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In this note we consider the following Cauchy problem: u t=div(| u| p- 2 u) ,(x,t)∈ QT=Rn × (0 ,T) ,u(x,0 ) =u0 (x)∈ L∞ (RN) ,x∈ RN,(1 )where p>2 is a constant.It is well known that there exists a solution u∈ Cαloc(QT)∩L∞ (QT) to (1 ) ,with uxj∈ Cβ,β/ 2loc (QT) ,j=1 ,2 ,… ,N (see [1 ] ,[2 ] ) .The proofs of uxj∈Cβ,β/ 2loc (QT) are very complicated and difficult.In this note we use another approach toprove the Holder continuity.We proveuxj∈ Cβ,β/ (1 +β)loc (QT… 相似文献
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立足教育创新瞩目大学数学教育 总被引:2,自引:0,他引:2
在回顾我国非数学专业数学教育、教学改革的基础上,对当今的大学数学教育进行了分析和展望.对大学数学教育的地位及作用进行了探讨.认为大学数学教育,要体现教育创新思想,要在改革中求生存,以成绩促发展. 相似文献
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The paper focuses on the blow-up solution of system of time-fractional differential equations
where cD0+α, cD0+β are Caputo fractional derivatives, n-1 < α < n, n-1 < β < n,A(t),B(t) are continuous functions. We obtain a system of the integral equations which is equivalent to the system of nonlinear partial differential equations with time-fractional derivative via the approach of Laplace transformation, and prove the local existence of solutions to the system of the integral equations. Secondly, this paper investigates the blow-up solutions to the a nonlinear system of fractional differential equations by making use of Hölder’s inequality and obtains a solution of system to blow up in a finite time, and gives an upper bound on the blow-up time. 相似文献
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