15 research outputs found
Tarfia Faizullah, 37th Annual ODU Literary Festival
TARFIA FAIZULLAH is the author of Seam (Southern Illinois University Press, 2014), winner of the Crab Orchard Series in Poetry First Book Award. Her poems appear in American Poetry Review, Ploughshares, The Missouri Review, The Southern Review, New England Review, and elsewhere. A Kundiman fellow, she received her MFA from Virginia Commonwealth University. Honors include a Ploughshares Cohen Award, a Fulbright fellowship and a Copper Nickel Poetry Prize. In fall 2014, she joins the University of Michigan as the Nicholas Delbanco Visiting Professor in Poetry
Registers of Illuminated Villages
Tarfia Faizullah’s highly anticipated second collection, Registers of Illuminated Villages, extends and transforms her powerful accounts of violence, war, and loss into poems of many forms and voices—elegies, outcries, self-portraits, and larger-scale confrontations with discrimination, family, and memory. One poem steps down the page like a Slinky; another poem responds to makeup homework completed in the summer of a childhood accident; other poems punctuate the collection with dark meditations on dissociation, discipline, defiance, and destiny; and the near-title poem, “Register of Eliminated Villages,” suggests illuminated texts, one a Qur’an in which the speaker’s name might be found, and the other a register of 397 villages destroyed in northern Iraq. Faizullah, the author of the award-winning collection Seam, is an essential poet, whose work only grows more urgent, beautiful, and—even in its unsparing brutality—full of love.
Tarfia Faizullah is the author of Seam, winner of a VIDA Award and a Great Lakes Colleges Association New Writers Award. She teaches at the University of Michigan and lives in Detroit
Existence of Solutions for G-SFDEs with Cauchy-Maruyama Approximation Scheme
We present the Cauchy-Maruyama (CM) approximation scheme and establish the existence theory of stochastic functional differential equations driven by G-Brownian motion (G-SFDEs). Several useful properties of Cauchy-Maruyama (CM) approximate solutions Xk of G-SFDEs are given. We show that the unique solution of G-SFDEs gets convergence from Cauchy-Maruyama (CM) approximate solutions. The existence theorem for G-SFDEs is developed with the above mentioned scheme
On existence and approximate solutions for stochastic differential equations in the framework of G-Brownian motion
A Note on the Existence Results for Stochastic Functional Differential Equations Driven by G-Brownian Motion
The Convergence and Boundedness of Solutions to SFDEs with the G-Framework
Generally, stochastic functional differential equations (SFDEs) pose a challenge as they often lack explicit exact solutions. Consequently, it becomes necessary to seek certain favorable conditions under which numerical solutions can converge towards the exact solutions. This article aims to delve into the convergence analysis of solutions for stochastic functional differential equations by employing the framework of G-Brownian motion. To establish the goal, we find a set of useful monotone type conditions and work within the space Cr((−∞,0];Rn). The investigation conducted in this article confirms the mean square boundedness of solutions. Furthermore, this study enables us to compute both LG2 and exponential estimates
The existence–uniqueness and exponential estimate of solutions for stochastic functional differential equations driven by G‐Brownian motion
Existence and stability of solutions to non-linear neutral stochastic functional differential equations in the framework of G-Brownian motion
Abstract In the past decades, quantitative study of different disciplines such as system sciences, physics, ecological sciences, engineering, economics and biological sciences, have been driven by new modeling known as stochastic dynamical systems. This paper aims at studying these important dynamical systems in the framework of G-Brownian motion and G-expectation. It is demonstrated that, under the contractive condition, the weakened linear growth condition and the non-Lipschitz condition, a neutral stochastic functional differential equation in the G-frame has at most one solution. Hölder’s inequality, Gronwall’s inequality, the Burkholder-Davis-Gundy (in short BDG) inequalities, Bihari’s inequality and the Picard approximation scheme are used to establish the uniqueness-and-existence theorem. In addition, the stability in mean square is developed for the above mentioned stochastic dynamical systems in the G-frame
