836 research outputs found
The Responsibility to Protect: Norms, Laws and the Use of Force in International Politics
This volume is a collection of the key writings of Professor Ramesh Thakur on norms and laws regulating the international use of force. The adoption of the Responsibility to Protect (R2P) principle by world leaders assembled at the UN summit in 2005 is widely acknowledged to represent one of the great normative advances in international politics since 1945. The author has been involved in this shift from the dominant norm of non-intervention to R2P as an actor, public intellectual and academic and has been a key thinker in this process. These essays represent the author's writings on R2P, including reference to test cases as they arose, such as with Cyclone Nargis in Myanmar in 2008. Comprising essays by a key thinker and agent in the Responsibility to Protect debates, this book will be of much interest to students of international politics, human rights, international law, war and conflict studies, international security and IR in general
First person – Savant Thakur
ABSTRACT
First Person is a series of interviews with the first authors of a selection of papers published in Biology Open. Savant Thakur is first author on ‘HSP70 drives myoblast fusion during C2C12 myogenic differentiation’, published in BiO. Savant was a Ph.D. student in the lab of Professor Gordon S. Lynch at the Centre for Muscle Research, Department of Physiology, The University of Melbourne, working towards understanding the mechanisms of defective muscle repair in muscle diseases and wasting disorders. Sadly, Savant passed away on June 16, 2019 and so one of his supervisors, Professor Lynch, spoke to BiO about Savant's work and character
Universal Gauss-Thakur sums and L-series
Corrected several typos and an error in the proof of Proposition 21 Section 3. Improved the general presentation of the paperInternational audienceIn this paper we study the behavior of the function omega of Anderson-Thakur evaluated at the elements of the algebraic closure of the finite field with q elements F_q. Indeed, this function has quite a remarkable relation to explicit class field theory for the field K=F_q(T). We will see that these values, together with the values of its divided derivatives, generate the maximal abelian extension of K which is tamely ramified at infinity. We will also see that omega is, in a way that we will explain in detail, an universal Gauss-Thakur sum. We will then use these results to show the existence of functional relations for a class of L-series introduced by the second author. Our results will be finally applied to obtain a new class of congruences for Bernoulli-Carlitz fractions, and an analytic conjecture is stated, implying an interesting behavior of such fractions modulo prime ideals of A=F_q[T]
Universal Gauss-Thakur sums and L-series
Corrected several typos and an error in the proof of Proposition 21 Section 3. Improved the general presentation of the paperInternational audienceIn this paper we study the behavior of the function omega of Anderson-Thakur evaluated at the elements of the algebraic closure of the finite field with q elements F_q. Indeed, this function has quite a remarkable relation to explicit class field theory for the field K=F_q(T). We will see that these values, together with the values of its divided derivatives, generate the maximal abelian extension of K which is tamely ramified at infinity. We will also see that omega is, in a way that we will explain in detail, an universal Gauss-Thakur sum. We will then use these results to show the existence of functional relations for a class of L-series introduced by the second author. Our results will be finally applied to obtain a new class of congruences for Bernoulli-Carlitz fractions, and an analytic conjecture is stated, implying an interesting behavior of such fractions modulo prime ideals of A=F_q[T]
Universal Gauss-Thakur sums and L-series
Corrected several typos and an error in the proof of Proposition 21 Section 3. Improved the general presentation of the paperInternational audienceIn this paper we study the behavior of the function omega of Anderson-Thakur evaluated at the elements of the algebraic closure of the finite field with q elements F_q. Indeed, this function has quite a remarkable relation to explicit class field theory for the field K=F_q(T). We will see that these values, together with the values of its divided derivatives, generate the maximal abelian extension of K which is tamely ramified at infinity. We will also see that omega is, in a way that we will explain in detail, an universal Gauss-Thakur sum. We will then use these results to show the existence of functional relations for a class of L-series introduced by the second author. Our results will be finally applied to obtain a new class of congruences for Bernoulli-Carlitz fractions, and an analytic conjecture is stated, implying an interesting behavior of such fractions modulo prime ideals of A=F_q[T]
Universal Gauss-Thakur sums and L-series
Corrected several typos and an error in the proof of Proposition 21 Section 3. Improved the general presentation of the paperInternational audienceIn this paper we study the behavior of the function omega of Anderson-Thakur evaluated at the elements of the algebraic closure of the finite field with q elements F_q. Indeed, this function has quite a remarkable relation to explicit class field theory for the field K=F_q(T). We will see that these values, together with the values of its divided derivatives, generate the maximal abelian extension of K which is tamely ramified at infinity. We will also see that omega is, in a way that we will explain in detail, an universal Gauss-Thakur sum. We will then use these results to show the existence of functional relations for a class of L-series introduced by the second author. Our results will be finally applied to obtain a new class of congruences for Bernoulli-Carlitz fractions, and an analytic conjecture is stated, implying an interesting behavior of such fractions modulo prime ideals of A=F_q[T]
Thyroglossal Cyst Papillary Carcinoma: What Next Step must be done?
ABSTRACT
Thyroglossal duct cysts (TGDCs) are usually midline structure of the neck. The coexistence of carcinomas in TGDCs is found rarely, with most being papillary carcinomas. Usually, the diagnosis is made postoperatively after excision of the cyst. Although the Sistrunk procedure is often regarded as adequate, various controversies exist concerning the need for thyroidectomy depending on histopathological findings. We are reporting the case of a 56-year-old man, diagnosed with papillary carcinoma within a TGDC, who underwent total thyroidectomy as has been recommended for differentiated papillary cancer.
How to cite this article
Gupta R, Mohindroo NK, Azad R, Thakur JS. Thyroglossal Cyst Papillary Carcinoma: What Next Step must be done? Int J Phonosurg Laryngol 2017;7(1):23-26.
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On certain generating functions in positive characteristic
18 pages. Refereed version.We present new methods for the study of a class of generating functions introduced by the second author which carry some formal similarities with the Hurwitz zeta function. We prove functional identities which establish an explicit connection with certain deformations of the Carlitz logarithm introduced by M. Papanikolas and involve the Anderson-Thakur function and the Carlitz exponential function. They collect certain functional identities in families for a new class of L-functions introduced by the first author. This paper also deals with specializations at roots of unity of these generating functions, producing a link with Gauss-Thakur sums
On certain generating functions in positive characteristic
18 pages. Refereed version.We present new methods for the study of a class of generating functions introduced by the second author which carry some formal similarities with the Hurwitz zeta function. We prove functional identities which establish an explicit connection with certain deformations of the Carlitz logarithm introduced by M. Papanikolas and involve the Anderson-Thakur function and the Carlitz exponential function. They collect certain functional identities in families for a new class of L-functions introduced by the first author. This paper also deals with specializations at roots of unity of these generating functions, producing a link with Gauss-Thakur sums
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