218 research outputs found
Fatima Jinnah
Although fifty years have passed since the death of Fatima Jinnah - author, activist and stateswoman known in Pakistan as the &apos;mother of the nation&apos; - this is the first scholarly biography to tackle her life in full. Her background and contribution to Muslim nationalism under the British Raj, as well as her various efforts to consolidate the state, including a run for president in 1964, are told through previously untapped archival sources. Examining her life in the context of scholarship on South Asia and on women in Islam, Pirbhai assesses Fatima Jinnah&apos;s role through the theoretical lens of the colonial &apos;new woman&apos;. This is essential reading for all those interested in modern South Asian and Islamic history, particularly the themes of gender and colonialism, the roots of Muslim nationalism and the early challenges facing the Pakistani state, as shown through the extraordinary lived experience of its most influential female activist.</jats:p
Note on K0-group and C*p-algebras
Department of Mathematics
College of Science and Medical Studies
King Saud University
P. O. Box 22452
Riyadh 11495, Saudi ArabiaThe K0-group for unital C*p –algebra is defined. Then it is proven that the K0 -group of unital commutative C∗p-algebra (A, ||.|| p ) is
isomorphic to the K0-group of the commutative unital C*p –algebra ( (A, ||.|| p)1 p ). The concept of n-special C*p –algebra was introduced by Azmi in [2]. Let A be an n-special C*p –algebra then the characterization of these algebras as in [2] leads to a surjective group homomorphism from K0(A) to Z, which turns into isomorphism when A is a special C*p –algebr
Erratum: a synonymous variant in GCK gene as a cause of gestational diabetes mellitus (diabetes mellitus. 2019;22(2). Doi: 10.14341/dm9938)
An erratum on «A synonymous variant in GCK gene as a cause of gestational diabetes mellitus» by Natalya A. Zubkova, Petr M. Rubtsov, Liudmila I. Ibragimova, Nina A. Makretskaya, Evgeny V. Vasiliev, Vasily M. Petrov, Anatoly N. Tiulpakov (2019). Diabetes mellitus. 22(2). doi: 10.14341/DM9938An error was made in the list of authors: Fatima F. Burumkulova was not indicated as author of this article. The correct list of authors: Natalya A. Zubkova, Petr M. Rubtsov, Fatima F. Burumkulova, Liudmila I. Ibragimova, Nina A. Makretskaya, Evgeny V. Vasiliev, Vasily M. Petrov, Anatoly N. Tiulpakov.The editorial board apologize for this error and state that this does not change the scientific conclusions of the article in any way.The original article has been updated
The chern - connes character formula for families of Dirac Operators
Dept. of Mathematics
College of Science and Medical studies at Malaz
King Saud University, P.O. Box 22452
Riyadh 11495, Saudi Arabia.
e-mail: [email protected] bivariant Chern - Connes character is used, by incorporating the JLO formula
and Bismut's superconnection formalism, to compute the local cyclic cycle formula
for families of Dirac operator D acting on a fibre bundle M over B. The fundamental
techniques used are, the rescaling of Bismut's superconnection and the canonical
order calculus
Characterization of continuous functions on open connected subset of Rn¤
College of Science and Medical Studies King Saud University. P.O. Box 22452 Riyadh 11405, Saudi Arabia,
e-mail: fazmi©ksu.edu.saLet A be a Fr¶echet * algebra with n- pairwise commuting self adjoint generators and with no non trivial idempotent. By imposing the condition that the joint spectral image of the generators contains no boundary points, we are led to a de¯nition of n-special F¤ algebra, and prove that the character M(A) of A is homeomorphic to an open connected subset of Rn. Then by adopting a suitable eneralization of the Gelfand Naimark theorem, we characterize the algebra of all continuous complex valued functions de¯ned on open connected subset of Rn.This project was partially supportedby the Science Research Center at King Saud Universit
Equivariant bivariant cyclic theory and equivariant chern-connes character
We construct an equivariant bivariant cyclic theory, as a combination of equivariant cyclic andnoncomm utative de Rham theories for unital G-Banach algebras, where G is a compact Lie group. By incorporating the JLO formula
andthe superconnection formalism of Quillen, an equivariant bivariant Chern Connes character of Kasparov’s G-bimodule is defined, with values in the bivariant cyclic theory
Generalized contraction mappings in double controlled metric type space and related fixed point theorems
Abstract In this article, we introduce two new types of generalized contraction mappings in double controlled metric type spaces: Θ-double controlled contraction mapping and Ćirić-Reich-Rus-type-Θ-double controlled contraction mapping. For each contraction mapping, we establish the existence and uniqueness of the fixed point theorems on the complete double controlled metric type space and provide examples. We present an application of our results and demonstrate how our results generalize several existing fixed point theorems in the literature
New Contractive Mappings and Solutions to Boundary-Value Problems in Triple Controlled Metric Type Spaces
In this study, we utilize the notion of triple controlled metric type space that preserves the symmetry property, which is a generalization of b-metric-type spaces, to prove new fixed-point results. We introduce (α-F)-contractive mappings and Θ-contractive mappings on triple controlled metric type space settings. Then, we establish the existence and uniqueness of fixed-point results on complete triple controlled metric type space. Moreover, some examples and applications to boundary-value problems of the fourth-order differential equation are presented to display the usage of the obtained result
On a subclass of meromorphic close to convex functions of complex order
We introduce a new class of meromorphic functions of complex order in
the punctured disk, which generalizes the concept of close to convexity.
We investigate some of its properties and discuss a class of integral
operators
A New Class of (α,η,(Q,h),L)-Contractions in Triple Controlled Metric-Type Spaces with Application to Polynomial Sine-Type Equations
This paper introduces a novel class of generalized contractions, termed (α,η,(Q,h),L)-contraction mapping, within the context of triple controlled metric-type spaces, extending the framework of fixed point theory in controlled structures. The proposed mapping is defined using α-admissible and η-subadmissible functions, in conjunction with a control pair (Q,h) of upper class of type I, and incorporates Wardowski’s function L-contraction condition. Under suitable hypotheses, we establish both the existence and uniqueness of fixed points for this class of mappings. Several corollaries are derived as special cases of the main result. Moreover, we provide a nontrivial application by analyzing the solvability of a nonlinear equation involving powers of the sine function, thereby illustrating the utility of the developed theory
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