{"product_id":"the-krasnoselskiimann-iterative-method-recent-progress-and-applications-9783030916534","title":"The Krasnosel'skii-Mann Iterative Method: Recent Progress and Applications","description":"\u003cp\u003e\u003c\/p\u003e\u003cblockquote\u003e\n\u003cbr\u003eThe Krasnosel skiĭ-Man (KM) iterative method is a powerful tool for finding fixed points of nonlinear methods. It combines the advantages of the Krasnosel skiĭ method with the Man method and has been widely used in practice. \u003c\/blockquote\u003e\u003cp\u003e\u003cstrong\u003eFormat\u003c\/strong\u003e: Paperback \/ softback\u003cbr\u003e\u003cstrong\u003eLength\u003c\/strong\u003e: 127 pages\u003cbr\u003e\u003cstrong\u003ePublication date\u003c\/strong\u003e: 25 February 2022\u003cbr\u003e\u003cstrong\u003ePublisher\u003c\/strong\u003e: Springer Nature Switzerland AG\u003cbr\u003e\u003c\/p\u003e \u003cp\u003e\u003cbr\u003eThis concise examination delves into the Krasnosel skiĭ-Man (KM) iterative technique, a widely utilized approach for identifying fixed points of nonlinear methods. The KM method is a powerful tool in the field of mathematics, particularly in the study of differential equations and optimization problems. It operates by repeatedly applying a specific function to an initial guess until it converges to a desired solution or a point of interest.\u003cbr\u003e\u003cbr\u003eThe Krasnosel skiĭ-Man (KM) iterative method is a powerful tool in the field of mathematics, particularly in the study of differential equations and optimization problems. It operates by repeatedly applying a specific function to an initial guess until it converges to a desired solution or a point of interest.\u003cbr\u003e\u003cbr\u003eThe KM method was first introduced by Leonid Krasnosel in the 1960s and has since become a widely used technique for finding fixed points of nonlinear methods. The method is based on the concept of iterative optimization, which involves repeatedly improving a solution until it satisfies certain criteria or reaches a desired level of accuracy.\u003cbr\u003e\u003cbr\u003eOne of the key advantages of the KM method is its ability to handle a wide range of problems, including those with complex nonlinearities and discontinuities. It can also handle problems with multiple variables and constraints, making it a versatile tool for solving real-world problems.\u003cbr\u003e\u003cbr\u003eThe KM method operates by repeatedly applying a specific function to an initial guess until it converges to a desired solution or a point of interest. The function used in the KM method is typically a nonlinear function that maps the initial guess to a solution space. The method iteratively updates the initial guess until it reaches a point where the function values are close to each other, indicating that the solution has converged.\u003cbr\u003e\u003cbr\u003eOne of the key steps in the KM method is choosing an appropriate initial guess. The initial guess should be close to the desired solution or a point of interest, as this will help the method converge faster. Additionally, the initial guess should be within the range of the function, as this will prevent the method from getting stuck in a local minimum or maximum.\u003cbr\u003e\u003cbr\u003eOnce the initial guess is chosen, the KM method iteratively updates the guess until it converges to the desired solution or a point of interest. The method uses a convergence criterion to determine when the solution has converged. The convergence criterion can be based on a variety of factors, including the absolute value of the function values, the relative difference between the function values, or the number of iterations.\u003cbr\u003e\u003cbr\u003eOnce the solution has converged, the KM method can be used to calculate the final result. The final result can be used to solve a variety of problems, including those in engineering, physics, and economics.\u003cbr\u003e\u003cbr\u003eIn conclusion, the Krasnosel skiĭ-Man (KM) iterative method is a powerful tool in the field of mathematics, particularly in the study of differential equations and optimization problems. It operates by repeatedly applying a specific function to an initial guess until it converges to a desired solution or a point of interest. The method is based on the concept of iterative optimization and can handle a wide range of problems with complex nonlinearities and discontinuities. By choosing an appropriate initial guess and using a convergence criterion, the KM method can be used to calculate the final result and solve a variety of real-world problems.\u003c\/p\u003e\u003cp\u003e\u003cstrong\u003eWeight\u003c\/strong\u003e: 221g\u003cbr\u003e\u003cstrong\u003eDimension\u003c\/strong\u003e: 235 x 155 (mm)\u003cbr\u003e\u003cstrong\u003eISBN-13\u003c\/strong\u003e: 9783030916534\u003cbr\u003e \u003cstrong\u003eEdition number\u003c\/strong\u003e: 1st ed. 2022\u003c\/p\u003e","brand":"Qiao-Li Dong,Yeol Je Cho,Songnian He,Panos M. Pardalos,Themistocles M. Rassias","offers":[{"title":"Paperback \/ softback","offer_id":44103362543866,"sku":"9783030916534","price":45.8,"currency_code":"GBP","in_stock":true}],"thumbnail_url":"\/\/cdn.shopify.com\/s\/files\/1\/0522\/4297\/2845\/products\/noImage_1_27c56621-fbe3-4a83-945c-f1f7280c2ae8.jpg?v=1669552525","url":"https:\/\/shulphink.com\/products\/the-krasnoselskiimann-iterative-method-recent-progress-and-applications-9783030916534","provider":"Shulph Ink","version":"1.0","type":"link"}