Husain Al-Dehalwi in Attending to Prophetic Sunnah
إن الإمام المحدث السيد نذير حسين الدهلوي (1320هـ) من أبرز المحدثين في الهند في العصر المتأخر، أفنى حياته في خدمة العلم والسنة، وقد عمر طويلا، وأمضى ستين سنة بشكل دؤوب في تدريس السنة، وخرج آلاف التلامذة، الذين واصلوا من بعده في منهج شيخهم وأستاذهم، فكانوا خير خلف لخير سلف، وقد اخترنا منهم في هذا البحث بعض المبرزين في مجال التدريس والإفادة لنخبر القارئ بمآثرهم وجهودهم، وهم المحدث الشهير العلامة شمس الحق العظيم آبادي(1273ه-1329هـ)، وشيخ البنجاب المحدث الحافظ عبد المنان الوزير آبادي(1267هـ-1334ه)، والعلامة المحدث الكبير الحافظ محمد عبد الله الغازيبوري (1261هـ-1337ه)، والعلامة المحدث عبد السلام المباركفوري (1342هـ)، والمحدث الكبير العلامة عبد الرحمن المباركفوري صاحب "تحفة الأحوذي" (1353ه)، والعلامة المحدث أبو القاسم سيف البنارسي (1369هـ).
Imām and Muḥaddith, Sayed Nazeer Ḥusain al-Dehlawī (d.1902) is one of the most prominent Muḥaditheen of the Indian late eras. He spent his whole life contributing towards Knowledge and Sunnah. He lived a long life and gave nearly sixty years to teaching Sunnah with his full attention and eagerness. He graduated thousands of students who after him followed his path, they were the best of successors to a noble Scholar. We choose to present in this research some among them, prominent in the field of teaching, in order to inform the reader of their impact; and they are, the famous Ḥadith Scholar Shams al- Haqq Azeem Abādī (1273-1329 AH); the Sheikh of Punjab, The Muḥaddith Ḥafiz b. Abdul Mannān al-Wazeer Abādī (1267-1334 AH); the great Scholar and Muḥaddith al-Hafiz Muḥammad Abdullah al-Ghazipurī (1261-1337 AH); The Scholar Abdul Salām al-Mubārakpurī (d.1342 AH); The Muḥaddith Abdul Reḥmān al-Mubārakpurī (d.1353 AH) author of ‘Tuḥfah al-Aḥwazī’ and the Scholar Abu Qāsim Saif al-Banārasī (d.1369 AH).إن الإمام المحدث السيد نذير حسين الدهلوي (1320هـ) من أبرز المحدثين في الهند في العصر المتأخر، أفنى حياته في خدمة العلم والسنة، وقد عمر طويلا، وأمضى ستين سنة بشكل دؤوب في تدريس السنة، وخرج آلاف التلامذة، الذين واصلوا من بعده في منهج شيخهم وأستاذهم، فكانوا خير خلف لخير سلف، وقد اخترنا منهم في هذا البحث بعض المبرزين في مجال التدريس والإفادة لنخبر القارئ بمآثرهم وجهودهم، وهم المحدث الشهير العلامة شمس الحق العظيم آبادي(1273ه-1329هـ)، وشيخ البنجاب المحدث الحافظ عبد المنان الوزير آبادي(1267هـ-1334ه)، والعلامة المحدث الكبير الحافظ محمد عبد الله الغازيبوري (1261هـ-1337ه)، والعلامة المحدث عبد السلام المباركفوري (1342هـ)، والمحدث الكبير العلامة عبد الرحمن المباركفوري صاحب "تحفة الأحوذي" (1353ه)، والعلامة المحدث أبو القاسم سيف البنارسي (1369هـ).
Imām and Muḥaddith, Sayed Nazeer Ḥusain al-Dehlawī (d.1902) is one of the most prominent Muḥaditheen of the Indian late eras. He spent his whole life contributing towards Knowledge and Sunnah. He lived a long life and gave nearly sixty years to teaching Sunnah with his full attention and eagerness. He graduated thousands of students who after him followed his path, they were the best of successors to a noble Scholar. We choose to present in this research some among them, prominent in the field of teaching, in order to inform the reader of their impact; and they are, the famous Ḥadith Scholar Shams al- Haqq Azeem Abādī (1273-1329 AH); the Sheikh of Punjab, The Muḥaddith Ḥafiz b. Abdul Mannān al-Wazeer Abādī (1267-1334 AH); the great Scholar and Muḥaddith al-Hafiz Muḥammad Abdullah al-Ghazipurī (1261-1337 AH); The Scholar Abdul Salām al-Mubārakpurī (d.1342 AH); The Muḥaddith Abdul Reḥmān al-Mubārakpurī (d.1353 AH) author of ‘Tuḥfah al-Aḥwazī’ and the Scholar Abu Qāsim Saif al-Banārasī (d.1369 AH)
Reduced measure, large solutions and singularities for some parabolic problems
Cette thèse est constituée de trois parties. La première est consacrée à dégager les notions de "bonne mesure" et de "mesure réduite" pour deux problèmes paraboliques non linéaires. Pour chacun de ces problèmes et suite à un phénomène de relaxation, on construit une suite qui converge vers la plus "grande" sous-solution du problème donné. En plus, on cherche des "capacités universelles" et on établit des équivalences avec des mesures de Hausdorff. Dans la deuxième partie, on cherche des conditions d'existence et d'unicité de "grande solutions" pour des problèmes paraboliques dont le terme non linéaire est un terme d'absorption. Des conditions sur le bord du domaine permettent de prouver l'unicité de la solution. Dans la troisième partie, on étudie les "singularités" de deux problèmes paraboliques non linéaires.The thesis at hand is composed of three parts. The first part is devoted to present the notions of "good measure" and "reduced measure" for two non-linear parabolic problems. For each of these problems we construct a sequence, after a relaxation phenomenon, which converges to the "greatest" sub-solution of the given problem. Moreover, we look for "universal capacities" and we establish equivalence with Hausdorff measure. In the second part, we establish existence and uniqueness conditions for "large solutions" of parabolic problems whose non-linear term is an absorption one. Some boundary conditions will permit to prove uniqueness of solutions. In the last part we study the "singularities" of two non-linear parabolic problems
Mesures réduites, grandes solutions et singularités de quelques problèmes paraboliques
Cette thèse est constituée de trois parties. La première est consacrée à dégager les notions de "bonne mesure" et de "mesure réduite" pour deux problèmes paraboliques non linéaires. Pour chacun de ces problèmes et suite à un phénomène de relaxation, on construit une suite qui converge vers la plus "grande" sous-solution du problème donné. En plus, on cherche des "capacités universelles" et on établit des équivalences avec des mesures de Hausdorff. Dans la deuxième partie, on cherche des conditions d'existence et d'unicité de "grande solutions" pour des problèmes paraboliques dont le terme non linéaire est un terme d'absorption. Des conditions sur le bord du domaine permettent de prouver l'unicité de la solution. Dans la troisième partie, on étudie les "singularités" de deux problèmes paraboliques non linéaires.The thesis at hand is composed of three parts. The first part is devoted to present the notions of "good measure" and "reduced measure" for two non-linear parabolic problems. For each of these problems we construct a sequence, after a relaxation phenomenon, which converges to the "greatest" sub-solution of the given problem. Moreover, we look for "universal capacities" and we establish equivalence with Hausdorff measure. In the second part, we establish existence and uniqueness conditions for "large solutions" of parabolic problems whose non-linear term is an absorption one. Some boundary conditions will permit to prove uniqueness of solutions. In the last part we study the "singularities" of two non-linear parabolic problems.TOURS-Bibl.électronique (372610011) / SudocSudocFranceF
Some New Inequalities for the Gamma and Polygamma Functions
In this paper, we present some new symmetric bounds for the gamma and polygamma functions. For this goal, we present two functions involving gamma and polygamma functions and we investigate their complete monotonicity. Also, we investigate their completely monotonic degrees. This concept gives more accuracy in measuring the complete monotonicity property. These new bounds are better than some of the recently published results
Initial trace of solutions of semilinear heat equation with absorption
Nonlinear Analysis, T. M. & A. Volume 93, 197-225 (2013).We study the initial trace problem for positive solutions of semilinear heat equations with strong absorption. We show that in general this initial trace is an outer regular Borel measure. We emphasize in particular the case where satisfies (E) , with and and prove that in the subcritical case $
On uniqueness of large solutions of nonlinear parabolic equations in nonsmooth domains
16 pagesInternational audienceWe study the existence and uniqueness of the positive solutions of the problem (P): (q>1) in , on and , when is a bounded domain in . We construct a maximal solution, prove that this maximal solution is a large solution whenever $
Initial trace of solutions of semilinear heat equation with absorption
Nonlinear Analysis, T. M. & A. Volume 93, 197-225 (2013).We study the initial trace problem for positive solutions of semilinear heat equations with strong absorption. We show that in general this initial trace is an outer regular Borel measure. We emphasize in particular the case where satisfies (E) , with and and prove that in the subcritical case $
Solutions of some nonlinear parabolic equations with initial blow-up
International audienceWe study the existence and uniqueness of solutions of () in where is a domain with a compact boundary, subject to the conditions on and the initial condition . By means of Brezis' theory of maximal monotone operators in Hilbert spaces, we construct a minimal solution when , whatever is the regularity of the boundary of the domain. When satisfies the parabolic Wiener criterion and is continuous, we construct a maximal solution and prove that it is the unique solution which blows-up at
Some New Bounds for Bateman’s G-Function in Terms of the Digamma Function
In this paper, we present some new symmetric bounds for Bateman’s G-function and its derivatives, in terms of the digamma and polygamma functions, which are better than some recent results
- …
