Wang, R. N.; Zhou, Y. Antiperiodic problems for nonautonomous parabolic evolution equations. (English) Zbl 1470.34160 Abstr. Appl. Anal. 2014, Article ID 263690, 11 p. (2014). Summary: This work focuses on the antiperiodic problem of nonautonomous semilinear parabolic evolution equation in the form \(u'(t) = A(t) u(t) + f(t, u(t))\), \(t \in \mathbb{R}\), \(u(t + T) = - u(t)\), \(t \in \mathbb{R}\), where \((A \left(t\right))_{t \in \mathbb{R}}\) (possibly unbounded), depending on time, is a family of closed and densely defined linear operators on a Banach space \(X\). Upon making some suitable assumptions such as the Acquistapace and Terreni conditions and exponential dichotomy on \((A \left(t\right))_{t \in \mathbb{R}}\), we obtain the existence results of antiperiodic mild solutions to such problem. The antiperiodic problem of nonautonomous semilinear parabolic evolution equation of neutral type is also considered. As sample of application, these results are applied to, at the end of the paper, an antiperiodic problem for partial differential equation, whose operators in the linear part generate an evolution family of exponential stability. MSC: 34G20 Nonlinear differential equations in abstract spaces 34C25 Periodic solutions to ordinary differential equations 35B10 Periodic solutions to PDEs 35K20 Initial-boundary value problems for second-order parabolic equations 35K58 Semilinear parabolic equations PDF BibTeX XML Cite \textit{R. N. Wang} and \textit{Y. Zhou}, Abstr. Appl. Anal. 2014, Article ID 263690, 11 p. (2014; Zbl 1470.34160) Full Text: DOI References: [1] Batchelor, M. T.; Baxter, R. J.; O’Rourke, M. J.; Yung, C. M., Exact solution and interfacial tension of the six-vertex model with anti-periodic boundary conditions, Journal of Physics A: Mathematical and General, 28, 10, 2759-2770 (1995) · Zbl 0827.60096 [2] Bonilla, L. L.; Higuera, F. 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