या ई-पुस्तकाविषयी
The steady-state solutions to Navier-Stokes equations on a bounded domain $\Omega \subset Rd$, $d = 2,3$, are locally exponentially stabilizable by a boundary closed-loop feedback controller, acting tangentially on the boundary $\partial \Omega$, in the Dirichlet boundary conditions. The greatest challenge arises from a combination between the control as acting on the boundary and the dimensionality $d=3$. If $d=3$, the non-linearity imposes and dictates the requirement thatstabilization must occur in the space $(H{\tfrac{3 {2 +\epsilon (\Omega))3$, $\epsilon > 0$, a high topological level. A first implication thereof is that, due to compatibility conditions that now come into play, for $d=3$, the boundary feedback stabilizing controller must be infinite dimensional. Moreover,it generally acts on the entire boundary $\partial \Omega$. Instead, for $d=2$, where the topological level for stabilization is $(H{\tfrac{3 {2 -\epsilon (\Omega))2$, the boundary feedback stabilizing controller can be In order to inject dissipation as to force local exponential stabilization of the steady-state solutions, an Optimal Control Problem (OCP) with a quadratic cost functional over an infinite time-horizon is introduced for the linearized N-S equations. As a result, the sameRiccati-based, optimal boundary feedback controller which is obtained in the linearized OCP is then selected and implemented also on the full N-S system. For $d=3$, the OCP falls definitely outside the boundaries of established optimal control theory for parabolic systems with boundary controls, in that thecombined index of unboundedness--between the unboundedness of the boundary control operator and the unboundedness of the penalization or observation operator--is strictly larger than $\tfrac{3 {2 $, as expressed in terms of fractional powers of the free-dynamics operator. In contrast, established (and rich) optimal control theory [L-T.2] of boundary control parabolic problems and corresponding algebraic Riccati theory requires a
या ई-पुस्तकला रेटिंग द्या
तुम्हाला काय वाटते ते आम्हाला सांगा.
वाचन माहिती
स्मार्टफोन आणि टॅबलेट
Android आणि iPad/iPhone साठी Google Play बुक अॅप इंस्टॉल करा. हे तुमच्या खात्याने आपोआप सिंक होते आणि तुम्ही जेथे कुठे असाल तेथून तुम्हाला ऑनलाइन किंवा ऑफलाइन वाचण्याची अनुमती देते.
लॅपटॉप आणि कॉंप्युटर
तुम्ही तुमच्या काँप्युटरचा वेब ब्राउझर वापरून Google Play वर खरेदी केलेली ऑडिओबुक ऐकू शकता.
ईवाचक आणि इतर डिव्हाइसेस
Kobo eReaders सारख्या ई-इंक डिव्हाइसवर वाचण्यासाठी, तुम्ही एखादी फाइल डाउनलोड करून ती तुमच्या डिव्हाइसवर ट्रान्सफर करणे आवश्यक आहे. सपोर्ट असलेल्या eReaders वर फाइल ट्रान्सफर करण्यासाठी, मदत केंद्र मधील तपशीलवार सूचना फॉलो करा.
